{ "pages": [ { "id": "HDyjmXOLe", "name": "Einführung", "sections": [ { "id": "4JOq4ZjgZZ", "type": "markdown", "content": "# Einführung\n## Analog-Technik und Digital-Technik\n\nIn der Schwachstromelektronik werden heute die beiden Bereiche \nAnalog-Technik und Digital-Technik unterschieden.\n\n\nEin einfaches Beispiel für diese beiden Begriffe stellt ein \ngewöhnlicher Spannungsmesser dar. Wenn man das Messgerät wie in \n*Abb. 1* an eine regelbare Spannungsquelle anschließt, so vergrößert \nsich der Zeigerausschlag mit zunehmender Spannung. Dabei wird einem \nbestimmten Spannungswert genau eine Zeigerstellung zugeordnet. Dieser \ngleichmäßige Anstieg oder Abfall des Zeigers wird **analoges Verhalten**\ngenannt.\n" }, { "id": "zPSVoRdPN", "type": "image", "content": 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}, { "id": "dwEOX6w5e", "type": "markdown", "content": "\nDabei ist jeder Zwischenwert der Spannung innerhalb des Messbereiches \ndes Spannungsgerätes möglich. Der Ausschlag des Messgerätes entspricht\ndabei der angelegten Spannung, oder anders ausgedrückt: die angelegte \nSpannung ist analog zum Zeigerausschlag.\n\n\n*Abb. 2* zeigt ein typisches Diagramm für analoges Verhalten. Hier ist \nder Zeigerausschlag des Messgerätes in Abhängigkeit der Zeit t \ndargestellt. Es ist deutlich zu sehen, dass jeder beliebige \nZwischenwert des Ausschlags eingestellt werden kann." }, { "id": "sSnyV-hGf", "type": "image", "content": 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" }, { "id": "iU5UE5bzN", "type": "markdown", "content": "Bei der **Digital-Technik** dagegen wird die Information, die bei der Analog-Technik durch den Kurvenverlauf gegeben ist Zeigerausschlag), \ndurch das Ablesen auf der Skala bestimmt. Man ordnet eben jedem Zeigerstand einen bestimmten Spannungswert zu. Das ist bei fast allen Messgeräten durch die Skala von vornherein schon gegeben. Indem man nun die Skalenstriche abzählt, setzt man das analoge Signal (Ausschlag des Zeigers) in ein digitales Signal (Anzahl der Striche) um. \n\n**Dabei hat die Digital-Technik gegenüber der Analog-Technik einen großen \nVorteil**. Während bei analogen Schaltungen der Spannungsbereich meist genau stimmen muss, braucht man in digitalen Schaltungen nur den \nrichtigen Spannungsbereich einzuhalten. Dies bringt eine **erhöhte Stabilität** der digitalen Schaltungen mit sich.\n\nDie beiden Spannungsbereiche, die in der Digital-Technik verwendet werden, heißen `L-Bereich` (von engl.: low = niedrig) und `H-Bereich` (von engl.: high = hoch). Hier werden für die Beispiele eine Versorgungsspannung `Uv = 5V` und die beiden Spannungsbereiche mit \n`0V bis +0,5V` für `L` (low) und `+2,5V bis +5V` für `H` (high) festgelegt, da diese Spannungsbereiche außerdem gerade für TTL-Schaltungen (TTL = Transistor-Transistor-Logik) oft benötigt werden.\n\n::: info\nIn der mathematischen Beschreibung von digitalen Schaltungen wird der L-Bereich mit 0 und der H-Bereich mit 1 beschrieben. Dies ist unter anderem für Wahrheitstabellen und *KV-Tafeln*, die in anderen Kapiteln zur Anwendung kommen, sehr von Vorteil.\n:::\n\n## Das Dualsystem\nIn den digitalen Schaltungen mit seinen zwei Bereichen H und L wird das Dualsystem für die Beschreibung mathematischer Zusammenhänge\nangewendet. Dabei werden nur zwei Zahlen benötigt, nämlich 1 und 0. Eine Verdeutlichung des Dualsystems ist am einfachsten durch eine\nGegenüberstellung mit unserem üblichen Dezimalsystem zu erreichen:\n\n| Dezimalsystem\t | Dualsystem |\n|:------------------:|:----------------|\n|\t0 | 0\n|\t1 | 1\n|\t2 | 10\n|\t3 | 11\n|\t4 | 100\n|\t5 | 101\n|\t6 | 110\n|\t7 | 111\n|\t8 | 1000\n|\t9 | 1001\n|\t10 | 1010\n|\t11 | 1011\n\n\nDabei spricht man die duale Zahl `1001` nicht etwa Eintausendeins, sondern man spricht die Zahlen einzeln von links beginnend,\nalso ***Eins, Null, Null, Eins***.\n\nDurch diese Darstellung können digitale Schaltungen (z.B. Zähler) sehr einfach und durchsichtig dargestellt werden.\n\n\n## Anmerkung zur Elektronik\n\n::: info\nAlle hier behandelten Schaltungen entsprechen der sog. **Positiv-Logik**. Das heißt, dass der H-Bereich eine positive Spannung sein muss.\n\n*(Es gibt auch eine Negativ-Logik, die aber in der Technik kaum eine Bedeutung hat.)*\n:::\n\n\nWeiterhin gilt ein **offener Eingang** (nicht angeschlossener Eingang) **immer als Wert 1** (entspr. H). Dies ist durch die Bauweise der ICs\n(Integrierte Schaltungen) bedingt, die intern immer den Wert 1 an einen Ausgang legen, wenn dieser nicht angeschlossen ist. Das bringt\nvor allem beim Zusammenschalten mehrerer Verknüpfungsschaltungen enorme Vorteile.\n\n\nDer **Masseanschluss** bei digitalen Schaltungen hat **immer den Wert 0**. Dies entspricht bei der Stromversorgung dem Minuspol. Der Wert 1 ist\nalso der Pluspol der Spannungsquelle. Falls Messungen mit einem Spannungsmessgerät oder gar Oszilloskop gemacht werden, ist daher der Massepunkt immer der negative Pol der Spannungsquelle. Die kapazitive Last für digitale Schaltungen sollte 100 pF nicht\nüberschreiten, damit die Funktion gewährleistet ist und eine Überlast der Ausgänge durch zu hohe Auf- bzw. Entladeströme vermieden wird. Sind größere Kondensatoren zur Signalverzögerung\nerforderlich, so ist ein Vorwiderstand vorzusehen.\n\n\n\nDer Ausgangsstrom von TTL-Schaltungen ist sehr gering, meist bei 20 mA. Das reicht wohl für den Betrieb einer Kontroll-LED (Licht Emittierende\nDiode = Leuchtdiode), doch ist darauf zu achten, dass der Ausgang nicht überlastet wird. Notfalls muss ein Schaltverstärker dem Ausgang folgen, der das Ausgangssignal verstärkt. Bei manchen IC’s jedoch ist speziell für LED-Betrieb ein Treiber vorhanden, der einen Anschluss von mehr als einer LED erlaubt (z.B. beim 7-Segment-Decoder). Es ist ratsam, sich deshalb in einem Datenbuch über diesen Sachverhalt zu informieren.\n\n" } ] }, { "id": "1O6kMCXVa", "name": "Gatter", "sections": [ { "id": "RRbN6tlPYd", "type": "markdown", "content": "# Grundlagen\nLogische Verknüpfungsschaltungen sind das Grundgerüst der digitalen \nTechnik. Mit Hilfe der 5 hier aufgeführten Verknüpfungsschaltungen,\ndie auch Gatter genannt werden, lassen sich nun alle anderen \nVerknüpfungsschaltungen realisieren.\n\nDie Wahrheitstabelle, oder auch Logik-Tafel, die bei jeder \nVerknüpfungsschaltung mit aufgeführt wird, gibt an, welches Signal am \nAusgang anliegt, nachdem die Eingänge in einer bestimmten Weise \nangeschlossen wurden. Dabei werden alle möglichen \nAnschlusskombinationen durchgespielt.\n\n\n## AND-Gatter\n\nDie Boolesche Funktionsgleichung (mathematische Gleichung) für das\nAND-Gatter lautet:\n\n\n\n```math\n A=E1 wedge E2\n```\n\n**Das bedeutet, dass nur dann den Wert 1 hat**, wenn die Eingänge\n`E1` und `E2` den Wert `1` haben.\n\n**In allen anderen Fällen** hat der Ausgang `A` den Wert `0`. Anhand der Logik-Tafel ist dies leicht zu erkennen. In der Zeile, in der `A` den Wert 1 hat, haben die beiden Eingänge ebenfalls den Wert 1.\n\n\n\n### Logiktabelle\n\n| E1 | E2 | A |\n|:--------:|:--------:|:--------:|\n| 0 | 0 | 0 |\n| 0 | 1 | 0 |\n| 1 | 0 | 0 |\n| 1 | 1 | **1** |\n\n\n### Symbol" }, { "id": "VkPHBlWn4", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_AND", "id": "dfe56edb-1786-c146-29c1-46f29265a747", "x": 2893.25, "y": 2964.390625, "width": 30, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/AND.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_AND", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] } ], "image": "data:image/png;base64,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" } }, { "id": "84Ux21_nn", "type": "markdown", "content": "Hier ist die einfachste **UND-Verknüpfung** gewählt worden, nämlich die\nmit 2 Eingängen. Tatsächlich gibt es jedoch auch AND-Gatter mit mehr\nals zwei Eingängen. Die mathematische Logik bleibt dabei aber\ngleich:\n\n Nur wenn alle Eingänge den Wert 1 haben, hat der Ausgang\n ebenfalls den Wert 1.\n\nDie UND-Verknüpfung wird auch als **Konjunktion** bezeichnet, was so\nviel heißt wie **Bindung**.\n\n\n\n## OR-Gatter\n\nHier heißt die mathematischer Gleichung:\n\n```math\n A = E1 vee E2\n\n```\n\nDabei hat A dann den Wert 1, wenn `E1` **oder** `E2` **oder** `beide` (!) Eingänge den Wert 1 haben.\n\nDieses Verhalten unterscheidet sich von dem normalen Sprachgebrauch des Wortes *oder*. Hier bedeutet es: A hat nur dann den Wert 0, wenn beide Eingänge den Wert 0 haben. Sonst hat der Ausgang den Wert 1.\n\n\n\n### Logiktabelle\n\n| E1 | E2 | A |\n|:--------:|:--------:|:--------:|\n| 0 | 0 | 0 |\n| 0 | 1 | **1** |\n| 1 | 0 | **1** |\n| 1 | 1 | **1** |\n\n\n### Symbol" }, { "id": "Qjy-rhc8M", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_OR", "id": "f9ab724a-c653-1686-c015-d36e4cc4f32d", "x": 2864.25, "y": 3007.390625, "width": 30.8125, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/OR.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_OR", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] } ], "image": "data:image/png;base64,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" } }, { "id": "4f2HVzqDV", "type": "markdown", "content": "Die **ODER-Verknüpfung** gibt es ebenfalls mit mehr als zwei Eingängen, wobei sich die mathematischer Logik wie beim AND-Gatter nicht ändert. Eine andere Bezeichnung für das OR-Gatter ist die **Disjunktion**, das heißt **Trennung**.\n\n" }, { "id": "OXnEotHlr", "type": "markdown", "content": "\n\n## Inverter\n\nDas Schaltsymbol des Inverters ist unten abgebildet. Dabei lässt sich die mathematische Logik durch folgende Gleichung darstellen:\n\n```math\n A = not E \n```\n\n\n### Logiktabelle\n\n| E1 | A |\n|:--------:|:--------:|\n| 0 | **1** |\n| 1 | 0 |\n\n\n\n### Symbol\n" }, { "id": "yWnuuj5nj", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_NOT", "id": "903166bf-afad-0848-70ab-3763cd6f64d1", "x": 2823.25, "y": 3016.390625, "width": 36, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/NOT.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_NOT", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] } ], "image": "data:image/png;base64,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" } }, { "id": "B_HwC9V7a", "type": "markdown", "content": "Ein anderer Begriff für den Inverter ist die *Negation*. Indem man nun das AND-Gatter und das OR-Gatter negiert, erhält man zwei weitere wichtige Verknüpfungsschaltungen.\n\n" }, { "id": "uVPz8oNhf", "type": "markdown", "content": "\n## NAND-Gatter\n\nGebildet aus den englischen Worten **not and**, also **nicht und**. Daraus lässt sich bereits schließen, dass die Verknüpfung negiert sein muss. Die mathematische Gleichung bestätigt dies:\n\n\n```math\n A = not (E1 wedge E2)\n\n\n```\n\nDer Ausgang `A` hat immer den Wert 1, außer wenn beide Eingänge den Wert 1 haben. Anhand der Logik-Tafel lässt sich auch erkennen, dass die NAND-Funktion an ihrem Ausgang genau das entgegengesetzte Signal hat wie das AND-Gatter.\n\n\n\n### Logiktabelle\n\n| E1 | E2 | A |\n|:--------:|:--------:|:--------:|\n| 0 | 0 | **1** |\n| 0 | 1 | **1** |\n| 1 | 0 | **1** |\n| 1 | 1 | **0** |\n\n\n### Symbol" }, { "id": "Miex_uaeT", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_NAND", "id": "521e3e12-10b6-1035-ae11-c2698acee030", "x": 2865.75, "y": 2973.390625, "width": 35, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/NAND.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_NAND", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] } ], "image": "data:image/png;base64,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" } }, { "id": "-H_adXISM", "type": "markdown", "content": "\n\n## NOR-Gatter\n\nGebildet aus den englischen Wörtern **not or**, was übersetzt **nicht oder** heißt. Es handelt sich also wiederum um eine Negation, nämlich die der OR-Verknüpfung. Die mathematische Gleichung lautet:\n\n\n```math\n A = not (E1 vee E2)\n```\n\nBei dieser Verknüpfungsschaltung hat der Ausgang `A` den Wert 1, wenn beide Eingänge den Wert 0 haben. In allen anderen Fällen hat der Ausgang den Wert 0.\n\n\n\n\n### Logiktabelle\n\n| E1 | E2 | A |\n|:--------:|:--------:|:--------:|\n| 0 | 0 | **1** |\n| 0 | 1 | **0** |\n| 1 | 0 | **0** |\n| 1 | 1 | **0** |\n\n\n### Symbol\n" }, { "id": "RtaAdqLl7", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_NOR", "id": "45506108-947c-4717-84a9-181ec3831cf5", "x": 2994.75, "y": 3000.390625, "width": 37, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/NOR.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_NOR", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] } ], "image": "data:image/png;base64,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" } }, { "id": "yaHj4qDWi", "type": "markdown", "content": "Da diese beiden letzten Gatter sehr häufig vorkommen, haben sie ein eigenes Schaltsymbol. Außerdem sind sie für den Praktiker sehr interessant, da sie gegenüber den *UND-* bzw. *ODER-Gattern* meist erheblich billiger sind. Deshalb nimmt man häufig zwei *NAND-Gatter* um ein *UND-Gatter* billig aufzubauen, oder zwei NOR-Gatter für ein OR-Gatter. Die dafür notwendigen Schaltungen werden im Folgenden erklärt.\n" }, { "id": "vHNYXqkt2", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_NAND", "id": "ae17529e-a9a0-c649-98e9-086d91213c08", "x": 2761.75, "y": 2926.390625, "width": 35, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/NAND.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_NAND", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] }, { "type": "circuit_digital_gate_IEC60617_12_NAND", "id": "43cc1d99-c761-f1af-bb1c-f1a587a79569", "x": 2941.75, "y": 2926.390625, "width": 35, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/NAND.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_NAND", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", 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L7zEnp8Uord8QawzP00deYI3SB7x5mBuXv3biQnJ+Pbb79Fnz59wESHfdFMmTIFU6dOxaVLl3Ds2DHbl067du0qkXrhhRdsX0NPPPFEhZ/t3LnTtsbDbLNdbOw5e/bsXkEQ2FcOPTcJsNTahQBWAFhLUKom4E/xnJKSguvXr/tVPGs0Gt28efM6qVSq21vJuPotMGTIQDS/tYbiSGyxdZmWC0vw7Tg9ukfyiF5Qgtn9Q/BS54pXwpzNl5H4nQVXixVseUFvu/CShMYRwkH2jqMDMzc3F6NGjcLPP/+M5557jl3FjB9++AF/+9vfbBsC2HRYZmYmW+THW2+9hVdffbUSqRkzZti+aNhGgvLP6dOnbV80e/bsQUFBATsI+tO+ffs2y7JMXzR3QLHbYtl04ikA/pY01m9GhT/FM7vi+dq1a+XjWa5pUAaDIXTOnDmDAZTlhZOPWX6/19BmQIdxsdqQzg84dur60wMCXlxrxkdPhcCg4TBvpxURemBPfCjKVniyb8hY9LMVe8/JWDBIi7KMAiQ0NR0FNVC/owOTCcFTTz2FRo0agX3ZPPDAA7avj+nTp9u+RJo0aWLz/vz58/fc5szWaNiOtbfffrvCGk1RURHbJGBVq9Vn6tatmw5g8eTJk1nySHqIgFMEKJ7t40pKShrE83yioijNOI47uqO47bKd1q7DB7ZUDRvfUdO490NqbWjFD5MKRiUZtjWXUkFBVMTNnWTsAsstJ0WkvWpAx2Yq/JYnY+5OKw5elDGrnxZD29w5i0NCY7+Pgu4NRwfmypUrbQv+bHdZWlra7XQzV69excsvv4wtW25e/9OsWTPb9Bm7E+TuR5ZlvPvuu7ay7O6bRo0aiSaTSc7MzFSvWrXqp+bNm/+zW7duW15//XXKTBx0keabBlE8O8Z5yZIlsbIst5Vl+cfExMSL+PMlQ4PI8IlNw/HMnztruw97WKWOvCUid1s8kSPj4aQSrB6tw6NN7+w0G/yZCX+IVmHJUB2mbDZj/XEJ7z2hxZO3RCY8hEOImnadOdZDQfaWowOTnfpnGQFY+nX2RdOiRQsbCXb4kh3cZALCnocffhiffvrpPS+dYvnR1q1bhy+++MLapEmTXwoKCi6dPHky12q1rr58+fK2IMNLzfExAYpnN4FPK3wyTIP4id20/ce111R5YJNtXV65X8DpN0OhU985azN1qwXJBwR8M0aPfitL0aYhj2Ft73zJjGinRof7aTOAmz0UmMUdHZhsoZ9NnR0/fhx/+tOf8Oyzz9q+TNj6ykcffYQLFy6gQYMGtnM1Q4cOtZ2tqWpDQBmlZ555pvD48eMzS0pKfuZ5/tcLFy7QukNghpBfeU3x7IHumJ7XXqfSTB4Voxoyrr267uMPqTVs91jZs+AnK9hKzpTHKua2PHpFxpI9VgxqpcaWE5WTxPypowY9f0dC44EeCjwTjg5M1rJvvvkGH3/8MQ4dOmSbQmNCw7I433///WDXDLDdZmy9hm3rZGsxLE3NvR7KdRZ4sRIIHlM8e6iXphXe19Cgim/ZAM9M7KqJ6d9CrSl/UaU7tdAajTv0ArSsMwNTURSwrcjsNDXbtsnWXNhUGrs0je1I0+v12LBhgy27s9FotAkPCU2ABkaAuk3x7NmOC32neHSoVhn/YidN//+J1XBtGtXkNQGebRtZ8yEBZwZmmVtMcNh2Z3YYrWHDhpXuobly5crtXWgkND7sTKqKne9y+n4limc7gTOtsLuKw5SXOmueGPuoxhD7wJ0zOK6EXMePigtOXJcHOH/xmSu1URm/IBAXF5c+f/78GGcuPvOE4zR15gmKZONuAhTPXoqJxNzI++pq47s8wD8zqLW6OQfOtXucASz4yVJ8rkAeQkLjpb7yN7NLly7tcPTo0Y3Dhw9vxlL9V7Ul2Vs+k9B4i2zttUvx7O2+V7h6xuKXBFluB453WWi0KsV6o1T+BPPqZlfnsf3c0d5ub+DaZ8egGviD+8OGDYuKiYmZodFohtatWxe9evVC+/btfeYaCY3PUAdjRWzPbMPyDXv66acjH3nkkZkUz8HT3SQ0rvVlVwAxAO69Qu6aXZdKRUdHx0RFRfVnhdu0aYPY2FiMHj0aBoPBJXvOFiKhcZYYvX+LQHcArdmRrfJEoqOjH4mKirKlD6d4Do5YqVpo/nLl3heRONruvzcpcfTVAHzvawCRAPL9wfeIiIhGzZo1s+U76tGjB7p3744RI0YgIiLCJ+6R0PgEczBWsgEAC9Li8o2jeA6+rq4sNFPzO+o1fO8QleJy0jiDhpdKBaTnG8N+Cj5kaAogDcDfAOz0h/bFxcU91L59+ykqlap3ixYt1J07d6apM3/oGPKhOgJsHP3Cbpy4exxRPAdf4FQWmmkF73aL1EzvHsW7nG1Xr+GE7SeFg6dvKB/dyBN34MN6fvGXv4e6rw+AHwGw/0/1kE23zSxevLjjyZMnvxsyZEgTduCS43w3K0pfNG53X200UO04ongOrpCo/NtoepHRGKedxbJ0uvooCvDpQcGy9qiQuz1L+lhU5BR7uxJcrasGyvml0DAOrpw78AQ/EhpPUKx1NuyOI4rn4IkJrwhNGZ7/nhKxdK8gpmZLyy2C/Lnp/Qg25RToj90BUlMNfPzxxzONRmPrvn37+tSFkSNHFp46deql9PT0NT6tmCoLZAJ2xxHFcyB3b0XfvSo0rCqWhvrjfYJ5R5a4/VqRvOK6UrwDxvtLAxih3QFSU23r2bPn4YSEhPZsI4Avn/79+5fm5uZOPHTo0Cpf1kt1BTQBu+OI4jmg+7eC814XGlZbiaAgeb9o2pQpXNr1m7jYZNWswweGCwGK0e4Aqal2PfbYY/MHDBiQ+OKLL6rr1KkDtfpOWm9v+MTyo506dUp64403Lly7du3xjIyMc96oh2wGJQG746im4nny5MkXc3JyelE8ey7uvCI0bI2mqrXo/2SK7O6D0m1Z4icWmf8cc+qwXSeB9tgdIDXVoI4dOz6i0+nmjx49urPBYIjQ6XQun/i11wa9Xm8ymUzqtLS0M4cPH/4qNTV1rr0y9HMiUI6A3XFUg/H8dWpq6hzqLc8RcFhoTlyXsetM1RvRJnS+c1doqQCsPlyKPs21ePC+yn9RH74kY/Fuq7DztPRtkYjPbkihP8DIVb7wwHNt9LQluwPE0xU6Yy82NrZTRETEQLPZ3JjnXU8tYa/OsLCwwtLS0hBJkn7RarVf79y5M5D60F7z6OfeJ+DQOKJ49n5H+KIGh4WG3bY2cZ0Zo2IqX0C96rmbV/2y9ZitJyX89T/5+GpMGIbHVL4CmL2XU6Ig+YBYuuWEeOLwFXFxkcJtgTHsWlmD16xZo7106VIXnucjJEk6lJCQcNkXMBysw6EB4qAteo0I1FYCNI5qUc87LDTsus9JG824OrNOBTzMQFgIBzZdNmGtGRcKFew4LWLtWD2GPVz9GkFKuih+ecRatPmE/InMcavLptKWLFkyUpblSRzHNZFleaNGo5n32muv5fpJv4wG8CmADgAy/cQncoMIBBoBEppA6zE3/HVKaF7dYMbeVypmp6mvB35fj4esAC+vN2N8B43tjumU0faFhvm9+6yEhO/MyrFrSoppdtiYpUuX/k6SpO8VRbmdR+z48eOzV6xYcd6Ndnqy6FMAGgPoCYCmizxJlmzVJgIkNLWot50SGjZ1Ni624tRZtygVXu56899EGVDzgP7tIoeFJu28JC/eI5g3/SpuKjCG/XHRokVsyoyduL8977Zr167stWvX+kt2AZYOez2AL2tRnFBTA4lAYOQqJKEJpJhy01enhCZ+vRnT+lTMGBDTRIVnH6k4ReaI0BRbFaRmS9Z/HrRe3pElb8gvlZdiQUSW0WjURURE/AvAAI7jWMK9/Vu3bk3eunWrO+s0ntx9tR/AFTe5U3Ei4B0CU/I76g0BkauQhMY7EeCXVp0SGrZGY3ovzG5D7AnNuXwZ6zIkceV+654rhdK663L4Mhg5c5nhpKSkNgDGchwXqShKSkJCwha7ldILRIAIAFOLjN2iVDPcyVWoU0PcniUeyPZurkISmloUr04JDVujuTCt4mYAxqq+noOKv0OtOqE5clnGqsNWYdk+4fsSQfUPzA3dfC/eixYt0icmJppqUX9QU4mAewSmFhiNf9AFQq5CEhr3ejqgSjslNGyNZupdU2esta/30KJxnTummNCsHq3HU+V2nQkSkJotCqvSxbxv0oVNpTL/YYAe2AyoDiZnaxkBDwhNGbHyuQpLBPlzwbO5CkloalFoOiw0u36T8PkhoUo07/QLQWTEHVNs91l8Vy0ebXrzM+dKkYJtJ0Vh+T5r+qk8eV2OWLAMxsgbtYgzNZUI+IaAB4WGOVyWq3B7lrj9umdzFZLQ+CYi/KIWh4XGVW8zrrGpMkFeuV/8vlhQPjPNDlvtqi0qRwSIgB0CHhYaVtvNXIWCaVOm6MlchSQ0tSiYvSo0u85I4qp0sTh5v3W7pKgXYq5hXy1iS00lAr4n4AWhKWuEh3MVktD4PjpqrMYqhWZGb+2su7cxO+NhvllB2nnJunyf9dSBi/K/cy2qZXjfcNEZG/QuESACLhC4h9A4mquQ1bgzW0KeScEzbe3lKhQ/uyFFuJqrkITGhe4N1CJVXOWc/9agFtr3B7dSu3yV8w0zLJ8etKbll8qrC4zhKwMVDvlNBAKOwD2ExpFchaytZ/NlPPeVGWZRwZHXK2YBKWNRlqtw86/CiSNXJVdzFZLQBFxwue5wFUJT2CtErYzS8LzL6VXCdFzJ5TxlOz4I+9F116gkESACThO4h9DYy1XI6jEJwPRtFmzIEBGuwz2FpsynlHRB/PKI4GquQpYzcDmALgB+dbqdVCCgCFQWmoByn5wlAkSgAoFqhKa6XIXMxtdHLEjaLaHj/Tz2npfsCg0r40SuwvKX4rHfOyxnIDv93Q+ATL0Y3ARIaIK7f6l1tY1ANUJTXa7CzGsyxqYUYWqfUGTfkJHyi+CQ0LBchUl7BPMW+7kK88p1Bfu9w4TnawBralsX1cb2ktDUxl6nNgcvgWqE5l65Cp9srcZL/zYjK1dG8ggdVqYJ2HxSxKbxerRoUC7lRzlq5XMVbs+SNxTaz1V46S7o7Hbds8HbEdSy8gRIaCgeiEAwEbCzRlNVrsKLBQpaLSpG9ygVmt/HY985CadvKIjvqsEHg0Iq0aFchcEUML5pCwmNbzhTLUTANwTsrNFUlauQXe+R9LP1tn+7f5Pw63UZk3tq8U5cxWztt3MVpknbSqzcJ5Sr0DfdGui1kNAEeg+S/0SgPAE7azSO5Cqct9NaaY2mLFfhF+li3reUq5BizkkCJDROAqPXiYBfE7iH0DiTq3DLCRFpFyTM6ndz2qx8rsKTufK6XJlyFfp1DPihcyQ0ftgp5BIRcJmAh1PQ3M5VeEDaVmyV/0W5Cl3umVpdkISmVnc/NT7oCHhQaH46I4lfUq7CoAuRmmgQCU1NUKc6iYC3CEwtMM7oq5s1rW/FRXxnqss33cxVuCzNmnXwgryOchU6Q4/erYoACQ3FBREIJgJTC98c1Fo9Z3BL13MV5plgSWa5Ck1ySsGs8ORgwkNtqRkCJDQ1w51qJQLeITCNchV6ByxZdYcACY079KgsESACRIAI2CVAQmMXEb1ABIgAESAC7hAgoXGHHpUlAkSACBABuwRIaOwioheIABEgAkTAHQIkNO7Qo7JEgAgQASJglwAJjV1E9AIRIAJEgAi4Q4CExh16VJYIEAEiQATsEiChsYuIXiACRIAIEAF3CJDQuEOPyhIBIkAEiIBdAiQ0dhHRC0SACBABIuAOARIad+hRWSJABIgAEbBLgITGLiJ6gQgQASJABNwhQELjDj0qSwSIABEgAnYJkNDYRUQvEAEiQASIgDsESGjcoUdliQARIAJEwC4BEhq7iOgFIkAEiAARcIcACY079KgsESACRIAI2CVAQmMXEb1ABIgAESAC7hAgoXGHHpUlAkSACBABuwRIaOwioheIABEgAvaM/68AAAA2SURBVETAHQIkNO7Qo7JEgAgQASJglwAJjV1E9AIRIAJEgAi4Q4CExh16VJYIEAEiQATsEvh/uTmCbqFwm70AAAAASUVORK5CYII=" } }, { "id": "vBJUkOe4C", "type": "markdown", "content": "Bei dieser Schaltung hat der Ausgang `A1` nur dann den Wert 0, wenn beide Eingänge, also `E1` und `E2` den Wert 1 haben. Der offene (nicht angeschlossene) Eingang `E4` hat generell den Wert 1. Um aber am Ausgang A2 den Wert 1 zu erreichen, muss deswegen `E3` und somit am Ausgang `A1` der Wert 0 anliegen. Dies wird, wie oben schon beschrieben, nur dadurch erreicht, dass man den Eingängen `E1` und `E2` den Wert 1 zuordnet.\n\n```math\nA1 = not (E1 wedge E2)\n\nA2 = not A1 = not (not (E1 wedge E2))\n```\n\n`not ( not (E1 wedge E2))` ist aber nichts anderes als `E1 wedge E2`; somit gilt die Funktionsgleichung der normalen UND-Verknüpfung: \n```math\nA2 = E1 wedge E2\n````\n\nDies beweist, dass die obige Schaltung einer normalen UND-Verknüpfung entspricht.\n\n" }, { "id": "nHm7yNaOX", "type": "markdown", "content": "\n## EX-OR-Gatter (Exklusiv-ODER)\n\nEine Variation der Zusammenschaltung der 5 Grundgatter ist das *Exklusiv-ODER*. Im Gegensatz zur ODER-Verknüpfung tritt am Ausgang nicht der Wert 1 auf, wenn beide Eingänge den Wert 1 haben. Diese Funktion entspricht jetzt dem *oder* wie es im normalen Sprachgebrauch verwendet wird. Das heißt, dass am Ausgang der Wert 1 vorliegt, wenn **entwedder `E1` oder `E2`** den Wert 1 haben. Sobald `E1` und `E2` den gleichen Wert haben, liegt am Ausgang A der Wert 0.\n\n\n\n\n### Logiktabelle\n\n| E1 | E2 | A |\n|:--------:|:--------:|:--------:|\n| 0 | 0 | **0** |\n| 0 | 1 | **1** |\n| 1 | 0 | **1** |\n| 1 | 1 | **0** |\n\n\n\n\n### Symbol\n" }, { "id": "pfJ1aokxI", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_XOR", "id": "f4f9f96a-8f88-235c-c8f5-5576e0cde314", "x": 2704.25, "y": 2901.390625, "width": 30.8125, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/XOR.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_XOR", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] } ], "image": "data:image/png;base64,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" } }, { "id": "0bwI4Zlrv", "type": "markdown", "content": "\nDa diese Verknüpfungsschaltung sehr häufig vorkommt, hat auch sie ihr eigenes Schaltsymbol. Sie kann aber auch durch die Zusammenschaltung von 2 Invertern, 2 AND-Gattern und einem NOR-Gatter aufgebaut werden. Die mathematische Funktion lautet:\n\n```math\n A = (not E1 wedge E2) vee (E1 wedge not E2\n```" }, { "id": "CD8ZOmA8R", "type": "markdown", "content": "\n## EX-NOR-Gatter\n\nEine Variation des EX-OR-Gatters ist diese Schaltung. Dabei wird nur der Ausgang A der oberen Schaltung invertiert.\n\n\n### Logiktabelle\n\n| E1 | E2 | A |\n|:--------:|:--------:|:--------:|\n| 0 | 0 | **1** |\n| 0 | 1 | **0** |\n| 1 | 0 | **0** |\n| 1 | 1 | **1** |\n\n\n## Symbol" }, { "id": "ihCO8wsRB", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_XNOR", "id": "32d353bf-a073-d803-deaa-1f4230db0ae7", "x": 2849.25, "y": 3108.390625, "width": 40.5, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/XNOR.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_XNOR", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] } ], "image": "data:image/png;base64,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" } } ] }, { "id": "_KUSpYnzi", "name": "Gatter mit mehreren Eingängen", "sections": [ { "id": "xW-uhiWtL_", "type": "markdown", "content": "# Gatter mit mehreren Eingängen\n\nOftmals ist es nötig, Verknüpfungsschaltungen mit 3 oder 4 Eingängen \nin eine Schaltung zu integrieren. Haben Sie diese Gatter nicht zur \nHand, so kann man sie mit den unten abgebildeten Schaltungen aufbauen.\n\n\n\n## AND mit 3 Eingängen aus 4 NAND\n\nZuerst die AND-Verknüpfung mit 3 Eingängen. Die folgende Tabelle zeigt, dass die abgebildete Schaltung einem AND-Gatter mit 3 Eingängen entspricht. Eingezeichnet sind auch die Zwischenausgänge `Z1`, `Z2` und `Z3`.\n\n\n\n| E1 | E2 | E3 | Z1 | Z2 | Z3 | A |\n|:------:|:----:|:---:|:-----:|:----:|:---:|:-------:|\n| 0 | 0 | 0 | 1 | 0 | 1 | **0** |\n| 0 | 0 | 1 | 1 | 0 | 1 | **0** |\n| 0 | 1 | 0 | 1 | 0 | 1 | **0** |\n| 0 | 1 | 1 | 1 | 0 | 1 | **0** |\n| 1 | 0 | 0 | 1 | 0 | 1 | **0** |\n| 1 | 0 | 1 | 1 | 0 | 1 | **0** |\n| 1 | 1 | 0 | 0 | 1 | 1 | **0** |\n| 1 | 1 | 1 | 0 | 1 | 0 | **1** |\n" }, { "id": "5OhR2PJXH", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_NAND", "id": "9407c0bf-9403-c362-8602-997ae8a8d1f5", "x": 2680.75, "y": 2937.390625, "width": 35, "height": 40, "alpha": 1, "selectable": true, "draggable": true, "angle": 0, "userData": { "file": "circuit/digital/gate/IEC60617-12/NAND.shape" }, "cssClass": "circuit_digital_gate_IEC60617_12_NAND", "bgColor": "rgba(0,0,0,0)", "color": "rgba(27,27,27,1)", "stroke": 0, "radius": 0, "dasharray": null, "labels": [] }, { "type": 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} }, { "id": "-nD2IAtKb", "type": "markdown", "content": "Nach diesem Schema lässt sich auch eine UND-Schaltung mit 4 Eingängen aus 6 NAND-Gattern aufbauen usw.\n\n" }, { "id": "LEEnH1XHo", "type": "markdown", "content": "\n\n## NOR-Gatter mit 3 Eingängen aus 3 NOR-Gattern\n\nDie folgende Logiktafel mit den Zwischenausgängen gibt auch hier wiederum Auskunft darüber, dass das Verhalten der Schaltung dem eines NOR-Gatters mit 3 Eingängen entspricht.\n\n\n\n\n| E1 | E2 | E3 | Z1 | Z2 | A |\n|:------:|:----:|:---:|:-----:|:----:|:-------:|\n| 0 | 0 | 0 | 1 | 0 | **1** |\n| 0 | 0 | 1 | 1 | 0 | **0** |\n| 0 | 1 | 0 | 0 | 1 | **0** |\n| 0 | 1 | 1 | 0 | 1 | **0** |\n| 1 | 0 | 0 | 0 | 1 | **0** |\n| 1 | 0 | 1 | 0 | 1 | **0** |\n| 1 | 1 | 0 | 0 | 1 | **0** |\n| 1 | 1 | 1 | 0 | 1 | **0** |\n" }, { "id": "ZDc7wCm_e", "type": "brain", "content": { "draw2d": [ { "type": "circuit_digital_gate_IEC60617_12_NOR", "id": "5597f92b-bf1f-4701-af91-ad1f00aba7e4", "x": 2722.75, "y": 3028.390625, "width": 37, 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" } }, { "id": "2Sv56RS0I", "type": "markdown", "content": "Auch bei dieser Schaltung lassen sich durch Hinzufügen weiterer NOR-Gatter Schaltungen erzeugen, die sich wie große NOR-Gatter mit noch mehr Eingängen verhalten.\n" } ] }, { "id": "3nD3Ftdi0z", "name": "Takgeber", "sections": [ { "id": "OC2aMIsO-c", "type": "markdown", "content": "\n# Taktgeber\nDer Taktgeber ist besonders für die im folgenden beschriebenen Flipflops, Zähler und Speicher von Nutzen. Dazu wird jeder Zeitabschnitt im Programmablauf einer digitalen Schaltung in Taktimpulse eingeteilt. Der Takt wird durch einen dauernden Wechsel von H und L, dem sogenannten Dauerimpuls, an eine Schaltung gelegt. So z.B. auch an jedem Computer. Für Versuchsschaltungen und zur genauen Verfolgung der Schaltzustände ist es von Vorteil, wenn die Taktlänge variabel ist. Man kann dadurch langsam den Programmablauf der Schaltung kontrollieren oder schnell das Verhalten prüfen.\n\n\nEine solche Schaltung für schnelle Taktimpulse ist in er Abbildung dargestellt. Es ist ein astabiler Multivibrator mit 2 Kondensatoren die zwischen 22 nF und 1 µF liegen und mit 2 Widerständen die zweckmässigerweise wegen der Impulslänge als Drehpotentiometer verwendet werden. Man wählt am besten Drehpotentiometer in der Grössenordnung von 3,3 k. Weiterhin werden 2 Inverter verwendet.\n" }, { "id": "sZKg2OqZj", "type": "image", "content": 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FjGoGMg0aEXjNCHH354e28fHSAICZR1wpkC76+XXnopunI3zg/5Y1kHDgwWOtpm9cILL8TOsHGeSv1Oh8nRHR0xmMJb7rnnnotekuSFdnLvvffGvVnYZ6qdqCuWfbNODOT4P2PFoamDCpvr+b9hORARa68oFsrKakbjpFA1plHnv//whz/MlAACgVDeeuutLeaDjnX8+PHhwgsvbPHali6gQ+AfjdkkjgbMqHAw+O53vxtnGC19v6W/UyYiK2SdmBGwEZrjMPAcTCn96U9/ijPklgQIgbjsssvC+eefX/XsI9jk54EHHmgIwXX22WeHSZMmVWSm01IB2BPYFnfylu7b2r/z/4C9ixUHooBkkRSqLKj7zKQIsGRBKCbW3++7775w6KGHxlhzxx9/fFL5NDMdSwA7HpuJ8XRjJscS6bnnnrtNmKaOzVV9Pk2hqs96t9SNCLBcwbIXMQYZQV911VXRbTuF0WyjbPprBxPAToLXHEvhzCgI2cU+pFpypOhgZFV7nO7pVUPrjWuJAGKFAwEdEkFPUxMp7HeFVy25SNdSGyiVV8SKGfegQYPismktihQ2plpvMwpVqdbpZxJIiAAeZ3jqsQTFXh6Ou8CWZpJAcwTwjMWbknBivLC5sYTJgKfWkkt/tVZj5rfuCOBtRhRwlp3wrOLIEpYoiW9nksD2CCBUeK/iuXrA1iDNhEJCqJp67m3v+yl9rlClVBvmRQIlCODpNnbs2Pgq8Wc/kkBJAsQ7HDVqVHyVvKCGPnTpr4Yqy6xKQAISqEcCzqjqsdYtswQSI9C/f/+4RYDlqaFDh4bGG6RZ4hwxYkSDs0sKm2ATw5f77ChUua/i2ikgnndsKGRDJ4nfG8e3I1rC6NGjYzw6Oi9irpnyQYA9a+xfI9QUS1aNT2Smnq+44opoX8EzsxJhrfJBrX5KoVDVT10nX1JcgTH6cn4OCeFqLFQcJ/7jH/+44fC2pvHAki+gGdwuAeqWV6lERA1mXKb6JaBQ1W/dJ1nywn6mUplrKlylrvEzCUggfwR0pshfnVoiCUhAArkioFDlqjotjAQkIIH8EVCo8lenlkgCEpBArggoVLmqTgsjAQlIIH8EFKr81aklkoAEJJArAgpVrqrTwkhAAhLIHwGFKn91aokkIAEJ5IqAQpWr6rQwEpCABPJHQKHKX51aIglIQAK5IqBQ5ao6LYwEJCCB/BFQqPJXp5ZIAhKQQK4IGOsvV9VpYVIlwAm906dPjxHhs8zj3Llztxv8Nct8+extCRB0ef78+Q0R5be9ouM+Wb16daZH2CtUHVfXPqlOCfTq1SsMGzYsHiG/YcOGTClwRMaQIUMyzYMPL4/A4MGD49EmH3zwQfjwww/L+1KVruJ4HaLYZ5UUqqzI+9y6IbDffvuFSy65JGQtUgBnlJ5lh1M3lV6Bgh5zzDFh4MCBYfPmzRW4W/tuwXE73bp1a99N2vFthaod8PyqBMohgDh06dIlvsq53mskAIHOnTuH7t27C2MrAZ0pbAYSkIAEJJA0AYUq6eoxcxKQgAQkoFDZBiQgAQlIIGkCClXS1WPmJCABCUhAobINSEACEpBA0gQUqqSrx8xJQAISkIBCZRuQgAQkIIGkCShUSVePmZOABCQgAYXKNiABCUhAAkkTUKiSrh4zJwEJSEACCpVtQAISkIAEkiagUCVdPWZOAhKQgAQUKtuABCQgAQkkTUChSrp6zJwEJCABCXjMh21AAhkR2LJlSzwQb8WKFfEIkAMPPDCjnPjYFAlwWOJrr70WevbsGTjTjDOh6jXVb8nrtcYtd9i4cWNYsmRJWLRoURENBIPXgw8+GLp27Vr0t7333juMGDEinhFU9IdWvlm3bl3sfBYsWBAWLlwY3nvvvXg4HieomtIl0KlTp8CrmqnQNmgXvJYvXx6OOuqoMGrUqKo/u5rlqsS9FapKUPQeNUWAkers2bPD22+/Hfr06dOQ908//TQcffTRYfXq1WHNmjUNn3MUOC9OW+3Ro0fD5+X88sknn4TXX389vPLKKwFxQhzfeOONKIg879RTTw2c5MqI2ZQtgWXLloXHH388vPPOO0UZoe5oEy+++GI8Ibnwxz333DOcfvrpRW2o8Ldyfn788cdh6dKlsV3QNhg8IU4MlhCts846K7ZH2gaHKNZzUqjqufbrtOzMqFatWhUOOeSQcMIJJ7RIAXGZMmVKnIm1ePH/L0AE77vvvvCf//wnChWdz5tvvhlnUJ999lkYMGBA+NrXvhaPqP/c5z5X9yPmcrlW8zoEibru3bt30YBkzJgxsX6azqhmzpwZBy+NBzvl5I9nPPTQQ2HevHkNwkTboE0yeNl///3DxIkTw1e+8pVwwAEH1PWSX4GnQlUg4c+6IsB6Px0SHUFLiZHvLrvs0tJlRX9nRMzo/NZbby0SOJ47ZMiQ8O1vfzucc845zqSKqGX75qOPPopt4rTTTgv9+vVrMTP//ve/i+q2xS/8/wIGKnfccUeYM2dO2LRpU9HXmF1/85vfDOeee25guXmHHfR3A5BCVdRMfCOB9hOgI0LcWPbj90Laddddw3HHHRe+853vBDrD1i4jFu7jz+oRYCCx8847lzUwaYuI4EDDsjLtY/PmzQ0FYWnvjDPOCF//+tfjcvAee+zR8Dd/UahsAxKoGAE6nrfeeivMmjUr2htYWkSYmFl17949itOkSZPC8ccfH738KvZgb1QTBBYvXhwefvjhKFRjx46NtjC8+rp16xYuuuiiMGHChGiv7NKlS02UpyMz6YyqI2n7rFwSYJSM9x4C9fLLL8flPGxf2C4YGWOkZ5mP0TJeXPVuGM9lI2imUDjPYJPCbrnvvvtGuyhLztiqmMEhUtijGNjstNNOzdypfv+kUNVv3VvyChDAG+xf//pXmDt3brQpfP7znw9HHHFE6Nu3b0DAMMCzxHfiiSfGjqipQb4CWfAWiRLAe5AZFJ592JtoG9gn2RfFsuFXv/rVcPbZZ8fP8exry1JiokWveLYUqooj9Yb1QADDO8b0p556KnY87LEaNGhQ9NgqdDiI0sEHHxz69++/zb6semBUr2Vk8PLII4+El156KQrUscceG4488sjQq1evotk0S8DMqHg5gGm+tShUzfPxrxIoIoAR/Nlnnw2PPfZYFJ9hw4ZFF2WiStDhNE2Fjqjp577PHwE8PR999NG4JYElXzz4Bg8evN2oEtqiym8D2/5nlf9dr5RA3RDYsGFDeO6558ILL7wQR78s77EBmBkTXmKm+iVA23jyySejuzkRTVjeo30wk7ZtVKZdKFSV4ehdckqATojIEggUo2RmUIceemhgky7u5qb6JYANkqVfbJTMnA8//PD4wlGitfvu6pdieSVXqMrj5FV1RoCNmK+++mq49957oyffXnvtFd3LcTfHndhUvwTYhkDEETw8iSQxcuTIaJ9kdt00RmT9UqpsyRWqyvL0bjVOgA267G2ZNm1aDHmEgwSbc5955ploEFekaryC25l94v3df//9cS8Us+0vfOELMSYf7UKHiHbCbebrClUzcPxT/RBglEy8NQSKjZks7Z133nlxmQ834+eff75+YFjSbQiw54nYjWzoZuZ00kknxd+xQ+22227bXO8HlSWgUFWWp3erMQLYGd59993YCTFaxr4wbty4KFRsziQ1jaZdKGIhVFLhPRt5MZ6X8v4rXOPP2iJANPPp06fHzbm0jTPPPDPaoVgK/uc//1lyFrV+/fq4JEhJmWXRHmgXhW0LtUUgjdwqVGnUg7nIgABHd/z9738PTz/9dPTQYvMlMykiSpSzjLN27doYceCee+6JIZIwpjMrw25BxG1G3XZOGVRsBR7J4AWB+u9//xvbBnH4qN999tmnaC9UqUexwfe2226LYbQ4Noa2xGe4qjNLJxhyOe2r1L3r9TOFql5rvo7LjaMEhnD2Q+HFx7k/ePKxjNMaYWEfDFEGCJGEuCFMjMBxwLjhhhui5xfRCEy1Q4B9chzpQtgjNuhy3hQCxey63PBGXMusimNDCJ3F4AfvQGZg2LUuvfTSuBG4dqhkn1OFKvs6MAcdRIDO44knngh33XVXeP/992NYo/PPPz9Gk2jLch3LOXRKdGgsBRHHj71VHMx49dVXx8gVClUHVW47H0PbwA7FRu6hQ4eGk08+Oe6FIrRRa/dCcaAi32M7A/as4cOHBzaE33nnnfH0aJYPCalkKp+AQlU+K6+sUQKMYonFx0wH92FczDGAszHzoIMOalepWMJpPAvjaA9EkM6NZSJT2gSYXTPbmTFjRpwBMdBg2ZaZdnv2yWGvbLy8R5tADJm1u8eq9W1CoWo9M79RIwTohIi3NnXq1HguFDHXWOJDRFauXFkxpwc8BgvBaYlQwB4bomFzzLwpTQLUGYOXBx54IAYPZhbFUSy4mSMm7RGpQolpf8zS2DBO7D8GRePHj482qsI1/iyPgEJVHievqiECODMsWbIkLvGxDFcQKJZfsCvh8FDJhOcgQWoJsYRjBRtAOaW14DVYyWd5r/YRoK6wT7INgRkODg7YoDj+HWGhvVQqcT+O9mC5mTiAV155ZTziwxh/rSesULWemd9IlADu4jgz3H333WHFihWhENEcgarmXheW/ljmw66BQM6bNy/OsHCwMKVDgLpBoDg7DHHiRdvYfffdi5bpKpVjlvjYMI6X3x/+8Ie4kRybZeMlwUo9K+/3UajyXsN1UD6WcdjrhJPEggUL4gyKZbcBAwZEg3a1EdDxMEomEOkFF1wQrr/++vDHP/4xXHfddR3y/GqXr9bvz6AF+yQu4ogTM14EiqW+xvbFSpcTOxVeoRyiSbu8/fbbw2GHHRadeMr1IKx0nmr1fgpVrdac+Y62BWxD2KBYdsMAfvnll4cDtm7MpIPoiIRIsoSEwwadD3m4+OKLw+9///tw0003xeWeStg7OqIseXsGMyfCHWGnxPuOPUz8xCuvmgIFx40bNwZc3ZnlM2ObOHFiWLhwYWwXPJ8lR096Lr/FKVTls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" }, { "id": "AXubkB8Kx", "type": "markdown", "content": "\nBetrachtet man das Oszilloskopbild dieser Schaltung (s. Abb. 21), so fällt auf, dass bei den Übergängen der beiden Bereiche keine genaue senkrechten Flanken entstehen. Dies spielt jedoch bei einer digitalen Schaltung keine Rolle. Die Impulslänge kann nun durch die Drehwiderstände verändert werden. Die genaue Dauer des Impulses und der Taktlücke lässt sich durch die Gleichung t=R·C bestimmen. \n\n**Bei R=3k und C=100 nF erhält man also einen Impuls von**\n\n```math\nt=3*10-4 s\n```\n\nEinen besseren AMV (astabilen Multivibrator) zeigt Abb. 22. Das Herzstück dieser Schaltung ist der Präzisionstimer NE 555, der verhältnismäßig günstig ist. Der Vorteil des Timers ist vor allem die erhöhte Frequenzgenauigkeit und die genauere Impulsform der Rechteck­spannung. Dies ist deutlich am Oszilloskopbild zu erkennen. Außerdem ist die Ausgangsleistung mit etwa 200 mA deutlich höher als bei der vorherigen Schaltung. Die Impulslänge kann durch Wahl der Widerstände und des Kondensators zwischen einigen ns und mehreren Sekunden (50 s und mehr) variiert werden.\n" }, { "id": "H9uFU32GY", "type": "image", "content": 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b4A4ZIJe3pGjx6dytyYnARIgARIIDUE2FNMDa0Apa1Tp44qCW6Q4P4Im12xYXX48OFqpVhyJ2MHSE0WQwIkQAKOI8CeogWbFEOmiaV+/frKmwP8GVJIgARIgATMIUCjaA5XQ3PFsmn4IixSpIjaP2Ro5syMBEiABEjATYBG0Y3CehdYSt2/f3+pWLGicuy7ZcsW8dWLtJ7m1IgESIAE7EmARtHC7YbFNWXLllVeI+AH0J8nBxwiqj9yxcJVomokQAIkYGkCNIoWbh64NBo0aJC0bdtWLbA5d+6cT20/+eQTee+993zGMZAESIAESCDlBGgUU84qaClnzJghmFfs3bu3lw44EgbeKOCGDGeVUUiABEiABNJOgEYx7exMexL+BSHnz59Xn3C9NGfOHFm0aJHalqECE/7B+Wc4ggVzj4E4gFNfNq9JgARIwGkEaBQt1qIbN250O/CdOHGiOnATKsI7fWRkpIwaNUq6dOmiDgxFOE65WLlypdqugWNhNIOKOAoJkAAJkEDqCHhviEvd80xtMAGcYRYVFeUzVxhE/GmyevVq6dWrl3KUi7BffvlFebwfMGCAloSfJEACJEACqSDAnmIqYFkp6bFjx1TPEY5yNSlQoIAymnrfqVocP0mABEiABJInQKOYPCNLpihevLhgqBXHvmjyxhtvqHP27r77bi2InyRAAiRAAqkgQKOYClhMSgIkQAIk4GwCNIrObl/WjgRIgARIIBUEaBRTAYtJSYAESIAEnE2ARtHZ7cvakQAJkAAJpIIAjWIqYDEpCZAACZCAswlwn6Kz29ddu+zZs8u0adPkm2++cYfhAu7hwsLCJHfu3O5wuI5r0aKF+54XJEACJBAqBGgUQ6SlH330UeVYPHF133//fXX6RqdOnTyiYCiDJXFxcXLkyJFgFe9V7okTJ5TLvd27d3vFBSMA+pw5c0asoo/GoFChQgKXhBQSsDMBGkU7t14qdddv9NcexfmMWbJkEV9xWppAf44bN05wliQOVbaCxMbGyo0bNyxjhKDP9evXZe/evVbAo3SAe0E4pp8/f75ldKIiJJAWAjSKaaHGZ0wlAAP04osvCnq3FHsQ+PXXX+W1116zh7LUkgSSIMCFNknAYRQJkAAJkEBoEaBRDK32Zm1JgARIgASSIECjmAQcRpEACZAACYQWARrF0Gpv1jaFBK5evSpff/21Wjhy8uTJFD5lfjKsOMVh0xQSIAFzCNAomsOVudqcwPPPPy9169ZVi32eeeYZdYhzsKt08+ZN6d27t3z33XfBVoXlk4BjCdAoOrZpWbH0EIiJiVF7EzNlyiTYN4kVscEW7CmNiIgIthosnwQcTYBbMhzdvM6q3KpVqzz2CjZp0kSqVatmSiWHDRsmrVu3ls6dO8vbb7+tvP6YUlAKM123bp2ULVtWTp8+rbwQpfAxJiMBEkglAfYUUwnMScmxAXzr1q0SFRUlx44ds3TVXC6XvPvuu7Jv3z45fPiwzJ49WzDvZ5Y8+OCDct9998mMGTOUITKrnJTki2HT6Ohoad++fUqSMw0JkEA6CLCnmA54dn4UBrFRo0ayadMmVY2FCxfK+vXrpUqVKpas1rVr1+TLL7+UPHnyKP0eeeQRNednlrJdu3ZVvmIfe+wxefrpp2X//v0e/mHNKtdXvtu2bVM+a1euXKkM9JUrV6RSpUrSr18/X8kZRgIkkA4CNIrpgGfnRxcvXuw2iKgHXId169ZNEvtADUYdMZ9XokQJj6Lhhk5zRXfgwAEpXbq0R7zRN+iRwo8neowYRj1+/LhUqFDB6GJSlF/NmjVVbx6Jp0+froaQe/TokaJnmYgESCB1BGgUU8fLMakvXLjgVRcsKsG8VbAFxihr1qx+1Zg7d648/vjjfuONiBg4cKBMmDBB9Zwxbxksg4i6ZMyY0d1DzpEjh5rfTIqPEfVnHiQQqgRoFEO05du2bSv58uWTc+fOuQlERkZKhw4d3PfButi+fbvkzJnTb/E7duyQ4cOH+403IgLbMG7duqXmLZs3b25Elobk0adPH0PyYSYkQAK+CXChjW8ujg/FCRQbNmxQ83LYj4cN4VYwiMmBP3jwoJQqVSq5ZIbEo4eGnhmFBEggdAiwpxg6be1V04oVK6o5xOLFi9tmZeO8efNMHzr1AsUAEiCBkCFAoxgyTe2MimIlaLFixZxRGdaCBEjAcgQ4fGq5JqFCSRGgQUyKDuNIgATSS4BGMb0E+TwJkAAJkIBjCNAoOqYpWRESIAESIIH0EqBRTC9BPk8CJEACJOAYAlxo45imTLoiOBPw22+/9ToC6ccff5S8efOqkyD0OYSHh0v16tX1QbwmARIgAccToFF0fBP/XUH4zYTv0KZNm3rU+I477lAeUv788093+KFDh5QLuMmTJ7vDeEECJEACoUCARjEUWjmhjg0bNpSXX3452RqvXbtW4EqNQgIkQAKhRoBG0WItjuHMn376ya1V5syZ1fBm7dq1pUyZMu5wXpAACZAACRhPgAttjGearhwxl3fp0iXp27ev8rtZvnx5WbNmjVStWlVGjx6drrz5MAmQAAmQQNIE2FNMmk9QYuvUqaPKhU9SDHk2btxYTpw4oZxg45w/s49NCkqlWSgJkAAJWIAAe4oWaITEKmDINLHUr19frRzds2dP4ijekwAJkAAJGESARtEgkGZmgyOMpk6dKjjZIiIiwsyimDcJkAAJhDQBGkULN//y5culf//+gtMsmjVrJlu2bBFfvUgLV4GqkQAJkICtCHiP09lKfWcri8U1R48elf3798u0adM8ToeIjY1VJ8OfPXtWatSoIXv37pVHHnlE7r77bmdDCWDttm3bJtiekli6dOkit912m2TJkiVxFO9JgARsToA9RQs3YIkSJWTQoEHStm1bwQKbc+fOubXFlzKGU//66y956qmn5NVXX5U2bdrIgQMH3Gl4kT4CixcvlipVqkiGDBkkOjpaOnbsqJwa5M6dW/r06SNwiEAhARJwFgEaRRu054wZMwTzir179/bQNiwszH2fPXt2ZSRPnTrlDuNF+gh06tRJzeGuW7dO/TDBsVVDhw6VrFmzCtrk/vvvT18BfJoESMByBGgULdckIhcvXlRanT9/Xn3efvvtMmfOHFm0aJHalqFXeceOHTJ9+nRp2bKlYCvHPffco4/mdToIVK5cWa34/f7771UvHFkhDLzbt28v169flzFjxsgLL7wgX3zxhdSsWVP15gcOHKjmgrWiZ86cqdquc+fOag/quHHjVE8TPdGHHnpIS8ZPEiABCxCgUbRAI+hV2Lhxo+BLEzJx4kTZsGGDum7SpIlERkbKqFGjBHNa6L1AMO/Yo0cP+frrr2Xnzp2CL2CKcQR++OEHKV68uBQoUMCdaaZMmQROFdBTh6OFa9euCfaUXrlyRebPn68WRV2+fFmlf+2119TcI/abohefM2dOZWjx7F133SWDBw9258sLEiCB4BOgUQx+G3hoUK9ePYmKilJfnMuWLZMGDRq442EQXS6XfPbZZ9KoUSN3OC4wfFqpUiVBz5FiHAH82GjRooVHhmgXzN9CVq1aJa1atXLP9z7wwANqrhE9dxjMTz/9VLJly6aMJU4pwfwk5iKx77RatWpy7733euTNGxIggeAS4OrT4PJPc+lYffq///1P9u3bp4bzsEoVC3FgOCnGEYABnDRpkjtD/CjBqlT00HGySFxcnBoCHTlypMAgwtsQVqxigRR6mWXLllULdJABju+CUTxy5Ijq7bsz5QUJkIBlCNAoWqYpUqcIVp/OmjUrdQ8xdYoJYEgUDhN++eUX+f3335W7PRi0gwcPys2bN1WPHCt9sTIYgh4jts3cuHFDDZNiiwx685gX7tWrl8Che+vWrWXp0qVqgU7GjBykSXFjMCEJBJAAjWIAYbMo+xDACtNnn31W/em1Rs8Pp5hgW4Z+6FOb40Xa3bt3S548edRjcLiAXj1+xEDQk8TWDgoJkIA1CfDnqjXbhVpZmAAMYlKiGUQtjWYQtXu7fKKXjOH4Xbt22UVl6kkC6SZAo5huhMyABJxH4PDhw7J69WopWrSoGgbGsDGFBEKBAIdPQ6GVWUcSSCUBbEPB/kvIggUL1KrnVGbB5CRgSwLsKdqy2ag0CZhLAHsxIZs2bVJ7MDGXSiGBUCDAnmIotDLrmCYCmzdvVtsq2rVrJ6VKlVJ5LFmyRB34jH2IW7duVdsr9Jljz2K5cuX0QeoaThXgqQgnnmj7HrE4B3lgIz98qWriK60WF8jPM2fOCLzuwIMPvCXR+04g6bOsYBGgUQwW+QCXi+0E2A5w7Ngxj5KxZw4rLQsVKuQOx366woULu+9D9QKG4K233lILTT788EOFIX/+/GpbBlaR4vSSKVOmyM8//6xWmI4ePVp5tUnMC70teCbKlSuX8mKDeOx3hPHDohw9e19pE+cXqHt48XnzzTeVzvgxkJRRhN4xMTHSoUOHQKmXqnKwjQbehObNm5eq55g49AjQKIZImz/88MPKXVni6mK+CF9+TZs29YiCGzOKKC9B2A86fvx49eMB2zFwKgkEm/PR68NQY44cOdSGfTgNTywff/yx2qMIg6HtT4QfWxhJnG4C37aa+EqrxQXrM2/evMk6P8fxZdWrV5f33nsvWGomWe7p06fl9ddfTzINI0kABGgUQ+Q9wDaCiIgIr9riSx6LKnzFeSUOsQCswITnmvDwcOWmrXv37moIVNtyAW83WIyCVZrYrP+vf/3LJyE4aR8xYoQ6G1NbvIJVnei1o/cFh+Oa+EqrxQXyEw7O4U6wcePGymvPkCFDkiweQ8Doid1xxx1JpgtWJPTjAd3Bom+vcrnQxl7tRW0DSGDFihWqhwdjB2818HKDoWYI5gd/++03NVyKYVA4BPcnPXv2VB5vPvnkE3cS+LRFLx3Detjsr4mvtFpcID9xbNbkyZPVaR/ozfJA5UDSZ1nBJMCeYjDps2xLE7hw4YKa82vevLkyDhja1IaZ4dwbPUgc/gyDWKFCBXXmpTY8mrhiOBBaf9KGFl+mTBnlMFy7x6e/tPo0gbjWz3UGojyWQQJWIMCeohVagTpYjgB8mGJxkiYwfh999JHUqlVLBX3zzTfKAThuYBDhnB2G0p/ASThWseoFi21weHTiIUdfafXP8ZoESMA8AuwpmseWOZtAAMcxYSUkFgLBybZZgqFOeHGB0ULvr3fv3vJ7vGNwyPLlywXzifny5VMLS+DfFNsrMK+olz179iiH4Tj/EvOQODkDAp+pODYKC1iwgAfiL62K5D8kQAIBI0CjGDDULCi9BLCtAfNcMCT6FZvpzdfX8zCCesEWlQ8++EAF6c9P1KdJfI0eJPY6YgGKthkeaaKjo9XiFW3BDsL8pUUchQRIIHAEaBQDx5olpYMAzi4cMGCAOoAZPbRgCLZQpFb0hk97FgbSV7ivMO0ZfpIACQSGAI1iYDhbshRsx5g9e7YaIrx+/bpgy4FVBZvIS5Ysqc44xNL6fv36eS1Qsaru1IsESMA+BGgU7dNWhmp69OhRadKkidpagIyxIR3G5oknnjC0HKMy27hxo5rXw1aBRx99VDC3+NprrxmVPfMhARIgAUWARjFEXwSslMReO73gUF1t4Yc+PNDXx48fl8GDB3sUGxcXp1ZpYp/gk08+Kf/5z39oFD0I8YYESMAIAjSKRlC0YR6+9szBFRycPwdb0APEUKlesNkdw71YuYmN5A0bNtRH85oESIAEDCHAfYqGYLRfJjCAGD7VBBu1X3nlFbX9AFsQgvmn3x+o6Yc5RfgaxakNK1eulOeee06L4icJkAAJGEaAPUXDUNorI6yAjIqKUkcWZcuWTUaOHCk4AcKqgpWZ8MV5/vx5ad++vVXVpF4kQAI2J0CjaPMGTI/6MIw43w8Owa1sEPV1xIZ3CgmQAAmYRYDDp2aRZb4kQAIkQAK2I0CjaLsmo8IkQAIkQAJmEaBRNIss8yUBEiABErAdARpF2zUZFSYBEiABEjCLAI2iWWSZLwmQAAmQgO0I0CjarsmoMAmQAAmQgFkEaBTNIst8SYAESIAEbEeARtF2TUaFSYAESIAEzCJAo2gWWeZrKAGXyyVLly6VsWPHyunTpw3Nm5mRAAmQgEaARlEjwU9LE5g5c6Zs3bpVDhw4IDVr1pRr165ZWl8qRwIkYE8CdPNmz3YzVOubN28amp8ZmdWrV08qV66sst6yZYtER0dLy5YtzSiKeZIACYQwARrFEG78jz76SJ1JeOPGDXXyxJQpUyx7mr1mENFc169fl9q1a4dwy7HqJEACZhGgUTSLrMXzRW+rf//+grk6yKeffiqlSpWSl156Keiaw+j5kzVr1sgzzzwjvs6D9PdMWsMPHTqkznC0yqkca9eulW3btqnq9OzZU7Jnz57WqvE5EiABPwRoFP2AcXpwTEyM2yBqdUXPcf369dpt0D4PHjwohQsX9ir/woULatj09ddf94ozOuCPP/4QlHP16lVLHFWFOdQPP/xQnWaSL18+GkSjG5z5kUACARrFEH0VsFglsfTq1UveeuutxMEBvx8+fLiULFnSo9zLly/LpEmTJDIyUoXv3btXypcv75HGyJuCBQtKmzZt5MsvvzQy2zTnBYN4//33q15ymjPhgyRAAskS4OrTZBE5M0GjRo1kxIgRkjHj369AixYtZNiwYZasLIZ4mzdvLtOmTZMaNWpI2bJlZcGCBabrivMmrSJxcXEydepUqVWrlmzcuNEqalEPEnAcAfYUHdekKa8QhgezZMmihuT69OmT8gcDnDJDhgyyYcOGAJdqreJeffVVwR8MI368REVFWUtBakMCDiHAnqJDGjKt1QgLC5M8efKk9XE+F2ACGOI+f/683Lp1K8AlszgSCA0CNIqh0c6sZRoJaKtz0/i44Y9hT2mFChXcw96GF8AMSSDECXD4NMRfAFbfNwGsdF29erVgQY/Zi3p8a/BPKAxh1apVBfO+2IYxZsyYfyJ5RQIkYCgBGkVDcTIzpxDAkPKECRMsUR0s+MH+xCtXrshtt91mCZ2oBAk4lQCNolNblvVyFAHM/eKPQgIkYC4Bzimay5e5kwAJkAAJ2IgAjaKNGouqkgAJkAAJmEuARtFcvsydBEiABEjARgRoFG3UWFSVBEiABEjAXAJcaGMuX+aeBgLwYPPZZ5+pEyrS8Lihj5w9e1awPaNMmTKG5pvWzOCgfN++fWqLRlrzMOM5cKKQgBMI0Cg6oRUdVgd4bdm8ebMlarVp0ya5ePGihIeHW0Kfo0ePytatWy2jjx4KnApQSMDuBGgU7d6CDtQfJ2QkPiUjWNXEHsGsWbNa4vgoMNi1a5dyCG6VMx6D1S4slwTMIsA5RbPIMl8SIAESIAHbEaBRtF2TUWESIAESIAGzCNAomkWW+ZIACZAACdiOAI2i7ZqMCpMACZAACZhFgEbRLLLMlwRIgARIwHYEaBRt12RUmARIgARIwCwCNIpmkWW+JEACJEACtiNAo2i7JqPCJEACJEACZhGgUTSLLPMlARIgARKwHQEaRds1GRUmARIgARIwiwCNollkmS8JkAAJkIDtCND3qQ2a7Pjx4xIVFSXbtm2TcuXKSdOmTSUuLk6KFi2q/nxV4cSJE3Lr1i1fUR5hOAEiR44ccuzYMY9wfzdImy9fPn/RDCeBoBNYtmyZnDp1ykOP8+fPC5ypz5w50yP89ttvl3bt2nmE8Sa0CdAoWrz9Bw8erE5F+Pe//y1PPPGE7NixQ2bMmCHjx4+X9evX+zWKlStXFnwRpFT69++foqTdunWT2bNnpygtE5FAMAgMHDhQnnzySY+ib968qU4WwY9FveD/FY2ingivaRQt/A6MGDFCFi1apI5Rwi9aSI0aNdRflixZ5Ny5cxbWnqqRQHAI4FSTyMjIFBU+f/78FKVjotAhwDlFi7b1r7/+KiNHjpShQ4eKZhD1quLXcEqGR/XP8JoESIAESCBpAuwpJs0naLHR0dGq7CpVqvjUAYayVatWPuMQ+N///lf++usvv/FpjShcuHBaH3X0c2mZ93U0EFaOBGxKgEbRog23du1apZk/o5ic2g0bNkwuCeMNIpDWeV+Dimc2JEACBhKgUTQQppFZXb16VWV348YNI7NlXgYTMHLeF4ujMGyeEpk7d25Kkqk0ZcuWlf3793ukx4+uIkWKSPny5d3hS5culbNnz0rHjh3VimREYHXykiVL1BB+69at3WmTuti0aZNs377dI0np0qWlWbNmHmG8IQErEuCcohVbJV6nihUrKs2wDYNiTQJ2nffduXOnDBgwQA4cOOAG+8knn8iZM2fk/vvvl+7du6twl8slPXr0UMP0p0+flunTp7vTJ3VRt25d+eCDDwRD7VgFijy/++67pB6xVNyWLVvk448/dv9NmzZNvvzySzl48KCl9KQy5hBgT9EcrunOFV9GY8eOVXODzZs398oPi2x27dolVatW9YpDwEsvvSSXL1/2GZeewHr16nktd09PfnZ+Nr3zvsGqO4bka9Wq5VH8q6++qnqT2bJlkz///FNiYmLU+5MhQwbJnz+/tGnTRmrWrKmMpMeD8TcXL15UPcsrV65Irly5VHSePHkkU6ZMkjlzZmUcX3755cSPWfa+du3ayojj/xC2Pt19992yYMEC9WPhlVdekWHDhllWdyqWfgI0iulnaEoOd911l7z55psyZMgQwX9S7A/UBHuuvvnmG3nwwQe1IK9P/LpNzT5Frwz8BOALMPEeMD9JHR+c3nnfxIDeeecdiY2NTRyc7vvcuXN75QGDpcmRI0cEW3xgECEY6ty6datgCB/XEBhGvE9//PGHFCxYUIVhaLVPnz7K8MEYLl++XP1VqFDBHY99gbNmzVKrqFWgTf6pU6eO0hS9XszPN27cWFCX4cOHS9euXd1cbFIdqpkKAjSKqYAV6KT4pYovJfyKf//999WcDL648Ov7xRdflLCwsECrxPJ0BFIz74s5tnHjxnl5VNFlp3pj+vtAXcP7i9bDQ5l4v+AxCcOpvsI1o4jeIIwG5iFHjx6t9gbih4JmFH/88Ue5dOlSir0lBaq+KSkHDBJL/fr1ZeHChbJnzx4axcRwHHTv3fIOqpwTqtKpUyfBH4a0Tp48KZUqVRIMaSUn4eHhalgruXT49Qvjip5ASgRu5ih/E9DP+/oa4tZzuvPOO0XrWerDrXBdvXp1D7doeM/g5QVG/9tvv1Uq4hqLvrSeo6Y3ephaTzRv3ryCIVRNwATbhpCf3QXTFVOnTlWLkyIiIuxeHeqfBAEaxSTgWCkK+xJ9beL3p+OKFSv8RXmEY96yePHi0qVLF49w3iRPIDXzvvAZi56VVQSLaPAHwY8irHyF/1u8C/gBhh9VMAQYoYAcOnRI+dxN/INMy0Ml0v2DZ7U4rHK1q2BIeN68ebJq1SqBkceoja9epF3rR729CdAoejNhCAmkiEBq530TG5TEhUyZMkUNWSYOT+89HLj37dvXnQ1WnWKR1po1a9RcWc6cOZXx+/DDDwXbN7AytVChQip9+/bt5bPPPlNzjJMnT3bngQv0CuF/F4J5ScxDoueIlaZ79+6VlStXChZmpebHnMrMQv9gIRsciWNLC+bpixUr5tYO8+uTJk2Sw4cPy7PPPqt+WLgjeWFbAjSKtm06Km4FAkbO+6JXltJ9iqmpOwyd3iji/ocffvDIAqtRq1WrprwgaQtukGDQoEFqXtDXSEL27Nnl888/d+ej9yOKBTlOkBIlSshjjz0m33//vVpggy1S2ikxGDZG/O7du2kQndDYCXWgUXRQY7IqwSGQ0nlfbTgxOFomXyqGBX0NDeoX2ySfizNT4GQazL327t1bbc/QaomhZ/SOKc4hQKPonLZkTYJMIKl5X/QAMQyHFZmYr/MlGJrDqs+kBP5ssW0jpQujkJd+yC+pvBn3DwEMjUK0bU1o2zlz5qgV4NiWgSOnKM4kQKPozHZlrSxGAKuGscUhKcFB0skJ5gKxfxVf0BRzCGzevFltn0HuEydOVMOlDRo0kCZNmqhtJ6NGjZJ9+/ZJSs8gNUdL5moWARpFs8gyXxIgAVsSwMZ9fz9QYBDxp4l+ThVhWHyEUQF4waHYkwCNoj3bjVqTAAkEmQA8+sB4YgUufL1eu3ZN3WODP8W+BGgU7dt21JwESCCIBLDvFBv69WInH696vXn9DwGekvEPC16RAAmQAAmEOAEaxRB/AVh9EiABEiCBfwhw+PQfFrwiARJwAAHM7cErj17gtxULYLDXUC+YF6SQgJ4AjaKeBq9JgARsT2Du3Lnq5A59ReDPFd5o4OhcL/oj2fThvA5dAjSKodv2rDkJOJKAr+0Qx48fV3s7W7Ro4cg6s1LGEeCconEsmRMJkAAJkIDNCdAo2rwBqT4JkAAJkIBxBGgUjWPJnEiABEiABGxOgHOKNm9Aqk8CJEACaSGwZMkSdbC09myjRo0E50dCfvvtN3UuJg6LxgHZOFcTR2WFgrCnGAqtzDqSAAmQQCICbdq0kQ0bNqizNnGSimYQkaxcuXLqfM23335bWrVqFTIGEXWnUQQFCgmQAAmEGIEMGTK4jzG75557vGoPx+hVqlSRQoUKecU5OYBG0cmty7qRAAmQQBIEtAOSfR0ujTAtPoksHBfFOUXHNSkrZCQBeEfBQbMul0vwyzrYAs8sly5dEhw27OuLLNj6WbV88Lp8+bKAn1lf9CdOnFB5FyhQwBQMGOrECRzIv1evXurTlIJCPFP2FEP8BWD1/ROYNm2adO3aVd5//33lHuzgwYP+EwcgZunSpXLffffJ119/LWXKlJFNmzYFoFT7F7FmzRqpXbu2rF69WkqWLCm4N1KuX78uHTp0EMzLFSxYUBks/IgyUhYsWCCDBg2Shg0bSlhYmDRv3lzOnTtnZBHMK4EAe4oh/irgl/PRo0dlx44dIU7Cs/qnTp2Sfv36qZ4FYsCnZ8+e6tw8z5SBuUNP5/HHH5fY2FhVINoM94sXLw6MAjYupXPnznLmzBlVA7Qr7letWmVYjebMmePRDvgxVbFiRWnZsqUhZWDV55gxY2TFihXK6CJTjGDMnDlTXnzxxRSVcfXqVQ/Xdzlz5pS8efMmO/qhjY6cPHlSsOgGvezIyEjJly+foGc8cuRIefrpp6VevXop0sMOiWgU7dBKJuqI/xjLli2T7du3m1iK/bLGf3j8YNALembvvPOOPihg1xgy1QyiVuj+/fvVF5X2xaWF8/MfAujF4QtdL7gfNWqU6nHpw9N6HRMT4/XorFmzlK9Vr4g0BJQoUUIZQfRCNbnzzjvl559/1m6T/fzqq6+kS5cu7nQYfp0yZYpkz55dhcXFxSlD504Qf4GwIkWKqCB8YpRiwoQJ7nRFixZVQ7hOMoiqsvHdfAoJkEAiAqdPn3blypULY2DuvyeffDJRqsDdxvcUXaVKlXLrAr0aNGgQOAVsXFLlypU9uOHeSJkxY4ZH/mib+B+aRhbh6t69u2vixIkqz/i5UVe8gXKtXbs2xWXg/Yk/EcT9d+XKFfVsVFSU0j1+SNkrr3gH6q74H4Hu8Js3b7ruuusu1969e1VY/I8B17p169zxTrnAAgIKCZCADwLxc3iu0qVLu+IXtLjatm3rih+C85EqcEGbN292VatWzZUxY0ZX/NySa9++fYEr3MYlxQ99u+LnFBW3+G0GLtwbKfEb3F3x833qPYkf6nTFD3Uamb3KK36xl+vhhx9W7V+hQgXXpEmTDCkjfhjWFR4e7kr8gw+GN37Dvit+E79HOePHj3fFH8ulwsaOHesR55SbDKiI6jLyHxIgAZ8E4n8hS6ZMmXzGBSPQavoEg0FayjSbG4YnR4wYIfFGKy3qpegZDOlj1bGRQ+aYn8ZG/vz580tERIQabsYcLObQmzVr5qEXzp+sVKmSrF+/Xnm8wXyi04Rzik5rUdbHcAJWMoionNX0MRy4SRk6gZsZ20kwZ4n5yUOHDkn8tIEy6nny5PHZCgjv2LGjmp9cuXKlzzR2D+SWDLu3IPUnARIgAQMIxE8VSN26dcWfQdSKiB8+lVq1ajnW9RuNotbS/CQBEiABEkiWAPyijhs3Ltl0dk1Ao2jXlqPeJEACJBAkAtpWjiAVb2qxNIqm4mXmJEACJEACdiJAo2in1qKuJEACJEACphKgUTQVLzMnARIgARKwEwEaRTu1FnUlARIgARIwlQCNoql4mTkJkAAJkICdCNAo2qm1qCsJkAAJkICpBGgUTcXLzEmABEiABOxEgEbRTq1FXUmABEiABEwlQKNoKl5mTgIkQAIkYCcCPCXDTq1FXUmABIJKoHHjxoITJHzJ8ePH1aG7YWFhvqJV2IYNG9SJ934TMCLoBHhKRtCbgAqQAAnYhUD8Abty6tQpv+rGxsb6jUNE/GG/ScYzMvgEOHwa/DagBiRAAiRAAhYhwJ6iRRqCapAACVifwPPPPy+XLl1Ks6I5cuRI87N8MDAEOKcYGM4shQRIgARIwAYEOHxqg0aiiiRAAiRAAoEhQKMYGM4shQRIgARIwAYEaBRt0EhUkQRIgARIIDAEaBQDw5mlkAAJkAAJ2IAAjaINGokqkgAJkAAJBIYAjWJgOLMUEiABEiABGxCgUbRBI1FFEiABEiCBwBCgUQwMZ5ZCAiRAAiRgAwI0ijZoJKpIAiRAAiQQGAI0ioHhzFJIgARIgARsQOD/wjsCHZoBRZsAAAAASUVORK5CYII=" }, { "id": "HATtC1TWm", "type": "image", "content": 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" }, { "id": "sMbAXpvYY", "type": "markdown", "content": "\n\n```math\nt1 = 0,7(RA+RB)*C\nt2 = 0,7*RB*C\nt1+t2 = 0,7(RA+2RB)*C\n```\n\nNun kann es jedoch manchmal auch nötig sein, einzelne Impulse, die von Hand ausgelöst werden, an eine digitale Schaltung zu legen. Dies ist vor allem von großem Nutzen, wenn die Schaltung nach jedem Schritt kontrolliert werden soll. Nun könnte man einfach einen Taster nehmen, mit der Stromversorgung verbinden und durch das Drücken der Taste einen Impuls erzeugen. Doch leider geht das nicht so einfach. Der Grund dafür ist in Abb. 24 zu erkennen.\n\n" }, { "id": "mTn2II1nD", "type": "image", "content": 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" }, { "id": "u084mV1dx", "type": "markdown", "content": "Bei einem einfachen Taster ist eben keinesfalls beim Drücken der Taste sofort die angelegte Spannung am Ausgang vorhanden. Vielmehr “pendelt“ der Spannungswert zwischen High und Low viele Male hin und her bevor der Spannungswert konstant bleibt. Das geschieht zwar mit einer sehr hohen Frequenz, doch sind gerade digitale Schaltungen auf sehr hohe Frequenzen (im Megahertz bis Gigahertz-Bereich) ausgelegt und reagieren damit auf diese schnellen Wechsel. Falls also ein einfacher Taster verwendet wird, ist eine sog. “Entprellung“ unbedingt erforderlich. Den Schaltplan dazu zeigt Abb. 25. Wie man sieht, ist auch diese Schaltung mit Standard-Gattern aufgebaut, nämlich zwei NAND-Gattern.\n\n" }, { "id": "Sh3R1I_KE", "type": "image", "content": 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" }, { "id": "nzKoB9Q0t", "type": "markdown", "content": "Eine weitaus bessere Schaltung für Einzelimpulse ist in Abb. 26 dargestellt. Dabei findet wieder der Timer-IC NE 555 von Texas Instruments Verwendung. Man kann nun durch die Wahl des Widerstandes R und des Kondensators C die Impulsdauer bestimmen und zwar von einigen ns bis zu mehreren Sekunden. Bei der einfachen entprellten Taste kann man zwar auch durch mehr oder weniger langes Drücken der Taste die Impulsdauer grob bestimmen, doch versagt diese Methode bei kurzen Einschaltzeiten. Außerdem ist auch hier der Ausgang höher belastbar.\n" }, { "id": "YUciU-RHB", "type": "image", "content": 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" 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"data:image/png;base64,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" }, { "id": "0anTl9laR", "type": "markdown", "content": "\n## Takgeber in der Digitaltechnik\nDer Takt, und somit der Taktgeber, spielen in der Digitaltechnik eine sehr große Rolle. Zum Beispiel in einer Digitaluhr, einem Zählwerk oder einem Computer.\nUm nun aber nicht immer einen kompletten Taktgeber in einer Schaltung zeichnen zu müssen, hat man auch dafür ein Schaltsymbol. Abb. 28 zeigt dies mit einer kleinen Raffinesse. Wenn man nämlich an den Ausgang ein AND-Gatter schaltet und den anderen Eingang des AND-Gatters in der angegebenen Weise mit einem Takter, der an L liegt verbindet, kann die Zeit, in der die Impulse am Ausgang A liegen bestimmt werden. Impulse gelangen nur dann zum Ausgang A, wenn der Taster gedrückt ist. Vorteilhaft ist dies vor allem bei sehr kurzer Impulsdauer.\nDer H-Wert kann auch bei umfangreicheren Schaltungen auf andere Weise an den unteren Eingang des AND-Gatters gelangen. Zum Beispiel durch eine weitere Verknüpfungsschaltung die dann den Wert L liefert, wenn ein Zähler einen bestimmten Stand erreicht hat. In diesem Fall sperrt das AND-Gatter den Impuls durch einen L-Wert am unteren Eingang und der Zähler kann durch das Ausbleiben von Impulsen nicht mehr weiterzählen.\n" }, { "id": "y5OJuhLVJ", "type": "image", "content": 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" } ] }, { "id": "JVfbTosVJ", "name": "FlipFlop", "sections": [ { "id": "uKhzrSqzoX", "type": "markdown", "content": "# Flipflop\nEin Flipflop (auch Flip-Flop), oft auch bistabile Kippstufe oder bistabiles Kippglied genannt, ist eine elektronische Schaltung, die zwei stabile Zustände einnehmen und damit eine Datenmenge von einem Bit über eine unbegrenzte Zeit speichern kann. Im Gegensatz zu anderen Speicherarten muss jedoch die Spannungsversorgung dauernd gewährleistet sein. Das Flipflop ist als Grundbaustein der sequentiellen Schaltungen ein unverzichtbares Bauelement der Digitaltechnik und damit fundamentaler Bestandteil vieler elektronischer Schaltungen von der Quarzuhr bis zum Mikroprozessor. Insbesondere ist es sehr häufig in bestimmten Ausführungen von Computerspeicher-Chips (statischen Speicherbausteinen) als elementarer Ein-Bit-Speicher enthalten.\n\n## RS-Flipflop (Setzspeicher)\n\nDieses Bauteil ist das einfachste Speicherglied der Digitaltechnik. Es kann einen bestimmten Wert über eine gewisse Zeit speichern. Am besten lässt sich das Verhalten an der NAND-Schaltung erklären. Allerdings ist diese Schaltung nur eine Prinzipschaltung, die z.B. nicht das “Warum“ der Speicherung erklärt.\n" }, { "id": "W0wsgZOCN", "type": "image", "content": 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" }, { "id": "2iIOdzkgb", "type": "markdown", "content": "\nSetzt man in dieser Schaltung den S-Eingang (“Setz-Eingang“) mit dem Taster auf 0, so hat der Ausgang A den Wert 1. Wird dagegen der untere Taster betätigt und somit der R-Eingang (“Rücksetz-Eingang“) auf den Wert 0 gelegt, so erscheint am Ausgang A der Wert 0. Der komplementäre Ausgang ¬A hat immer den entgegengesetzten Wert von A. Das Wesentliche dieser Schaltung ist aber, dass durch Betätigen von z.B. Taster S der Wert 1 am Ausgang “gespeichert“ bleibt – auch nach dem Loslassen der Taste. Und zwar so lange, bis durch Betätigen des Tasters R der Ausgang auf den Wert 0 gesetzt wird. Dabei spielt es keine Rolle, ob der Taster bei S noch gedrückt ist oder nicht. Abb. 30 verdeutlicht das Verhalten der Schaltung. Abb. 31 zeigt das Schaltsymbol für RS-Flipflops.\n" }, { "id": "7-clQsyR6", "type": "image", "content": 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28vTz755IBLTnGdEKgrKddZZ51OtxM3BAT8xufOO+9cnKubEASGjUBIctgaSPlDRWDjjTduVrY6LzRhNBAwJ3nbbbc1B5xHL6Ohk5VZigy3rszaT92bla3z589vPPzAMRoI+I3Piy++uBlxGQ2JIsXKjEBIcmXWfurekKTtBllJOTqNwXYc+si2nNHRyWyQ5MYbbyzWhUw3hCSni1jSzyoEvDTmh1fk5ZlVQIxQZebMmTNC0kSUYSGwZMmSYkdAL4Lh+1//+tcrtIo9c5K90MAA82DQLf4ZtaDXP46HhDPIfiZrthhmRkUbefTRR5c1kW51a49vv5ZBe1z79bJCOqSdzvOt+Zonft3rXlc22mij1uzz/0qGwLHHHlv8So/fFnV0pBXPL3rRi8p0fyB90aJF5Rvf+EZZvHhxuf7668sWW2xRnA881RCSnCpSI5CO8dMbOuGEE0ZAmoki8MSclDJuwQuz//77j/12A/s8LXi58847y49//ONinrVTaCWjTvdrXC/TTSWv1jTa0uOPP950Xjr98HJr2tb/u8neKY207fHt11NN05ruwgsvLL30gOS9sgZt+C9/+Utzhq8VzxtssEHTcXrJS15SXv7ylzcfxInwOumu4mY3wT/+8Y8mHz/BNm/evOLw/OU9U5/1HZJsRWME//c7h9/73vcao6HBGFe3x5L3M2or/5A4T+ass84aSW+3k3oZZJ8zzjij0+2xiXv66acLA40sb7rppqYHvjzhpzqMNdV0yyur/d508mxP282w1fipppeuPtMu31SvOz3Pg7ed6Fe/+lW56KKLpppV0nVAgK3T8WMDDZcKc+fObUgOaa6//vrNr8XwNJHmK17ximbrUPuvx/A+ndGsw/XqV7+6eb6T7jqI8P9ldruR+P4hwChbLFIVX0tCfLvttltDgDVutdVWK6985SubRQwahpN6HPws3qbrUQmMjnox0sg7v6oxeM1stdVWZb/99mvaj7bUi9BOOr3Iczp5jFv5OisMuXdgusOC08FlZUgLw3YyY1/uvffe5uP+1ltv3ZAlzNlH3+0BmbJH9t1uttlmje1sT7O868k5Li917vUEAYr+1re+NUlZFHnmmWdOIBhkuPfeezcemud4axoOI5iXsCfqSCZBIAiMIAI//OEPl5Eke4fgzE368Bx5kBwFn/XWW6/5dBqen2nVQpIzRXAaz/MA9fS5/52CXlA78SHEeGWd0EpcEAgCsxmBV73qVQ0B1oU7FnIhw0qKfm+03dPsBx4hyX6g2iVPCjU84JMQBIJAEAgC3RH4+Mc/3kzhWGjj02kotfvTE+8YarW61XC41a6Oo5wqwWaf5EQscxUEgkAQCAIjgIA5ditZu801TkfE17/+9eXvf/97OfLII6dMjjX/eJIViXwHgSAQBLogYEuKRXPmvAzztXo19i2737rISBrrCabqrXQpNtE9QuDd73532WSTTZqPIdvp6GXOUsX25kiDHlUm2QwHAcMQhiPMm1pC3ToP6h4DYfVqDSbSDYFIPypBU7ZHjaz2VJG3/pKERU+OOrPwqQZ1sEKuH5P9tYypfpPdYQxk7KSDmo9DGyyLV58azGPbK9Y+n13vD+NbfchpSwScyYc02oM605k2VoN02mArEdV7w/i2FeG6665r3gnbOt70pjeVnXbaaZkov//97xuCPP/885sN72S3f2/bbbed8B4te+A//2in3rNOuLSnzfXMEdDGtMXphniS00VsFqZnzE4//fRmL5EXl0H47Gc/u6ymesq/+MUvmtVlJ598cjn44IObgwPe/OY3N88sS9j2D0P+4IMPNhPtbbd6fukFuOGGG5rf67QnSn3e+MY3NivhFGYe4m9/+1tjeP/5z382wzh6lE532WGHHbrKw0Ng6HUI+hn0bB3s/Yc//KEhF4sUkMc73/nOsvnmmy8rWh3J796tt95aDEnZl2dxg31i3UIlIh7OoIItTupTTzdR9lvf+tZmPqjKcPnllzcHIDhZRQfBojYdF9ueui1w86w2yeC174mr+fby2zCdbQd77LFHs89Ou9EJqN4IWXVQal0N7dWOl8MddNToSKfNgRtI0fO//e1vy/bbb1+22267ptOjA6Q+2nI9wWrdddcNifZImStCkIoOSfZIAeOcDZL0wn71q18tm2666aSDpfV2d9999+ZFvvnmm5sesp4yQ4AEEavl2YyGvBgULztjzlAedNBBTVr3pGE0/Y9EGQRzDjMN5GDMEI0tM4yLvGtwveOOOzb3eQPIcZtttmm8NiTIi5aGgWas77vvvsawISUnfxx66KHNfWTDgCFNXpByeTz2Ys00wJPx5EkiCNuByNpKkhYcSHfVVVctO2LLqUEMr0MmyFTncGzCRibuwQbmSJfRVkdBfdVfOnqGQS8CPSuH564M+TrsQDtRhxrUTYeA7GRA+kYBECpCkQ9SYuC0K9jD24EV0tlXjKDoQT1r3dQVMVWCruWtyLftBg7yuPbaa8uBBx7YdAzJVcOWW27Z6Ax+5KYPejzppJOaul566aVFh1LbhAW9qLMOgjqoW9WR+Kuvvrppu2Tfd999m3eylpXvwSMQkhw85iNXIsNi79HXvva18tGPfrQZTmoVklHWW0aQDBJCYMgRyJ///OdmnH/BggXlLW95S3NyDaPCIDIGPDgExFPwDKPPEJ577rkNUfH6DjjggNbiVuh/pMzgOOmE0f/gBz84gXwZHOUy2owZkjNHoQ5nn3124+0ygkiEJ41orrjiisZIX3nllY3BZrQdcYVAK0HeddddDfnus88+jaFbIeH/8xBsfWD1r3/9qyEDMrcGcvuQQ50RiHrA1bCg53ksr3nNaxoPjQFG7LfccktjpHfZZZeGIJVBL0iH8UZQhhF53/LoRZCP8rUBmFXMW/OuhFk7J9oWIjUSoBPlWRggPNc6ZOpNR4heuxXHY0O0OkY6ZtK+4x3vaHCY6bCt9vypT32q/OlPfyrf+c53yiGHHNK0NbJpvzpb5G8N6l1lQ4Y8Ru8E3XhPdIK8d/SnA2NbA6IUtFHXdNWLzlerXPl/+giEJKeP2ax7AoF8+MMfLnrEJ554YvPSfvnLX26GJ73UCNK91oDwvMg8AUTBCDuU+tRTT21eckaBt4NMGC7HvrnPo2AEGFBbYV772te2ZrvC/yNyv2b/mc98ppHhiCOOKB/72MeWGVbyq0dr4A0wQoYqnelo+JKx5TnyNPfaa6/mmncAB/HIU90ZXsYaQb3hDW/oGbHwQJAWA0ouBhjB8MqRv9V+7VuIyEMO3hOyJBui4f3IA/khRM8jenpBWJ6r3pf6IlbGvZcBbggZyTH6yME1b6m2LbK3BnKRu6ZDQNqRjph5PvvnEI62pJNDZ9JU71VbkAZWvaiPzgcy/9CHPtRgpr3DDc7d8tf5QI4IFhEKvEKdQx0AcZ4nqw4PstVB0aHRGVU3uGgHCcNFICQ5XPxHonSkxSC95z3vaYaKnL6vl+4lZshah5aqwJ65aekZoQw4Q6BnjzTf//73NyQrP3NkjACSREB64M5OZNgQM4IyvNSLwBNC1AiLQePhMqSIc3nGDGkgICTKAyGToTHHBlqQUeeXYGBID0EZamaY1YNXWr2hXtSDrPAkDw9WOQwmY+weAmkPvCaGHBEaLjcsSU5G97zzzmv0B28dE2lhhXwRI28IeSJ/+ut1oH8dJiRHRrLB8tnaFhIlM2zVWbsh+1//+tdlq0vVx5yxzoH70tOnNqldIeZeBHogN52QBfnWDoV6IDI4Ik9ptRmkbSTCe0CH7l922WXLOif0iUjVU+ftlFNOaToBRiR0kny03UqwvahH8lgxBEKSK4bbrHqKkfnpT3/aDE8hRd6dl5Pnx7NhBJCiHi5D4OVHgF78s5cOVTKyDBMi1Nv3vHQIxOn7jDWjfNhhh5U999yzGYZCsAx66yrBmYDKWJr74UnpgfPyLMhRLpJmrNWBzLxG8pMTYSxcuLCJVwfy+uYhy1Pd1c/wJyL5wQ9+0BAxEvKzOzVfBnsmoXqQCJuxJxtZv/vd7zbzoRZ3SMODIRfDyyMUbziSMealIFQyqYdOg3qI84xOAJ3Cw6H55vMMUSN7RhsJMfq9CGRVHhJQF165UYrjjz++maNGnELFlzdFL+aNkTds6cFQKrLTaUG0PGQERFZyW0zjHpz8r+6e5bGqZzdPbzp13HXXXRv81MkQqo4UHbV2Hr0vhx9+eNPuyAvHT37ykw2p2n7gGe8ZebQV6Y16eEdgwPN1D7nXOc1edr6mU9+knYhAtoBMxGOlvEIe1bvz4nuJ219QBoInxfB5iRkJc4567oyCYSLGjfE2PMlIyEePGGnxTBEnY+E+A8jYIZ5eBL3yOseG6MlHrjrPowx1QIpkNtxIFnIjo+qhIVdxZPe/53kRdThPHcQjHuk8x7C1GswVrU8dDq3GEt4+dKE+Naif+TcEog7qqe6uye15xhfmrslOx4w0vMXDnx7kK56hllcv6lHlhDXs4MVL9T851Ed5NagPnVSPlkzaEZ3SmWtyIUntCvZwcQ/ZqLuy6BRJqh9MpOtFfZQjkJO+p5qn51rTuq5xrfHyrmW0x7uXMFwEQpLDxX9kSq8vMIEqYUxFuPrS17Q1n055tKetz/TqW/4CY4YophNaZVteHeTZmnY6ZfQ7bbtccBC66cK9UTXK6tIun/qQt5PMndI3GeRPEJghAiHJGQKYx4NAEAgCQWD2ItCbCYjZi09q1oKAeSDDYobBtly6iGGqwXOG2gynWbU4CsEQo3lRHqd5Lv8byrNoppOnMgoyt8pQh1vbh2Jb03T633OGKg1/Gm4dpaBdGfYXDN0b2hbMLxo+HvVguBu+5nkNcU811Hpb4WqIOGG0EAhJjpY+Rloacz1OFWGwWkkSAdo4bYGGxSNf+tKXJtTDfJE9ZobLWknSYhJk1Y9VlRMEaLtgyCyQUR9zpgwzYjRfZs6uV/OkbcX27NKClEsuuaTZYmBFcut8pdWf6mZhkTk62y5qgP/FF1/cLJCxirKSJBzcM483zGCLTZ2HtE3Cqk9y6WRZ2DLqwX5Hi49g20qSv/nNb5r5XqtbHXTRfjKSOdXjly5oet/73jfh9Kc6b986rz7qGMxG+UKSs1Gr06wTQ6QXzBjVBTvV+0NgFkMwzNIgSAtW3OdVmu9CLl5+RtkiDfd4aBZaMAB6x+5ZHcsgI033EKfVp73cwN6p6gwv74mxIZ9Vn46oc4qQujHO5OdF1sVG5FVn8tbFIO37+TqVNdM4nQZlwqwuboGXDkUlb/hLB2PYS69+cLea1QfpV+Oq/jW9PHnMrnUQBMRqEZaTkQZFlORWJhmRtXaC+C0esvUB4Whfb3vb2xp5dWyqN+lZmKgLPXWac52pHlqfhyusyFnJj7zaig6K8tUF5tL6ILhK+AiePnmY3i/zpz7qB296VSfpdTi9j1b7apd7Ll0Nrl1Od469Vf78PzMEQpIzw2/sn0ZWXkZGFnl4SS1d1+tFkMccc0zjGZ69dKuH/WH1NJpzzjmnfPvb3y77779/Yzhsv3AqiRNv7If0otsqIjAYhsyUZWuCsmxb4MEZYkJGDE4/gvowuAwZQ8coMax12FjZ5GPYGF7bBwwL2whuP6Tj+nhjjOC73vWuZn9cP+SUpz12Tv1hbCtxw8n2E0aZYbUf0H5DHRaG1BYL5+oiEeTIaHtGXcXxagwlq6/6IRoGF/bi1VFaK3zVexAkqS48WsRg6woZrJgmL+Ijh4/OgI4VPHhogiFYdaFDeDi9plfbiJoC2v7ogOjMwU1nwmiJoWCE6YAMHTztGnnCVNsms5N5YGmri/bH47c9yUgK0qNTHRW40xGdeNZRhEhVHa0kpzNtNCTZppgBXk7emTzAwlPU8BHwgvv1Aj16Q3SMLMKwGd9L64X1stpL6L4TT3hWjBqv7L3vfW/jDTJ89UVGOkiUgeAJvP3tb2+MHk9BXvazMTJ60Eiyejz9QEN5Tp5xyAAvxXBxLRtx6937MHwMk+FixpfhFmzvIL95S8avn4GsSI+cykPsyFo8zF3rpMAZEfJsGWey877sReQl0h9i4ZkwxshUHezXgzcyVo5Oj3zkwcOpnmo/6yhvpGGLh2FHnSny+CaDT9WL/xG5dqNd2u7hWztELNoNnfUz0Ln9v2RBlIjP/lQy65TAG/nVDgwZ6QXZI9A9l3qC1cOkP4Tn3aBP+1QdyUh/OgW//OUvm3an7WmT9KGj2q8OZD9xm015hyRnkzZXoC6IjnHl9XmxP/CBDzRGlmFALI7SQpZ147w0DAID5UXXo5cHI8cYMOAMgWcYd/ekl5Yx1hvXO2YwpGVkPNevgDDIgjDqECajo9z67X8fPXtpkbgP+dTXcwwkz6efgZfhgAXeBe/VxnXywI48yIEnVePIX2VEHgy466oLuEorP/F0ZtiWARbHW6UHH/WXZhCBfDxhHbSKrbKrHlr1ovNFPoTj4AQdHLrQ7qSn334GmJNRZ8OQPE8SwSMwIws6UTctJXJer7ZCVvLX9k4n4rwDFV868H7BocZ5Fh46RXRWsXC/n+9HP7GbLXmv+j9Lw2ypTOoxfQS83I5f4ykadvMymydEmk6XQQxOHPHyOtmkHi3GSJ122mllv/32awjIMKu8DIsx9HrZRx99dEOUDIrhW0OWvMvvf//7zbAhY6NHzvD0y5tksBgl3jKDw3tinCwMIZd7vGYelo8Tg/ToGSnGzdF2vGbDgwyyob1+GS3Y+Skyw94MJgyV+fOf/3yZ50cmw3yMNqJzbZjPNxKhNx0R2NIHbGH/k5/8pDHe8tXh4RnxkuicQTfMy6APYt5VOUhCmdqX9gZv7ck3ElRHbcJIhiFIZwJrc57z0fkydI80LfCpZDP9N2D5T8DR+2E6wXCwti04PUibMLKiU6idWDAFU3I6DtBoAK/QSAYdwV3b04bUVRvUcdSeHEvHO1ZX5fCm/Y+gtQPtOGE4CGSf5HBwH5lS9VoRnOE4vXZkiPiQpfkYLzyDhOAYXUbMCyuOR2ho0IvP2LrH6Bly8uLzFsQxZDw5xoRBlg9DKQ4J1N52P0AhG2LwIYvyycZrZIz9Tx71cR8e0jJOiMcwGC8Nmbpm1PoRYFONLGJgVBl+54DCXtlwUh+4w7nqwbNkVx/3yFxJQz3oEdaeV1//y89z8qhxnu9XZ6UVs1adkAP2VSdVR/RDNvqiE8/A3je5yUlPFQPP9yMgP22U9609w9IQNbmUDV+6IKN3hvzaC9ngyUNEemSWTl19qk68G7WO4rVF156Tpzx8+lW/fmA22/IMSc42jU6zPl7go446qnmKJ7Lllls2Q31eSi9968vpWmiNayKW/qn32u+351HTD+N7qrJMNV0v68CAWnH7u9/9rtGBBToWePAiOoWK93R00SmfYcYNA+fp1tcctZEGpGU43DA4nSD3VuyXpw9ldro/DvWfLl6zMX1IcjZqdRp10jPXa/fC6hnrCftOGCwC8EeUPBBeYNUFY5wwPAR43UYREGJ9N6qXPjypUvIgEQhJDhLtlBUEgkAQCAJjhUC6qWOlrggbBIJAEAgCg0QgJDlItFNWEAgCQSAIjBUCIcmxUleEDQJBIAgEgUEiEJIcJNopKwgEgSAQBMYKgZDkWKkrwgaBIBAEgsAgEQhJDhLtlBUEgkAQCAJjhUBIcqzUFWGDQBAIAkFgkAiEJAeJdsoKAkEgCASBsUIgJDlW6oqwQSAIBIEgMEgEQpKDRDtlBYEgEASCwFghEJIcK3VF2CAQBIJAEBgkAiHJQaKdsoJAEAgCQWCsEAhJjpW6ImwQCAJBIAgMEoGQ5CDRTllBIAgEgSAwVgiEJMdKXRE2CASBIBAEBolASHKQaKesIBAEgkAQGCsEQpJjpa4IGwSCQBAIAoNE4P8A4g1BKj5zImcAAAAASUVORK5CYII=" 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" }, { "id": "LuH3Ocgy7", "type": "markdown", "content": "\nDen Setzspeicher findet man als IC meist nicht als einzelne Schaltung. Vielmehr haben andere Flipflops wie z.B. das JK-Flipflop das RS-Flipflop integriert. Durch geeignete Beschaltung ist es aber nicht schwer, solch ein Flipflop als RS-Flipflop zu betreiben. In manchen Datenbüchern und Applikationen sind die beiden Eingänge mit `not R` und `not S` bezeichnet. Das bedeutet nichts anderes, als eine Unterstreichung der Tatsache, dass z.B. das Setzen nicht durch `S=1`sondern durch `S=0` erfolgt. Und das ist ja nichts anderes als `not S=1`.\nUm nun in einem Übungsaufbau den Wert am Ausgang sofort zu erkennen, empfiehlt es sich, eine Leuchtdiode (LED) dazuzuschalten. Leuchtet sie, so hat der Ausgang den Wert 1. Der komplementäre Ausgang `not A` hat somit den Wert 0. Ist die LED dunkel, so hat `A` den Wert 0 und `notA` den Wert 1.\n\n\n## Das JK-Flipflop (Master-Slave-Flipflop)\n\n\nEin weiteres und sehr wichtiges Flipflop ist das JK-Flipflop. Mit ihm können viele Zähler und Teiler aufgebaut werden. Wie man an dem Schaltsymbol erkennt, hat auch dieses Flipflop einen Setz- und einen Rücksetzeingang. Werden diese beiden Anschlüsse verwendet, so kann man das Bauteil als gewöhnliches RS-Flipflop betreiben. Dazu sollten aber die anderen Eingänge nicht angeschlossen sein um eine Fehlschaltung am Ausgang zu vermeiden.\n\nDas JK-Flipflop kann alternativ dazu über die beiden Eingänge J und K betrieben werden. Für diesen Fall besitzt es noch einen weiteren Eingang T, über den dem Flipflop ein Taktimpuls zugeführt werden kann.\n\nPrinzipiell unterscheidet man zwei Arten von JK-Flipflops: Das “positiv-flankengetriggerte“ und das “negativ-flankengetriggerte“. Beim positiv-flankengetriggerten Flipflop, das in Abb. 32 dargestellt ist, erfolgt die Schaltung am Ausgang durch den ansteigenden Teil des angelegten Takt-Impulses. Das bedeutet, dass die Werte am Ausgang, die durch J und K bestimmt werden mit dem Ansteigen des Taktimpulses von L auf H ihren Wert ändern. Dargestellt ist das im Schaltsymbol durch die ansteigende Flanke eines Rechteckimpulses in der oberen rechten Ecke des Schaltsymbols.\n\n" }, { "id": "GYvNAMRlx", "type": "image", "content": 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" }, { "id": "Hb6kLsJOu", "type": "markdown", "content": "\nBeim negativ-flankengetriggerten JK-Flipflop, das in der Technik hauptsächlich verwendet wird, erfolgt die Umschaltung beim Abfallen des Impulses von H auf L. Abb. 33 symbolisiert ein solches Bauteil. Das Unterscheidungsmerkmal gegenüber dem vorherigen Flipflop ist die abfallende Flanke eines Rechteckimpulses.\n" }, { "id": "9hlJASmo4", "type": "image", "content": "data:image/png;base64,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" }, { "id": "1ZlUxuxyH", "type": "markdown", "content": "\nWohlbemerkt sind die beiden Eingänge R und S in diesem Fall nicht angeschlossen. Sie haben nämlich Priorität, d.h. sie sind vom Takt unabhängig. Doch dazu später mehr.\nWie schon bei der Unterscheidung der beiden JK-Flipflops erwähnt wurde, ist ein Taktimpuls bei diesem Bauteil sehr wichtig. Angelegt wird er am Eingang T. Von ihm hängt es z.B. ab, wie schnell sich ein Wert am Ausgang Q oder ¬Q ändern kann. Die Logik-Tafel gibt über die Werte am Ausgang genauer Auskunft.\n\n| J | K | Q | ¬Q |\n|:----:|:-----:|:-----:|:------:|\n| 0 | 1 | **0** | **1** |\n| 1 | 0 | **1** | **0** |\n| 0 | 0 | **Q** | **¬Q** |\n| 1 | 1 | **¬Q** | **Q** |\n\n\n1. Hat der J-Eingang den Wert 0 und K den Wert 1, so liegt am Ausgang Q der Wert 0. Entsprechend hat der komplementäre Ausgang ¬Q den Wert 1.\n\n\n1. Wechselt nun der J-Eingang auf den Wert 1 und der K-Eingang auf den Wert 0, so hat der Ausgang Q den Wert 1 und ¬Q den Wert 0.\n\n\n1. Wenn beide Eingänge den Wert 0 haben, so ändert sich das Ausgangssignal nicht, das bedeutet, dass der vorherige Wert des Ausgangs beibehalten wird.\n\n\n1. Falls beide Eingänge den Wert 1 aufweisen, so dreht sich das Ausgangssignal gerade um. Sowohl Q als auch ¬Q nehmen jeweils ihren komplementären Wert an. Oder anders ausgedrückt: Q nimmt den Wert von ¬Q an und ¬Q den Wert von Q.\n\n\nAllerdings kann sich das Ausgangssignal nur ändern, wenn ein Taktimpuls wirksam geworden ist. Um also ein Umschalten des Wertes am Ausgang zu erreichen, muss unbedingt ein Takt angelegt werden. Sobald nun bei einem negativ-flankengetriggerten Flipflop eine negative Flanke an T anliegt, stellen sich die Ausgänge Q und ¬Q entsprechend den Eingängen J und K um.\nDie Eingänge R und S sind dagegen vom Taktimpuls unabhängig. Sobald z.B. der Setzeingang auf Masse gelegt wird, erscheint am Ausgang der Wert 1, auch dann, wenn gerade kein Taktimpuls wirksam wurde. Ebenso funktioniert die Schaltung wenn der Rücksetzeingang R mit Masse verbunden wird. Dann erscheint am Ausgang A der Wert 0. Sobald der R- oder der S-Eingang benutzt wird, ist die übrige Beschaltung (also T, J und K) nicht wirksam.\nIn Abb. 34 ist nun das Schaltverhalten eines negativ-flankengetriggerten Flipflops dargestellt. Deutlich zu sehen ist dabei, dass ein Umschalten des Signals am Ausgang nur dann erfolgen kann, wenn der Taktimpuls T gerade abfällt.\nSpannungs-Diagramm (Schaltdiagramm) für ein negativ-flanken­getriggertes JK-Flipflop\n" }, { "id": "BZ1H6Xjhi", "type": "image", "content": 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" }, { "id": "7k7EyVyZo", "type": "markdown", "content": "\nZur Verdeutlichung hier nun die Erläuterung:\n\n1. J=0, K=1. Da R und S den Wert 1 haben, also nicht wirksam sind, kann der Takt wirksam werden. In der Logik-Tafel sieht man, dass der Ausgang Q den Wert 0 haben muss. Deshalb nimmt Q auch im Diagramm beim Abfallen der Taktflanke T den Wert 0 an.\n\n1. J=1, K=0. Damit hat Q den Wert 1.\n1. J=K=0. Am Ausgang Q erscheint der Wert 1, da laut Logik-Tafel der Wert gleich bleibt.\n1. J=K=1. Nun erscheint am Ausgang das gegenteilige Signal, das zuvor an Q lag. In diesem Fall ist es der Wert 0.\n1. J=0, K=1. Damit hat der Ausgang Q den Wert 0.\n1. J=K=0. Das Signal am Ausgang bleibt gleich, also auf 0.\n1. Bei Punkt A wird nun der Setzeingang S auf Masse gelegt. Damit nimmt der Ausgang Q sofort den Wert 1 an. Dies geschieht wie man sieht auch ohne Taktimpuls.\n1. Der Setzeingang S liegt noch immer auf Masse. Somit sind die Signale von J und K nicht wirksam, wenngleich auch eine negative Taktflanke vorliegt.\n1. Im Punkt B ist nun der Setzeingang S wieder auf dem Wert 1. Dagegen wird der Rücksetzeingang R auf Masse, also auf den Wert 0 gelegt. Damit nimmt der Ausgang Q sofort den Wert 0 an.\n1. R ist noch immer auf Masse gelegt. Damit hat der Ausgang unabhängig von J und K den Wert 0.\n1. J=0, K=1. R hat nun wieder den Wert 1, ist also genau wie S nicht wirksam. Der Taktimpuls kann also wieder wirksam werden und schaltet deshalb bei der abfallenden Taktflanke den Ausgang Q auf den Wert 0.\n\n\n\nZu bemerken wäre noch, dass bei nicht wirksamen Eingängen R und S zwischen den einzelnen Takt-Impulsen die Eingänge J und K jeden beliebigen Wert annehmen können ohne dass sich der Wert am Ausgang Q verändert. Sie können auch ihren Wert zwischen zwei Impulsen mehrmals wechseln. Für das Umschalten am Ausgang ist nur interessant, was zur Zeit der abfallenden Taktflanke für Signale an J und K liegen. Nur nach diesen Werten richtet sich der Wert des Ausgangs Q.\nAbb. 35 zeigt die Innenschaltung des JK-Flipflops. Das Master-Slave-Flipflop besteht intern aus 2 bistabilen Multivibratoren mit gesteuerter Übernahme, die in Reihe (hintereinander) geschaltet sind. Der sogenannte Master (engl. Master = Herr, Meister) besteht aus den Verknüpfungsschaltungen V3 und V4. Die NAND-Gatter V1 und V2 bilden die dazugehörige Torschaltung. Die J- und K-Eingänge sind UND-verknüpft. Die Verknüpfungsschaltungen V5 und V6 bilden die Torschaltung des Slave (engl. Slave = Knecht, Sklave). Der Multivibrator des Slave besteht aus den Verknüpfungsschaltungen V7 und V8. Der Multivibrator verfügt noch über 2 Eingänge, die nicht über die Torschaltung laufen, also auch unabhängig vom Takt wirksam sind: L-Pegel am Setzeingang S stellt den Ausgang Q auf den Wert 1, L-Pegel am Rücksetzeingang R stellt Q wieder auf den Wert 0 zurück.\n\n" }, { "id": "IcmUBrsKV", "type": "image", "content": 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" } ] }, { "id": "7lj7FMKcfL", "name": "Dualzähler", "sections": [ { "id": "GuGHYTa6It", "type": "markdown", "content": "\n## Dualzähler\n\nAus dem JK-Flipflop lässt sich nun eine in der Technik oft gebrauchte Zählerschaltung realisieren. Dabei werden oft die Eingänge S und R neben den J- und K-Eingängen benutzt. Der Einfachheit halber werden hier nur die J- und K-Eingänge sowie der R-Eingang verwendet. Natürlich wird auch der Takteingang T angeschlossen.\nWenn man an ein JK-Flipflop einen Takt T anlegt, so hat der Ausgang Q0 bei jeder negativen Taktflanke eine Wertänderung, also einen dauernden Wechsel zwischen 1 und 0. Abb. 37 zeigt den zeitlichen Verlauf des Ausgangs Q0 in Abhängigkeit vom angelegten Takt T. Jetzt wird an das zweite JK-Flipflop das Ausgangssignal Q0 angeschlossen. Somit bestimmt der Ausgang des ersten Flipflops den Takt des zweiten Flipflops. Das Anschlussbild ist in Abb. 36 zu sehen.\nWie man im Spannungsdiagramm der Schaltung erkennt, hat der Ausgang Q1 die halbe Taktfrequenz wie Q0. Dies beruht wiederum darauf, dass eine Umschaltung des Flipflops nur bei einer negativen Taktflanke stattfindet. Die Schaltzustände der beiden Flipflops entsprechen, wie unter dem Diagramm aufgezählt, dem dualen Zählerstand. Der Zähler kann also nur bis zur Zahl 11 des Dualsystems zählen. Das entspricht der dezimalen Zahl 3. Danach kehrt er automatisch wieder zur Anfangszahl 00 zurück.\n" }, { "id": "kBKJ8m8BX", "type": "image", "content": 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" }, { "id": "tzp8rFYB3", "type": "markdown", "content": "Wenn nun der Rücksetzeingang R, der oftmals auch Reset-Eingang genannt wird, auf Masse gelegt wird, erscheint auf jeden Fall der Wert 0 an beiden Ausgängen. Dabei ist der Takt nicht von Bedeutung, ebenso die Schaltzustände der beiden Ausgänge Q0 und Q1. Im folgenden Diagramm wird kurz nach dem zweiten Erscheinen der Zahl 11 (dual) der Reset-Eingang aktiviert. Man sieht, dass die beiden Ausgänge sofort den Wert 0 annehmen, obwohl keine negative Flanke vorliegt. Das wurde ja bereits im letzten Abschnitt näher erläutert. Dieser Sachverhalt wird nun bei Zählern angewandt, die bis zu einer bestimmten Zahl zählen sollen, die durch eine einfache Aneinanderreihung von Flipflops nicht erreicht wird. Beispielsweise könnte man mit der in Abb. 36 dargestellten Schaltung einen Zähler bauen, der nach der Zahl 2, also dual 10, auf 0 zurückspringt. Genaueres darüber wird im nächsten Abschnitt behandelt.\n" }, { "id": "ImIOkfkqs", "type": "image", "content": 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" }, { "id": "xNZiS4CE1", "type": "markdown", "content": "\n\n## Dualzähler für beliebige Zahlenreihen\n\n\nDer Dualzähler des vorherigen Abschnittes konnte nur Dualzahlen eines bestimmten Grades durchzählen. Beispielsweise von 00 bis 11 (entspricht dez. 3) oder bei einer Erweiterung der Schaltung durch zwei weitere JK-Flipflops von 0000 bis 1111 (entspricht dez. 15). Abhilfe gibt es dabei nur durch die Rücksetzung von Hand, das bedeutet den Rücksetzeingang R mit Hilfe eines Schalters auf Masse zu legen. Durch geeignete Verwendung der besprochenen Verknüpfungsschaltungen lässt sich nun der Rücksetzvorgang automatisch bewerkstelligen. Man muss nur die geeigneten Gatter zusammenschalten, die zu einem bestimmten Zeitpunkt den Zähler wieder auf Null zurücksetzt. Bei Zählern mit zwei oder drei JK-Flipflops ist das kein Problem. Selbst bei umfangreicheren Zählern gibt es leichte, sofort durchschaubare Rückstellschaltungen.\nAls Beispiel wählen wir einen Zähler, der durch drei Flipflops aufgebaut ist. Das Schaltbild ist in Abb. 38 dargestellt. Dieser Zähler hat jedoch eine automatische Rückstellung bei der Zahl 110. Dies entspricht der dezimalen Zahl 6.\n" }, { "id": "Q3N5I_D-4", "type": "image", "content": 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" 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" }, { "id": "sqSgs9UBL", "type": "markdown", "content": "\nWichtig ist die Zahl 6 in diesem Zähler nur für die Rückstellung. In Abb. 39 wurde die Zeitspanne für die Zahl 6 zur besseren Verständlichkeit übertrieben dargestellt. Tatsächlich erscheint diese Zahl so kurz, dass sie für den Zählvorgang keine Bedeutung hat. Es handelt sich hier also um einen Zähler von 0 bis 5. Diese Reihe wird ganz normal durchlaufen. Sobald aber der Zähler am Ausgang Q1 und Q2 gleichzeitig den Wert 1 hat, wird durch das NAND-Gatter der Reset-Eingang aller JK-Flipflops auf 0 gelegt. Der Zähler beginnt erneut von 0 an zu zählen.\n\nEs ist also wichtig, dass bei einem beliebigen Zähler der Rücksetzvorgang mit der nächsthöheren Ziffer des eigentlichen Zählumfangs aktiviert wird. Wenn z.B. ein Zähler bis 18 zählen soll, so muss der Rücksetzeingang durch eine geeignete Verknüpfungsschaltung für die Zahl 19 auf den Wert 0 gelegt werden.\n\nDer Rücksetzeingang bleibt nun so lange auf dem Wert 0, wie in unserem Beispiel Q1 und Q2 den Wert 1 haben. Da aber in wenigen ns der Rücksetzvorgang beendet ist (R hat Priorität), kann die nächste negative Taktflanke für das Umschalten des ersten Flipflops wirksam werden. Somit erscheint nach der dezimalen Zahl 0 (durch den Rücksetzvorgang) im nächsten Takt die 1. Problematisch wird diese Art der Rücksetzung nur bei sehr hohen Taktfrequenzen, oder bei sehr empfindlichen Schaltungen, die bei diesem kurzen Erscheinen der höheren Zahl “umkippen“ können. In diesem Fall muss man sich mit einer anderen Art der Rücksetzung behelfen. Meist genügt jedoch diese Art der Rückstellung. Die Impulsdauer sollte jedoch bei TTL-Schaltungen nicht unter 18 ns liegen, da diese Zeit zum Umschalten benötigt wird.\n\n" } ] }, { "id": "W7vE69Akai", "name": "Datenspeicher", "sections": [ { "id": "Yab6KS3i3s", "type": "markdown", "content": "\n## D-Flipflop (Datenspeicher)\n\nDas D-Flipflop ist ein einfaches Datenspeicherglied. Es kann einen bestimmten Wert abhängig vom Takt T und den Eingängen R und S speichern. Dabei haben die beiden letztgenannten Eingänge wie auch beim JK-Flipflop Priorität. Das bedeutet, dass das Flipflop unabhängig vom Takt einen gewünschten Wert annehmen kann, falls der Setz- bzw. Rücksetzeingang aktiviert wird. Sind diese beiden Eingänge jedoch auf den Wert 1 gesetzt (also nicht aktiv), so erfolgt bei jeder negativen Takt-Flanke eine Übernahme des Dateneingangs D an den Ausgang Q. Der komplementäre Ausgang ¬Q hat auch hier wieder den entgegengesetzten Wert von Q. Das Verhalten von D in Abhängigkeit vom Takt T und den Eingängen S und R zeigt das abgebildete Spannungsdiagramm.\n\nDie Industrie bietet D-Flipflops schon fertig aufgebaut als ICs an. Haben Sie diese jedoch nicht zur Hand, so kann man mit Hilfe eines JK-Flipflops einen solchen Datenspeicher aufbauen. Dazu ist es notwendig den K-Eingang über einen Inverter an den J-Eingang anzuschließen. An K liegt also ¬J. Wird nun an J der Wert der gewünschten Daten gelegt, so übernimmt das Flipflop bei der nächsten negativen Taktflanke diesen Wert auf den Ausgang Q. Ist z.B. das Flipflop auf dem Wert Q=0 und hat der Dateneingang den Wert D=1, so wechselt nach einer negativen Taktflanke der Ausgang Q seinen Wert von 0 auf 1. Dieser Wert wird so lange gespeichert, bis über den Takt T und einen neuen Wert an D der Zustand von Q geändert wird. Natürlich wäre eine Änderung auch durch eine Aktivierung von S oder R möglich.\n\n" }, { "id": "0Su7saoBQ", "type": "image", "content": 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" 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" 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" }, { "id": "qhUpS-4FE", "type": "markdown", "content": "Ein wichtiges Anwendungsbeispiel eines D-Flipflops ist das Schiebe­register. Dieses Bauteil ist in einem eigenen Kapitel noch genauer erklärt.\n" } ] }, { "id": "1fHnSUp0Da", "name": "KV-Tafel", "sections": [ { "id": "O_JSJ1ikPS", "type": "markdown", "content": "# KV-Tafel\n\n::: info\nUm bei komplizierten Rücksetzbedingungen oder bei Ansteuerungen von LEDs und Siebensegmentanzeigen eine möglichst einfache Kombination von Verknüpfungsschaltungen zu erreichen, bedient man sich meist der sogenannten KV-Tafeln.\n:::\n\n**Es ist eine systematische Methode** bei der ein bestimmtes Schema die Erkennung der benötigten Verknüpfungs­schaltungen erleichtert. Entwickelt wurde es von Karnaugh und Veitch. Bei dem Verfahren werden die Variablen in rechteckigen Feldern der KV-Tafel dargestellt.\n\n### Ein Beispiel\n\nDer Ausgang A soll ein Segment einer 7-Segment-Anzeige ansteuern. Gewählt wurde das oberste waagerechte Segment. Dabei wählen wir den Zähler von vorher, der von 0 bis 5 zählt. Der Ausgang A muss bei 0, 2, 3 und 5 den Wert 1 haben, da bei diesen Zahlen das Segment leuchten muss.\n\n\n| Q2 | Q1 | Q0 | A | Dez Zahl |\n|:------:|:------:|:------:|:------:|:-----------:|\n| 0 | 0 | 0 | 1 | 0 |\n| 0 | 0 | 1 | 0 | 1 |\n| 0 | 1 | 0 | 1 | 2 |\n| 0 | 1 | 1 | 1 | 3 |\n| 1 | 0 | 0 | 0 | 4 |\n| 1 | 0 | 1 | 1 | 5 |\n\n\nDurch diese Logik-Tafel ist nun der Zusammenhang der Dualzahlen (Q2Q1Q0) und dem Anschluss A des Segments gegeben. Es soll eine Decoderschaltung gefunden werden, die das Segment nur bei den dafür bestimmten Zahlen zum Leuchten bringt.\n\n\nNun werden zuerst so viele quadratische Felder aufgezeichnet, wie der Zähler im Höchstfall erreichen kann. Das wäre in unserem Fall mit 3 JK-Flipflops die Ziffern 0 bis 7, also 8 Zahlen. Bei Zählern mit 4 Flipflops wären es 16 usw.\n\nDanach werden die Felder in sich überlappende Bereiche unterteilt. Die komplementären Ausgänge ¬Q2, ¬Q1, ¬Q0 werden dabei ebenfalls berücksichtigt. Nun werden die Werte 1 für A in das Diagramm eingetragen. Die kleine Ziffer im rechten oberen Eck ist die dezimale Zahl dieses Feldes. Als Beispiel der Wert 1 für die dez. Zahl 0 (¬Q0, ¬Q1, ¬Q2) in die linke untere Ecke. Man nimmt immer die “Einserausgänge“ für die Bestimmung des Feldes. Bei der Zahl 000 des dualen Systems muss also jedes Mal der komplementäre Ausgang (¬Q2, ¬Q1, ¬Q0) genommen werden, da diese den Wert 1 haben. Somit wird die dezimale Zahl 0 in das obere rechte Eck des Feldes mit den Koordinaten ¬Q2, ¬Q1, ¬Q0 geschrieben und der Wert, den der Ausgang A bei dieser Zahl hat in dem Kästchen vermerkt. Bei der dualen Zahl 101 wäre also das Fach mit den Koordinaten Q2, ¬Q1, Q0 gemeint.\n\n\nMit diesem Schema wird nun das ganze Diagramm ausgefüllt. Die Felder, die danach noch frei sind, werden mit einem “Kreuz“ versehen, da sie ja beim Zählvorgang nicht vorkommen. Bei ihnen ist es also gleichgültig, ob sie nun den Wert 1 oder 0 haben.\nNun werden die “Einser“ in 2er oder 4er Gruppen zusammengefasst. Allerdings darf eine Zusammenfassung nicht diagonal erfolgen, wohl aber über den Rand hinweg. Die einzelnen Felder einer solchen Gruppe werden in der nachfolgenden mathematischen Gleichung durch ein “und“-Zeichen verknüpft. Die einzelnen Gruppen dagegen mit einem “oder“-Zeichen.\n" }, { "id": "I9rRkl_cK", "type": "image", "content": 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" }, { "id": "syTOOmBDM", "type": "markdown", "content": "Man erhält also nach Zusammenfassung der Felder und Gruppen die mathematische Gleichung der Form:\n\n```math\n A = Q1 vee (Q2 wedge Q0) vee (notQ0 wedge notQ2)\n```\nDas Umsetzen einer solchen Formel in eine Decoderschaltung wurde ja bereits bei den Verknüpfungsschaltungen erläutert. Man hält sich dabei stur an die mathematische Formel, das heißt für ein “und“-Zeichen ein AND-Gatter und für ein “oder“-Zeichen ein OR-Gatter. Damit ergibt sich die unten abgebildete Decoderschaltung die das Segment steuert.\n" }, { "id": "JgTIztIk8", "type": "image", "content": 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" }, { "id": "xtMeTnpEb", "type": "markdown", "content": "Der Einbau dieser Decoderschaltung erfolgt nun ganz analog. Es werden die benötigten Ausgänge der einzelnen Flipflops an die Schaltung angeschlossen und der Ausgang A an das Segment der 7-Segment-Anzeige.\n" }, { "id": "tn5dyFOyc", "type": "image", "content": 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" }, { "id": "L5SwBvqlz", "type": "markdown", "content": "\n**Dieses Verfahren erscheint auf den ersten Blick recht kompliziert**, ist aber bei genau schematischer **Durchführung sehr einfach und schnell** auszuführen. Bei der rein mathematischen Darstellung würde ein umfangreiches Wissen der Algebra unbedingt nötig sein. Außerdem wäre der Überblick schwer zu behalten. Deshalb wählt man, wenn irgend möglich, diese Art der Lösung. Oftmals erkennt man auch sofort, wie die Decoderschaltung aussehen muss. Dann ist natürlich diese schematische Darstellung nicht nötig.\nEin weiteres Beispiel für die Anwendung der KV-Tafel. Ein Zähler, der von 0 bis 9 zählt, soll eine 7-Segment-Anzeige steuern. Gesucht ist nun die Decoderschaltung für das mittlere waagerechte Segment. Die Abhängigkeit des Ausganges A der Decoderschaltung, die das Segment ansteuert ist wiederum in der Tabelle aufgezeigt.\n\n\n\n\n\n| Q3 | Q2 | Q1 | Q0 | A | Dez Zahl |\n|:------:|:------:|:------:|:------:|:------:|:-----------:|\n| 0 | 0 | 0 | 0 | 0 | 0 |\n| 0 | 0 | 0 | 1 | 0 | 1 |\n| 0 | 0 | 1 | 0 | 1 | 2 |\n| 0 | 0 | 1 | 1 | 1 | 3 |\n| 0 | 1 | 0 | 0 | 1 | 4 |\n| 0 | 1 | 0 | 1 | 1 | 5 |\n| 0 | 1 | 1 | 0 | 1 | 6 |\n| 0 | 1 | 1 | 1 | 0 | 7 |\n| 1 | 0 | 0 | 0 | 1 | 8 |\n| 1 | 0 | 0 | 1 | 1 | 9 |\n| 1 | 0 | 1 | 0 | x | 10 |\n\nDie Rücksetzung geschieht bei Q3 = Q1 = 1. Diese beiden Ausgänge werden durch ein AND-Gatter miteinander verknüpft, negiert und an die Rücksetzeingänge der 4 JK-Flipflops angeschlossen. Man kann genauso gut ein NAND-Gatter nehmen anstatt des AND-Gatters und der nachfolgenden Negation.\n\nDie KV-Tafel muss nun 16 Felder haben, da insgesamt 16 Ziffern gezählt werden könnten (0 bis 15). Nun werden, genauso wie vorher die Felder in sich überlappende Zeilen und Spalten unterteilt. Dabei darf keine Zeile oder Spalte für zwei Ausgänge gleichzeitig gelten. Beispielsweise darf die erste und zweite waagerechte Spalte nicht gleichzeitig Q0 und Q2 sein, wohl darf eine Spalte Q0, die andere ¬Q0 sein, und gleichzeitig beide Spalten Q2.\n\n\nDie einzelnen Felder werden nun genauso wie vorher ausgefüllt. Das bedeutet, dass zuerst die dezimalen Zahlen in die rechten oberen Ecken der Felder geschrieben werden. Dies geschieht, indem man die Ausgänge der Flipflops, die den Wert 1 haben zur Auffindung der Koordinaten zuhilfe nimmt. Beispielsweise soll das Feld für die duale Zahl 0100 (entspr. der dez. Zahl 4) aufgesucht werden. Q3, also die erste Ziffer, ist 0. Da aber ein 1-Wert benötigt wird, muss der invertierte Ausgang ¬Q3 genommen werden. Q2 ist schon 1, deshalb ist der invertierte Ausgang nicht nötig. Q1 und Q0 sind wieder 0, daher wird auch hier der invertierte Ausgang verwendet. Nun liegen schon alle Koordinaten dieses Punktes fest. Er wird im KV-Diagramm aufgesucht und mit der Zahl 4 versehen.\n\nAls weiteres Beispiel dient die duale Zahl 0101. Dabei sind die Ausgänge Q3 und Q1 Null. Also müssen hier die invertierten Ausgänge als Koordinaten verwendet werden. Q2 und Q0 sind schon 1. Das ergibt die Feldkoordinaten ¬Q3, Q2, ¬Q1, Q0. Diese Koordinaten werden im KV-Diagramm aufgesucht und mit der Zahl 5 versehen.\n\nSind nun sämtliche Felder mit den dazugehörigen dezimalen Zahlen versehen, wird anhand der Tabelle der Wert A, der am Ausgang des Decoders erscheinen soll, in das dafür bestimmte Feld eingetragen. Für die Felder, die der Zähler durch die Rücksetzung nicht erreichen kann, wird ein “X“ eingetragen als Zeichen dafür, dass es gleichgültig ist, ob der Zähler in dieser Situation eine 0 oder 1 ausgibt.\n\n" }, { "id": "wDpQ4SeG-", "type": "image", "content": 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" }, { "id": "jWVIRUfdk", "type": "markdown", "content": "\n\nNun werden benachbarte Einser-Felder zu 2er oder 4er Gruppen zusammengefasst. Diese Zusammenfassung darf auch über den Rand hinaus und auf der anderen Seite weitergehen. Diagonal darf dagegen nicht zusammengefasst werden.\nDie Koordinaten, die eine Gruppe gemeinsam hat, werden untereinander mit einem “und“-Zeichen der Booleschen Algebra zusammengefasst. Die Gruppen untereinander mit einem “oder“-Zeichen. Daraus ergibt sich die mathematische Formel:\n\n```math\n A = (notQ0 wedge Q2) vee (notQ1 wedge Q3) vee (Q1 wedge notQ2) vee (notQ1 wedge Q2 wedge notQ3)\n```\n\nNun müssen nur noch die “und”-Gruppen, deren Ausgänge an ein AND-Gatter angeschlossen wurden, mit einem OR-Gatter verbunden werden. Damit ist der Decoder für das mittlere Segment der 7-Segment-Anzeige fertig.\n\n" }, { "id": "pOmSKbbdl", "type": "image", "content": 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" } ] }, { "id": "25qmVRvBL", "name": "Frequenzteiler", "sections": [ { "id": "1KiWRl_0bI", "type": "markdown", "content": "# Frequenzteiler\n\n\nFür Digitaluhren, Frequenzmesser und viele weitere Schaltungen wird oft eine sehr genaue Zeitbasis verlangt. Das bedeutet, dass die Impulsdauer möglichst genau sein soll. Dies erreicht man am besten bei sehr hohen Frequenzen. Meist wird ein Quarz-Schwingkreis verwendet, der eine Schwingungszeit bis zu einigen MHz (Mega Hertz = 1 Mio. Hertz) und darüber hat. Doch können solche hohen Frequenzen nur sehr selten direkt verwendet werden. Vielmehr werden sie durch geeignete Frequenzteiler auf die benötigte Frequenz herunter gesetzt. So schwingt z.B. eine Quarzuhr mit der Frequenz 4194304 Hz. Durch Frequenzteilung wird daraus ein Impuls, der genau 1s dauert. Und diese Frequenz wird ja für eine Uhr gerade benötigt.\n\nDer Aufbau des Teilers entspricht dem des Zählers. Die JK-Flipflops leisten uns auch hier wieder gute Dienste. Wie beim Zähler wird der Ausgang Q eines jeden Flipflops mit dem Takteingang des nächsten verbunden. Da nun eine Umschaltung am Ausgang nur durch eine negative Flanke des Eingangsimpulses erfolgen kann, wird der Eingangs-Impuls in jeder Stufe halbiert (geteilt).\n\n" }, { "id": "GObU5T3x_", "type": "image", "content": 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VlgTIoxN1ix6wVGSxq+sFy4cKHjzXnCyEbAbCOGqFP5wAgL66TYweLbb7915wgjYzRMVli1apU7uECFhgXExJlwU3nBCAOL09l7kZ1aaCHhDxUIXzlCKLyfuI9b/J+Fw0Fj82u/sD14vpDf+AXv2traQh4r+F7SA87kDYy/5JnFixc7PvSGEEfGt2BDdzDDB8TRs6MHhS3lmJ7v2eEWTDnPdTaW9ltwcZ//WgZp4NOddCS92DqMbcM8V4YmSBu+poBQE16MsJDfCAtp79OGvMCm0byP/ssOxKNfv34uHpznPcDIg9yPm4SdLcgw8j1dxeQBPjjLeDtGuuIv/hEW8gf5GW7kE8qGYG8SeQS/SU8fbtxh9xXiE7yX87LcBCSEublEcpYXy79ceMhvXv5169ZlCSHXeRHI8Lw0/ObF50VgrC5qo3DxNf2g38SBlxXjZZ4yZYrrvkW8GBul8EHceLEp7Pk/z/DiUjhhFGy83NxDQeDPI3h0ueIvXbL+POcQQQoXCibcx/h/9/pFvbi3adMmJz6cZxd8ChvCCWvEGYMthRb/xw0KFsLIQRgpxBA9fsOfgph7SAcfFgo+/CU8FGD+PIUzeyuyHyIVCASCsTO+7u23ncJ/4owR/6AQ4ifm2YwePdr9P8w/+EchTL4pZ97BH+KE+fD78JKGcOYeKilUQujpgBFi4MWK+xFJxIqxZ9gF05dKB0x5b0hjjE9Ekd/IU1SWyCsY6ch54szkNC9KPk+RjoiPF0jCQrhJR9KdtCFdCCeTmMhrPn3Jm3yvz+c18j5GvMhrxJdzvpKGwCLKPowIIkaacy/5nrDQlcy+r4QNt70Qep7EnTARZsLnz+MO+dPHxTmufxolUFMP7v9vWKO36EKpCVB48vJfdNFFrkY+dOhQ9wKQkakp0xoZN27cAd6STLx4TzzxhCvIeSkoFJh4UImuJQodZqzRoqJgoUDjhaRAoAChUKBG+uCDD7pCl9o+NXJeZMJNXHmGQo7aNa0EX7umwEJQEA8KCl+Q4T7uUCDiJ4UFBgvupVCgQPEtAAoDRAn3qKH71iv3UZARBgpcL9wUHD4svhZOGAkLBRoFN/eTFrhJAUrrkgKVgsqHhXPEizByYISFyQ2E1Ys733t75ZVXGloD7sY8/oHDHXfcYU8//XQed+e+hcIWkSr368+ne+gVIL9QgSPsVCJILz6uSnpR+RhdL+yw5zzpS3p5oQqmL5zJExjpCFPcDKYv6UgakL7c78UYdzmPOJAGPt05R74i35BevmVFmvMMbhAWn+7kHdKXvODDQhg5z1/yq2/hEUbyIEYYvTCRpwg7YcB9HxbCwUFeIyx8+JYvviO4haYVYf/ggw9swIABzn/90zgBtQgbZ1PWKwjGxIkTnahR2DZn3EMrg339aElgiM2Q+r0AKWSjNgoCjJeTl5qXjhYf44PUuhEJZsSOGDHigKAR1lzLAXCve33rLdNwhyPTKDA5Mo3CiCPTEOFclusL2oQlVxiJJ0emUZByZBoFoC8Eg9e82FLg5ZP2wWdL9ZsCm6PchkghuvgFI7og+aYdLVK6p9955x2XX+hWDBoixJFpsOPItMbS1+fT4P0IMfk108KkY66wBL+7F/SDCmKm+Z6FzPNeEHnnuUdWXgLlfxPKG/5Euk7hwJrBzHWDiAq1RmqI/M4sJGmF0M3CEQejcCMOtGz5SCvjNYgzYuHH9eIQToWhsgQQC3ouGH8lfyCACBfvwdy5cysbOPkuAvUEJIQxygYIH60ihCRTBGMUzIagUGPn8yxMh6fmKhOBTAKIHRWlm266yY2J0W0pE4G4EZAQxihFaPHRdcQRd0OoKdQY55EIxj21Khs+usqZxclwgEwE4kigRRwDpTCJgAiIgAiIQFQEJIRRkZY/IiACIiACsSQgIYxlsihQIiACIiACURGQEEZFWv6IgAiIgAjEkoCEMJbJokCJgAiIgAhERUBCGBVp+SMCIiACIhBLAhLCWCaLAiUCIiACIhAVAQlhVKTljwiIgAiIQCwJSAhjmSwKlAiIgAiIQFQEJIRRkZY/IiACIiACsSQgIYxlsihQIiACIiACURGQEEZFWv6IgAiIgAjEkoCEMJbJokCJgAiIgAhERUBCGBVp+SMCIiACIhBLAhLCWCaLAiUCIiACIhAVAQlhVKTljwiIgAiIQCwJSAhjmSwKlAiIgAiIQFQEJIRRkZY/IiACIiACsSQgIYxlsihQIiACIiACURGQEEZFWv6IgAiIgAjEkoCEMJbJokCJgAiIgAhERaBlVB7Jn+ojsGPHDps1a5YtXrw4K3KbN2+2LVu22JQpU7Ku6YTZ1q1bbfny5bZ79+6qx7Fs2TKbOnWqtWrVKiuuS5cutbZt21qbNm2yrumEWV1dnW3fvl0oykxAQlhmwNXqfLt27WzEiBG2ZMkS27ZtW1Y09+7da4MHD7YVK1ZkXdMJcwLYoUMH69+/v+3fv78gJO3bt7dBgwYV9Eylbiace/bssdWrV+cMQteuXa2mpkb5JCcds3379lnPnj2tW7dujdzR+Ok+ffpY586dG79BVxoI1NS/hIW9hQ2P6ocIiIAIiIAIJJ+AxgiTn4aKgQiIgAiIQBEEJIRFwNOjIiACIiACyScgIUx+GioGIiACIiACRRCQEBYBT4+KgAiIgAgkn4CEMPlpqBiIgAiIgAgUQUBCWAQ8PSoCIiACIpB8AhLC5KehYiACIiACIlAEAQlhEfD0qAiIgAiIQPIJSAiTn4aKgQiIgAiIQBEEJIRFwNOjIiACIiACyScgIUx+GioGIiACIiACRRCQEBYBT4+KgAiIgAgkn4CEMPlpqBiIgAiIgAgUQeB/0TfTbd50vAYAAAAASUVORK5CYII=" }, { "id": "S66e5eo0s", "type": "markdown", "content": "\nDer Sachverhalt der Frequenzteilung wird am Spannungsdiagramm besonders deutlich. Man sieht den Eingangsimpuls T, der von einem Taktgenerator (z.B. Quarzoszillator) geliefert wird. Darunter die beiden Ausgänge der Flipflops.\n" }, { "id": "et2UWZ_YC", "type": "image", "content": "data:image/png;base64,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" }, { "id": "H8kFjqkvj", "type": "markdown", "content": "\nDas Teilungsverhältnis dieser Schaltung ist 1:4, denn es sind 4 negative Taktflanken notwendig, um am Ausgang Q1 eine negative Flanke auszulösen. Am Ausgang Q0 wird eine Teilung 1:2 erreicht. Durch Hinzuschalten weiterer Flipflops ist folgende Reihe von Teilungen möglich:\n\n 1:2, 1:4, 1:16, 1:32, 1:64, 1:128, usw.\n\n\nEs handelt sich also immer um den Faktor 2. Damit lässt sich die Oszillatorfrequenz einer Digitaluhr sehr leicht berechnen. Man teilt die Frequenz so lange durch 2, bis man den gewünschten Grundwert 1 s erhält. Bei der vorher erwähnten Frequenz von 4194304 Hz wird dies erreicht, wenn man die Zahl 22 mal durch 2 teilt.\n" }, { "id": "Smu-5Vop7", "type": "markdown", "content": "\nIn der Praxis wird man nun recht selten einen Zähler mit einzelnen JK-Flipflops aufbauen. Vielmehr nimmt man Zähler bzw. Teiler, die als integrierte Schaltungen (ICs) angeboten werden. Eine solche Schaltung ist z.B. der IC “SN 7490“.\nMit dieser Schaltung lassen sich Frequenzteiler realisieren, die im folgenden beschrieben sind. Außerdem ist es ein häufig benötigter Zähler-IC, der von 0 bis 9 zählt und dann bei entsprechender Beschaltung wieder auf 0 zurück geht.\n\n" }, { "id": "Tw7fuVGgi", "type": "image", "content": 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" }, { "id": "oK1zh1592", "type": "markdown", "content": "\nDas Prinzipschaltbild zeigt, dass auch hier 4 JK-Flipflops verwendet wurden. Hier werden zum Teil auch die Setzeingänge der Flipflops verwendet. Das bringt den Vorteil, dass Verknüpfungsschaltungen für die Rücksetzung entfallen und die Schaltung kann dadurch billiger realisiert werden.\n\nAls Takteingang dient hier je nach Anforderung der Eingang A oder der Eingang BD, der auch in verschiedenen Datenbüchern mit B gekennzeichnet ist.\n\nMit den Eingängen R01 und R02 kann man eine Nullstellung “erzwingen“ indem man an beide Eingänge ein High-Signal legt. Ebenso ist es möglich mit Hilfe der beiden Eingänge R91 und R92 eine Neun-Stellung zu erzwingen. Mit einer entsprechenden Verknüpfungsschaltung ist es also möglich, jede Art von Zähler zwischen 0 und 9 aufzubauen indem man den Zähler beim gewünschten Stand wieder auf Null setzt. Für den Zähler von 0 bis 9 werden diese vier Eingänge auf Masse gelegt.\n\nDen Anschluss des ICs zeigt die folgende Abbildung. Im Gegensatz zu den Transistoren werden allerdings sämtliche Pinbelegungsbilder mit den Anschlussbeinen nach unten gezeichnet. Man stellt also den IC auf die “Füße“ und betrachtet ihn von oben, nicht von unten!\n" }, { "id": "KDjVPVuyP", "type": "image", "content": 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" }, { "id": "73IUGgEcd", "type": "markdown", "content": "\nZur Erkennung der linken oder rechten Seite eines integrierten Schaltkreises ist bei Pin 1 bzw. Pin 14 (Pin = Anschlussbeinchen) eine Kerbe oder eine punktförmige Vertiefung angebracht. Dadurch ist die Benennung des Pins sofort zu erkennen. Eingezeichnet wird dies auch auf dem Applikationsbild (Anschlussbild).\n\nDie Anschlüsse 4 und 13 sind bei diesem Bild nicht gekennzeichnet. Das bedeutet, dass sie keinen Anschluss zur inneren Schaltung des Zählers haben. Gewöhnlich werden solche Anschlüsse mit “NC“ gekennzeichnet, was ausgeschrieben “Non Connect“ (nicht angeschlossen) heißt.\n\nBei Pin 14 und 1 sieht man innerhalb des ICs den Invertierungspunkt. Das bedeutet, dass bei einem L-Impuls (hier negative Flanke, da negativflankengetriggertes Flipflop) eine Umschaltung geschehen kann.\n\n\nOftmals werden auch in Datenbüchern die Benennungsbuchstaben mit einem Komplementär-Zeichen gekennzeichnet. Das wäre in diesem Fall ¬A oder ¬BD. Die Ausgänge QA, QB, QC, QD sind Ausgänge der Flipflops und bezeichnen die Dualstelle der dualen Zahl am Ausgang. Bei der Dualzahl 1100 hat also QD und QC den Wert 1, QB und QA haben den Wert 0.\n\nDie Spannung wird an Pin 10 (Masse) und Pin 5 (positiver Pol der Versorgungsspannung) angeschlossen.\n\n\n## SN 7490 als Teiler\n\n\n### Frequenzteiler 1:2\nHierbei wird nur das Eingangsflipflop des ICs verwendet. Die vier Rückstelleingänge R01, R02, R91 und R92 sind mit Masse verbunden.\n" }, { "id": "Hfd-GYwfh", "type": "image", "content": 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" }, { "id": "BaG7q1FWH", "type": "markdown", "content": "\n### Frequenzteiler 1:3\nDer Takt wird hier an den Eingang des Flipflops FFA gelegt. Der Ausgang dieses Flipflops ist mit BD verbunden. Die Ausgänge QA und QB sind an die Rückstelleingänge R01 und R02 angeschlossen.\nEine Rückstellung erfolgt dann, wenn diese beiden Ausgänge ein H-Signal aufweisen.\n" }, { "id": "SGUIdsLhL", "type": "image", "content": 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" }, { "id": "_SyyYyoL9", "type": "markdown", "content": "\n\n### Frequenzteiler 1:5\nDer Takt wird auf den Eingang BD gelegt. Somit arbeitet der Zähler nur mit der Teilerkette FFB, FFC und FFD. Durch diese Beschaltung wird ein Teilerverhältnis von 1:5 erreicht.\n" }, { "id": "6tzc8TeMU", "type": "image", "content": "data:image/png;base64,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" }, { "id": "nPF8wkgKu", "type": "markdown", "content": "\n### Frequenzteiler 1:9\nQA wird mit dem Flipflop-Eingang BD und mit R01 verbunden. Außerdem muss QD an R02 angeschlossen werden.\nTritt nun an QA und QD gleichzeitig ein H-Signal auf, so wird der Zähler wieder auf 0 zurückgesetzt.\n" }, { "id": "e1Vq7RF_n", "type": "image", "content": "data:image/png;base64,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" }, { "id": "QTmqnHf-d", "type": "markdown", "content": "\n\n### Frequenzteiler 1:10\nDiese Schaltung ist nun der eigentliche Zählbetrieb des ICs. Sämtliche Rückstelleingänge sind mit Masse verbunden. Der Eingang BD der Flipflop-Kette FFB, FFC und FFD ist mit dem Ausgang QA verbunden. An den Ausgängen QA, QB, QC und QD können nun die dualen Daten des Zählerstandes entnommen werden.\n" }, { "id": "LE1PEmkcz", "type": "image", "content": 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" }, { "id": "VfK8bR-5Y", "type": "markdown", "content": "\nIm letzten Fall nehmen die Ausgänge also die Werte von 0000 bis 1001 (dez. 9) an. Diese Signale können nun weiter verwendet werden um z.B. einen 7-Segment-Decoder zu steuern. Dieser wiederum zeigt den Zählerstand durch ein LED Siebensegment an.\nZur Verdeutlichung kann man auch hier eine Logik-Tafel aufstellen. Sie sagt aus, dass eine Rückstellung nur dann erfolgen kann, wenn beide Rücksetzeingänge R01 und R02 (oder R91 und R92) ein H-Signal erhalten.\n\n\n## Integrierter Zähler und Teiler 7492\n\nDieser IC ist ähnlich aufgebaut wie der vorher besprochene Zähler 7490. Er besteht ebenfalls aus 4 JK-Flipflops, nur sind hier andere Teilerverhältnisse zu erreichen, die im Folgenden beschrieben sind.\n\nDas Teilerverhältnis 1:2, das nicht extra aufgeführt ist, kann man durch eine analoge Beschaltung wie beim Zähler 7490 erreichen. Auch hier wird das\n\nEingangsflipflop für die Teilung verwendet. Wie man aus dem Prinzipschaltbild erkennt, hat dieses Bauteil keine Rücksetzung auf 9. Es ist nur eine Rückstellung auf 0 möglich. Der Eingang der Flipflopkette ist hier mit BC beschriftet. In manchen Datenbüchern wird er ebenso wie beim 7490 mit “B“ gekennzeichnet.\n" }, { "id": "KTL0eqvnR", "type": "image", "content": 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" }, { "id": "AxMcdK_6A", "type": "markdown", "content": "\nDie Pinbelegung stimmt mit dem vorherigen Zähler in Aus- und Eingängen überein. Nur die Rückstelleingänge für 0 liegen diesmal bei Pin 6 und 7. Ohne Anschluss, also NC (Non Connect) sind die Anschlüsse 2, 3, 4 und 13. Die Stromversorgung stimmt ebenfalls mit dem Zähler 7490 überein.\n" }, { "id": "DRMWssOa-", "type": "image", "content": 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" }, { "id": "BSdgH_hDN", "type": "markdown", "content": "\n### Frequenzteiler 1:6\nDas Eingangsflipflop wird hier nicht verwendet. Nur die Teilerkette FFB, FFC und FFD ist angeschlossen\n" }, { "id": "gCU08Vm93", "type": "image", "content": "data:image/png;base64,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" }, { "id": "xSV2mZOXp", "type": "markdown", "content": "\n\n### Frequenzteiler 1:12\nEiner der beiden Rückstelleingänge muss auf Masse gelegt werden. Der Ausgang QA wird mit dem Eingang BC verbunden. Somit befinden sich alle Flipflops in Betrieb.\n" }, { "id": "LqWyI9a9C", "type": "image", "content": 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" }, { "id": "e6LfUueIQ", "type": "markdown", "content": "Generell kann man an den Ausgängen der verwendeten Flipflops die H- bzw. L-Signale abgreifen. So kann man also den oberen Teiler mit Teilerverhältnis 1:6 auch als “Fünfzähler“ verwenden. Der Zähler beginnt mit der Zahl 0 und schaltet nach 5 wieder auf 0 zurück. Oder man kann mit einem Teiler 1:9 beim 7490 einen “Achterzähler“ aufbauen. Dieser beginnt ebenfalls mit der Zahl 0 zu zählen und schaltet nach der Zahl 8 auf 0 zurück.\n\nMit diesen Zählern kann man nun verschiedene auch für den täglichen Gebrauch sehr nützliche Schaltungen aufbauen. So z.B. eine Digitaluhr, Impulszähler, Frequenzmesser mit digitaler Anzeige, Stoppuhren und viele andere Zählschaltungen.\n\nDoch vorerst haben wir nur das duale Signal. Dieses muss durch eine geeignete Decoderschaltung in ein sichtbares, sofort erkennbares Signal umgeformt werden. Bei unseren Zählerschaltungen empfiehlt sich die Umformung in einen Code, der durch eine 7-Segmentanzeige angezeigt werden kann. Ein solcher Decoder kann durch geeignete Verknüpfungsschaltungen aufgebaut werden. Da diese Schaltung aber sehr umfangreich würde, empfiehlt es sich auch hier auf einen schon fertigen Decoder zurückzugreifen, wie er im nächsten Kapitel beschrieben wird.\n\n## BCD-to-7-Segment Decoder\n\nDie Abkürzung BCD steht für “binary coded decimal“ und meint einfach die binäre Darstellung einer Dezimalzahl. Ein BCD-to-7-Segment Decoder wandelt nun ein solches Signal in entsprechende Steuersignale für eine 7-Segmentanzeige um. Das bedeutet, dass ein duales Signal an die Eingänge dieser Schaltung gelegt wird und dieses Signal in einen Code für die 7-Segmentanzeige umgewandelt wird. Aber was ist jetzt eigentlich eine 7-Segmentanzeige?\n\nEine solche Anzeige besteht aus 7 LEDs (Licht emittierende Dioden). Eine Leuchtdiode sendet Licht aus, wenn sie in Durchlassrichtung geschaltet ist. Das Material ist meist Galliumarsenid. Das Leuchten entsteht in dem Grenzgebiet zwischen der n- und der p-Zone des Halbleiterelements, durch die Energie der bewegten Ladungsträger. Der Durchlassstrom, der zum Leuchten durch die Diode fließen muss, liegt bei etwa 1 mA. Dies ist eine ideale Voraussetzung für die am Ausgang nicht stark belastbaren Gatterschaltungen. Somit hat eine Leuchtdiode gegenüber einer normalen Glühlampe den Vorteil, dass zum Aussenden von Licht ein weitaus geringerer Strom benötigt wird, und somit eine umfangreiche Schaltung zur Stromverstärkung entfallen kann.\n\nUnterschiede zwischen verschiedenen Leuchtdioden gibt es nicht nur in der Leuchtfarbe (rot, gelb, grün, blau, weiß), sondern auch in der Bauteilgröße: Von Subminiatur bis Normal-Grösse sind sie im Handel erhältlich, je nach Geschmack und Anforderung.\nDie 7-Segmentanzeige wird überall dort verwendet, wo Zahlen angezeigt werden sollen, z.B. in Taschenrechnern und digitalen Uhren. Die Anordnung der 7 LEDs ist so gewählt, dass jede Ziffer zwischen 0 und 9 und einige Sondersymbole dargestellt werden können. Um eine einheitliche Benennung der Segmente zu erreichen, werden die einzelnen Leuchtdioden mit den kleinen Buchstaben a, b, c, d, e, f und g benannt.\n" }, { "id": "_VdiInzdh", "type": "image", "content": 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" }, { "id": "URtFygvJ6", "type": "markdown", "content": "\nUm die Ziffer 0 mit einer solchen Anzeige aufleuchten zu lassen, müssen die Segmente a, b, c, d, e und f zum Leuchten gebracht werden. Und genau diese Aufgabe übernimmt der Decoder. Das duale Signal, das z.B. von einem Zähler kommen kann, ist im Fall der Ziffer 0 ein 0-Wert an allen Eingängen, also 0000. Oder anders ausgedrückt: Die Ausgänge QA, QB, QC und QD eines Zählers, die gleichzeitig die Eingänge des Decoders sind, haben bei der dezimal angezeigten Zahl 0 alle den Wert 0. Intern wird dieses angelegte Signal weiterverarbeitet, um als dezimale Ziffer auf der 7-Segmentanzeige angezeigt werden zu können.\n\nEin solcher BCD-to-7-Segment Decoder ist z.B. der IC “SN 7447“. Die Pinbelegung ist in Abb. 54 zu sehen. Die Versorgungsspannung liegt an Pin 8 und 16, die Ausgänge a, b, c, d, e, f und g an den Pins 9 bis 15. Diese Ausgänge sind innerhalb der Schaltung invertiert, d.h. bei einem 1-Signal liegt am Ausgang der Wert 0 (was dem Minuspol der Spannungsquelle entspricht). Da 7-Segmentanzeigen mit gemeinsamer Anode und gemeinsamer Kathode angeboten werden, muss bei einer Invertierung der Ausgänge immer eine Anzeige mit gemeinsamer Anode genommen werden. Die Anode wird an den Pluspol der Versorgungsspannung angeschlossen. Der Minuspol (Masseanschluss) entspricht dem Wert 0 und wird vom Decoder am Ausgang geliefert.\n" }, { "id": "bM7narmLu", "type": "image", "content": 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" }, { "id": "a7M8S_xPl", "type": "markdown", "content": "Beim Anschluss der 7-Segmentanzeige wird zuerst der gemeinsame Anoden-Pin an den Pluspol der Versorgungsspannung angeschlossen. Der Anschluss “dp“, der für den Dezimalpunkt vorgesehen ist, kann offen gelassen werden. Um ihn zu steuern, ist eine weitere Verknüpfung notwendig. Verwendet wird er z.B. beim Taschenrechner, um die Kommastelle zu markieren. Für einen Zählerbausatz ist dies aber nicht unbedingt notwendig.\n\nDer Anschluss “LT“ ist ein Lampentest-Eingang, der durch einen Masseanschluss aktiviert werden kann. Masseanschluss deshalb, weil auch hier intern eine Invertierung vorgenommen wird. Ist dieser Pin an den Massepool angeschlossen, so leuchten sämtliche Segmente für diese Zeit auf. Somit ist ein Test der einzelnen Leuchtdioden möglich. Weiterhin ist eine Helligkeitssteuerung und eine Unterdrückung von führenden Nullen möglich.\n\nDie Anzeige der einzelnen Segmente zeigt Abb. 55. Unter den schematischen Segmentbildern ist der Zählerstand beim Decodereingang aufgezählt. Wie man sieht, erscheinen ab der Zahl 10 Sondersymbole. Dies kommt daher, dass mit einem Segment nur Zahlen von 0 bis 9 möglich sind, der Decoder aber durch die vier Eingänge bis zur dualen Zahl 1111 (dezimal 15) zu steuern ist.\n" }, { "id": "lJsKesxId", "type": "image", "content": "data:image/png;base64,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" }, { "id": "lkMaJVKMK", "type": "markdown", "content": "\n## BCD-to-7-Segment Zähler\n\nDies ist eine Kombination des Dezimalzählers SN 7490 und des BCD-to-7-Segment Decoders SN 7447. Der Decoder gibt das empfangene Signal des Zählers umgeformt an die 7-Segment-Anzeige mit gemeinsamer Anode weiter. Das Taktsignal (z.B. von einem Taktgeber) wird an den rechten Zähler gelegt. Durch seine Beschaltung zählt er von 0 bis 9, kehrt danach auf 0 zurück und beginnt von Neuem mit dem Zählvorgang. Das erreicht man, wie schon beschrieben, indem man die Rücksetzeingänge R01, R02, R91 und R92 (hier mit Reset bezeichnet) auf Masse legt. Außerdem muss der Ausgang QA mit dem Eingang BD verbunden werden. Der Zähler gibt nun sein Signal an den Decoder weiter. Dabei werden die Ausgänge des Zählers mit den dazugehörigen Eingängen des Decoders verbunden, d.h. der Ausgang QA mit dem Eingang A usw.\n\nDer Decoder formt das Signal des Dezimalzählers in einen Code um, der durch die 7-Segment-Anzeige als Zahl sichtbar wird.\n\nDie Steuerung des zweiten Zählers erfolgt bei der Rücksetzung des ersten Zählers auf 0. Der Ausgang QD des ersten Zählers, der ab der Zahl 8 (entspr. 1000) den Wert 1 hat, erzeugt bei der Rückstellung eine negative Flanke, die für eine Taktung des zweiten Zählers ausgenutzt wird. Das Spannungsdiagramm dieses Ausgangs ist unten abgebildet.\n\n" }, { "id": "iatDNW0cU", "type": "image", "content": "data:image/png;base64,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" }, { "id": "iJG_AoIDT", "type": "markdown", "content": "\nMit diesem Schaltungsschema können nun beliebig viele Zähler aneinander gereiht werden.\n\nBei dem vorliegenden Zähler ist ein Zählerstand von 00 bis 99 möglich. Nicht zu vergessen ist, dass die gemeinsame Anode der 7-Segment-Anzeige an den Pluspol der Versorgungsspannung angeschlossen werden muss. Ebenso ist es noch nötig die Stromversorgung, die hier nicht eingezeichnet wurde, an die Zähler und die Decoder anzuschließen.\n\nGetaktet wird die ganze Schaltung mit einem der besprochenen Taktgeber, also entweder mit Einzelimpulsen oder Folgeimpulsen.\n" }, { "id": "JYy0H30Vr", "type": "image", "content": 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" }, { "id": "tLHqfy8EU", "type": "markdown", "content": "\n## BCD-to-Decimal Decoder\n\nDiese Schaltung ist eine weitere Decoderschaltung. Sie setzt nicht wie beim vorherigen Decoder das duale Signal (BCD-Signal) in ein Signal für eine 7-Segment-Anzeige um, sondern liefert ein dezimales Signal. Das heißt konkret, dass bei einem gewissen Zählerstand des Eingangs ein Signal an einem bestimmten Ausgang erscheint. Wird z.B. an den Eingang des Decoders das duale Signal 0000 gelegt, das der dezimalen Zahl 0 entspricht, so erhält der Ausgang mit der Nummer 0 das Signal. Oder, um ein weiteres Beispiel zu nennen, wenn am Eingang das duale Signal 0110 angelegt wird (entspr. dezimal 6) so liegt am Ausgang 6 das ausgehende Signal.\n" }, { "id": "NaDEamO7d", "type": "image", "content": 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" }, { "id": "tIUnHLzLu", "type": "markdown", "content": "\nDie Abbildung zeigt einen solchen BCD-to-Decimal Decoder, es ist der IC “SN 7445“. Wie man sieht, hat er genau 10 Ausgänge, beschriftet mit “0“ bis “9“. An ihnen kann das invertierte Signal, also ein L-Wert, abgegriffen werden. An die Eingänge QA, QB, QC und QD wird das duale Signal, das z.B. von einem Dezimalzähler kommen kann, angelegt.\nDa der Decoder nur Ausgänge von 0 bis 9 hat, können nur duale Zahlen bis einschliesslich 1001 decodiert werden. Diese Zahl entspricht genau der dezimalen Zahl 9. Die angelegten Werte über dieser Grenze, also Zahlen von 10 bis 15 bewirken keine Signalübermittlung an den Ausgängen. An ihnen erscheint dann generell der Wert 1, da ja die Ausgänge invertiert sind.\nDieser Schaltkreis kann z.B. eine LED-Kette steuern. Dazu wird an die Eingänge QA, QB, QC und QD das Signal eines Dezimalzählers angeschlossen. Man kann nun genau ablesen, welchen Zählerstand der Dezimalzähler gerade hat. Wechseln die einzelnen Werte am Eingang des Decoders in schnelleren Schritten, d.h. wird an den Zähler eine höhere Taktfrequenz angelegt, so erhält man ein Lauflicht. Die dunkle Leuchtdiode wec\n" } ] }, { "id": "-2cO4SAWSK", "name": "Schieberegister", "sections": [ { "id": "GEYUxfxek9", "type": "markdown", "content": "# Schieberegister\nAuch bei den sogenannten Schieberegistern finden JK-Flipflops Anwendung. Maßgeblich beteiligt sind dabei nur die Eingänge J und K, der Takteingang T und, wenn erforderlich, der Rücksetzeingang R.\n\nEin Schieberegister ist so aufgebaut, dass der Taktimpuls an alle Takteingänge gleichzeitig gelegt wird. Es findet also keine Taktteilung statt, sondern alle Flipflops haben den selben Takt. Weiterhin wird jeweils der Q-Ausgang des vorhergehenden Flipflops mit dem J-Eingang des nachfolgenden Flipflops verbunden und der ¬Q-Ausgang mit dem K-Eingang.\n\nDer Dateneingang D dieser Kette wird an den Eingang des ersten Flipflops gelegt und invertiert an den K-Eingang.\n" }, { "id": "jK3ZiCatw", "type": "image", "content": 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" }, { "id": "vqs5fPSY2", "type": "markdown", "content": "\nWird bei dieser Schaltung an den Takteingang T ein Impuls gelegt, so wird die gespeicherte Information des Flipflops 3 an die Eingänge des Flipflops 2 weiter “geschoben“. Daher auch der Begriff “Schieberegister“. Die an D angelegten Daten werden also mit jedem Taktimpuls um eine Flipflopstelle weiter nach rechts geschoben. In diesem Beispiel können im Höchstfall 4 Werte in den Flipflops gespeichert werden. Es handelt sich dabei also um ein “4-Bit-Schieberegister“. Ein Bit stellt eine Informationseinheit dar und hat entweder den Wert 0 oder den Wert 1.\n\nSpielen wir nun einmal einen solchen Ablauf durch. An den Dateneingang D wird der Wert 1 gelegt. Wird nun ein Taktimpuls wirksam, so erhält das Flipflop 3 am Ausgang Q3 den Wert 1. Daraufhin wird an D der Wert 0 angelegt. Mit dem nächsten Taktimpuls an T wird der Wert 1 von FF3 an FF2 weitergeschoben; es tritt also an FF2 der Wert 1 am Ausgang auf. Außerdem wird beim selben Taktimpuls der Datenwert 0 vom Eingang D auf das FF3 übernommen, womit am Ausgang Q3 der Wert 0 auftritt. Wird nun an den Eingang D der Wert 1 gelegt und tritt ein erneuter Taktimpuls auf, so erhält der Ausgang Q1 den Wert 1, Q2 erhält den Wert 0 und Q3 den Wert des Dateneingangs vor dem Impuls, also 1. Wird daraufhin an D der Wert 0 gelegt und wird ein neuer Taktimpuls wirksam, so erscheint am Ausgang Q3 der Wert 0, an Q2 der Wert 1, an Q1 der Wert 0 und an Q0 der Wert 1.\n\nDer angelegte Wert von D wird also immer pro Taktimpuls um eine Stelle weiter geschoben.\n\nDie folgende Tabelle zeigt den Sachverhalt der Verschiebung anschaulich. Dabei sind die Informationen, d.h. die Werte 1 oder 0, die an D gelegt werden durch die Variablen a3, a2, a1 und a0 ersetzt. Wichtig dabei ist, dass man zuerst die Daten für a0 eingeben muss, dann die für a1 usw., damit am Ende die Datenreihe a3a2a1a0 erreicht wird. Ein X in der Tabelle bedeutet, dass der Wert an dieser Stelle beliebig ist.\n\n| t | D | Q3 | Q2 | Q1 | Q0 |\n|-------|---------|----------|----------|----------|---------|\n| 0 | D=a0 | X | X | X | X |\n| 1 | D=a1 | a0 | X | X | X |\n| 2 | D=a2 | a1 | a0 | X | X |\n| 3 | D=a3 | a2 | a1 | a0 | X |\n| 4 | X | a3 | a2 | a1 | a0 |\n\nEine weitere Möglichkeit der Eingabe der 4 Daten ist durch die Möglichkeit des Setzens gegeben. Die Daten können nämlich auch durch die Setz- bzw. Rücksetzeingänge eingegeben werden, soweit diese vorhanden sind. Dabei ist ja, wie bekannt, kein Takt nötig.\n\nFalls die Rücksetzeingänge bei einer “Taktsetzung“ (also einer Registrierung der Daten über die J- und K-Eingänge) miteinander verbunden sind, kann damit das ganze Register gelöscht werden. Dies ist von großem Vorteil bei einem Ringschieberegister, das folgend abgebildet ist.\n\n" }, { "id": "hUAGlCYHS", "type": "image", "content": 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" }, { "id": "I4JLvifVz", "type": "markdown", "content": "\nBei diesem Ringschieberegister ist der Ausgang Q0 mit dem Dateneingang D verbunden. Die Daten werden also in einem Ring weitergeschoben. Dadurch bleiben die einmal gespeicherten Werte die ganze Zeit über gespeichert. Bei einem normalen Schieberegister müsste man ständig bei D neue Daten eingeben, während beim Ringschieberegister die einmal gespeicherten Bits erhalten bleiben und nur ihren Platz wechseln. Die Registrierung der Daten bei einem solchen Ringschieberegister erfolgt zweckmäßigerweise über die Setz- bzw. Rücksetzeingänge. Es ist aber auch eine Registrierung über die J- und K-Eingänge möglich. Nur muss in diesem Fall für die Zeit der Dateneingabe die Verbindung zwischen Q0 und R unterbrochen werden, da Ausgänge generell nicht zusammengeschaltet werden dürfen. Diese Trennung kann z.B. über eine Verknüpfungs­schaltung geschehen.\n\nUm eine Vereinfachung der Schaltung zu erreichen, hat man für das Schieberegister ein Schaltsymbol entworfen, ebenso für das Ring­schieberegister.\n\n" }, { "id": "8y3hdIoQo", "type": "image", "content": 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" }, { "id": "ZPHf5FYjP", "type": "markdown", "content": "An den Takteingang T wird der Takt angelegt. Die Daten werden über den Dateneingang D in die Register a3, a2, a1 und a0 geschoben und können an den Ausgängen Q3, Q2, Q1 und Q0 bzw. ¬Q0 abgegriffen werden. Mit dem Rücksetzeingang R kann das gesamte Register gelöscht werden.\n\n" }, { "id": "0PaAip9HQ", "type": "image", "content": 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" } ] }, { "id": "OEP1agbGg7", "name": "Volladdierer", "sections": [ { "id": "H-eLP7kNAj", "type": "markdown", "content": "# Volladdierer\n\nEin Volladdierer ist eine Schaltung, die zwei Dualzahlen zusammenzählt. Dabei beginnt er bei der letzten Stelle, genau so, wie eine Addition “von Hand“ ausgeführt wird. Hier ein kleines Beispiel:\n\n\nDie Dualzahlen `a3a2a1a0` und `b3b2b1b0` sollen addiert werden.\n" }, { "id": "bbKLVj_hm", "type": "image", "content": "data:image/png;base64,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" }, { "id": "e5edWn-aG", "type": "markdown", "content": "\nDie Dualzahlen werden untereinander geschrieben. Danach wird die Summe aus a0 + b0 gebildet und der Übertrag Ü1 unter a1 und b1 geschrieben. So läuft die Addition weiter bis zum Übertrag Ü4, der vor die Summen S3 S2 S1 S0 gesetzt wird.\n\n\nDabei kann der Volladdierer (VA) nur zwei einstellige Dualzahlen addieren, wodurch ein kleiner Kunstgriff nötig wird um größere Dualzahlen zu addieren. Doch dazu später mehr.\n\nZuerst stellt sich die Frage: Wie werden Dualzahlen eigentlich addiert? Dabei gelten natürlich genau wie bei der Addition im Dezimalsystem auch bestimmte Regeln. Diese sind in der Logik-Tafel abgebildet. Dabei stellt A eine zu addierende Variable dar, B die andere. Diese beiden Werte A und B werden also zu der Summe S und dem Übertrag Ü zusammengefasst.\n\n\n| A | B | S | Ü |\n|---------|---------|---------|---------|\n| 0 | 0 | 0 | 0 |\n| 0 | 1 | 1 | 0 |\n| 1 | 0 | 1 | 0 |\n| 1 | 1 | 0 | 1 |\n\nEin Volladdierer besteht eigentlich aus zwei Halbaddierern, die zwei einstellige Dualzahlen addieren können, jedoch ohne Übertrag. Durch die Zusammenschaltung dieser beiden Halbaddierer ist es möglich, eine Summe samt Übertrag zu bilden. Da die Volladdierer aber als fertige ICs angeboten werden, empfiehlt es sich, diese zu verwenden.\n\n\nDoch nun zu dem vorher angesprochenen Problem. Wie sieht eine Volladdierer-Schaltung aus, mit der man zwei vierstellige Dualzahlen summieren kann?\n\nBei diesem Problem hilft uns wiederum das Schieberegister. Wenn man die Register mit den schon gespeicherten Daten an einen VA in der angegebenen Weise anschliesst, so stehen pro Taktimpuls immer nur zwei Werte der beiden Dualzahlen zur Addition zur Verfügung. Es beginnt mit den beiden Werten a0 und b0. Diese werden nun in den VA eingegeben, der sie addiert. Am Ausgang S steht dann die Summe dieser beiden Zahlen und am Ausgang Ü der Übertrag. Bei einem erneuten Taktimpuls gelangen nun die beiden Dualwerte a1 und b1, die ja nach dem letzten Taktimpuls den Platz von a0 und b0 eingenommen haben, an den VA.\n\n\nDas JK-Flipflop unterhalb der Schieberegister, das vor diesem Taktimpuls den Wert Ü1 am Eingang hatte, hat nun den Wert Ü1 am Ausgang Q. Dieser Ausgang Q ist nun mit einem weiteren Eingang C des VA verbunden. Es liegen also an den Eingängen des Volladdierers die Werte a1 (an A), b1 (an B) und Ü1 an C. Diese werden wiederum addiert und erscheinen als Summe S und als Übertrag Ü an dessen Ausgängen.\n\nZuvor wurde jedoch der Ausgang S des VA mit dem J-Eingang des Serienaddierers verbunden. Nachdem nun die Summe a0 + b0 gebildet wurde und ein erneuter Taktimpuls die Werte a3, a2 und a1 um eine Stelle weiter nach rechts geschoben hat (ebenso die Werte b3, b2 und b1), sind in den Schieberegistern folgende Werte gespeichert.\n\n\n Register A: X, a3, a2, a1\n Register B: S0, b3, b2, b1\n \nIn dem JK-Flipflop befindet sich der Übertrag Ü1.\n\nNun tritt die erneute Addition der Variablen an A, B und C des VA auf. Es wird also die Summe a1 + b1 + Ü1 gebildet. Dabei wird die Summe S1 gebildet, die wiederum am J-Eingang des unteren Schieberegisters anliegt und bei einem erneuten Taktimpuls als Information aufgenommen wird. Der Übertrag Ü2, der bei der Addition entsteht und an den J-Eingang des Flipflops gelegt wird, wird auch von diesem beim nächsten Impuls aufgenommen und erscheint dann am Ausgang Q um von dort bei einer erneuten Addition übernommen zu werden.\n\nEs befinden sich also jetzt folgende Werte in den Registern:\n\n\n Register A: X, X, a3, a2\n Register B: S1, S0, b3, b2\n \nIn dem JK-Flipflop befindet sich der Übertrag Ü2.\n \nBei einem erneuten Taktimpuls wird die Summe der Werte a2, b2 und Ü2 gebildet. Es erscheint dann am Ausgang S des VA die gebildete Summe S2 und der Übertrag Ü3.\n\n\nDiese Art der Addition wird so weit fortgesetzt bis sämtliche Variablen addiert sind. Nachdem die letzte Summierung geschehen ist und die letzte Summe in dem unteren Schieberegister abgespeichert wurde, sind die Werte wie folgt in den Registern:\n\n\n Register A: X, X, X, X\n Register B: S3, S2, S1, S0\n\n\nIn dem JK-Flipflop befindet sich der Übertrag Ü4.\n\nDer Übertrag Ü4 kann nun aus dem JK-Flipflop entnommen werden und vor die Summe S3, S2, S1, S0 gesetzt werden. Der Sachverhalt der Verschiebung innerhalb des Registers und die Addition der einzelnen Variablen zu einer Summe S und dem Übertrag Ü ist in der folgenden Tabelle noch einmal zusammengefasst.\n\n\n**Schieberegister A**\n\n| t |Stelle 3 |Stelle 2 |Stelle 1| Stelle 0|\n|:-------:|:-------:|:-------:|:------:|:-------:|\n| 0 | a3 | a2 | a1 | a0 |\n| 1 | x | a3 | a2 | a1 |\n| 2 | x | x | a3 | a2 |\n| 3 | x | x | x | a3 |\n| 4 | x | x | x | x |\n\n\n\n\n**Schieberegister B**\n\n| t |Stelle 3 |Stelle 2 |Stelle 1| Stelle 0|\n|:-------:|:-------:|:-------:|:------:|:-------:|\n| 0 | b3 | b2 | b1 | b0 |\n| 1 | S0 | b3 | b2 | b1 |\n| 2 | S1 | S0 | b3 | b2 |\n| 3 | S2 | S1 | S0 | b3 |\n| 4 | S3 | S2 | S1 | S0 |\n\n\n\n**JK-FlipFlop**\n\n| t |Stelle 3 |\n|:-------:|:-------:|\n| 0 | X |\n| 1 | Ü1 |\n| 2 | Ü2 |\n| 3 | Ü3 |\n| 4 | Ü4 |\n\n\nDas obere Schieberegister A, das untere B, das JK-Flipflop und der Volladdierer bilden zusammen eine Einheit. Da diese Schaltung mehrere Variablen, also eine “Serie von Bits“, addieren kann, nennt man diese Schaltung auch einen Serienaddierer.\n" }, { "id": "Mmv7ozHb0", "type": "image", "content": 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" }, { "id": "wkxiqqY6R", "type": "markdown", "content": "\n\nDer Takt T, der an den beiden Schieberegistern und dem Flipflop liegt muss an den Eingang T angelegt werden. Weiterhin müssen die dualen Zahlen a3a2a1a0 und b3b2b1b0 über die Setz- und Rücksetzeingänge in die Register geladen werden. Diese Eingänge sind hier der Übersicht wegen nicht eingezeichnet.\nWenn die Schaltung aufgebaut und in Betrieb genommen wird, empfiehlt es sich zuerst Einzelimpulse an den Takteingang T zu legen. So kann die Schaltung Schritt für Schritt beobachtet und kontrolliert werden. Danach ist ein Betrieb mit höherer Taktfrequenz möglich.\n\n\n" } ] } ] }