Modified from John Wakerly Lecture #2 and #3

1. Modified from John Wakerly Lecture #2 and #3 CMOS gates at the transistor level Boolean algebraCombinational-circuit analysis

2. CMOS NAND Gates • Use 2n transistors for n-input gate

3. CMOS NAND -- switch model

4. CMOS NAND -- more inputs (3)

5. Inherent inversion. • Non-inverting buffer:

6. 2-input AND gate:

7. CMOS NOR Gates • Like NAND -- 2n transistors for n-input gate

8. NAND NOR NAND vs. NOR • For a given silicon area, PMOS transistors are “weaker” than NMOS transistors. • Result: NAND gates are preferred in CMOS.

9. Boolean algebra • a.k.a. “switching algebra” • deals with boolean values -- 0, 1 • Positive-logic convention • analog voltages LOW, HIGH --> 0, 1 • Negative logic -- seldom used • Signal values denoted by variables(X, Y, FRED, etc.)

10. Boolean operators • Complement: X¢ (opposite of X) • AND: X × Y • OR: X + Y • Axiomatic definition: A1-A5, A1¢-A5¢ binary operators, describedfunctionally by truth table.

11. More definitions • Literal: a variable or its complement • X, X¢, FRED¢, CS_L • Expression: literals combined by AND, OR, parentheses, complementation • X+Y • P × Q × R • A + B × C • ((FRED × Z¢) + CS_L × A × B¢× C + Q5) × RESET¢ • Equation: Variable = expression • P = ((FRED × Z¢) + CS_L × A × B¢× C + Q5) × RESET¢

12. Logic symbols

13. Theorems • Proofs by perfect induction

14. More Theorems

15. Duality • Swap 0 & 1, AND & OR • Result: Theorems still true • Why? • Each axiom (A1-A5) has a dual (A1¢-A5¢) • Counterexample:X + X × Y = X (T9)X × X + Y = X (dual)X + Y = X (T3¢) X + (X×Y) = X (T9)X× (X + Y) = X (dual)(X× X) + (X× Y) = X (T8)X+ (X× Y) = X (T3¢) Remember about parentheses,operator precedence! This is wrong! IT IS NOT A CORRECT DUAL good

16. N-variable Theorems • Prove using finite induction • Most important: DeMorgan theorems

17. DeMorgan Symbol Equivalence

18. Likewise for OR • (be sure to check errata!)

19. DeMorgan Symbols

20. Even more definitions (Sec. 4.1.6) • Product term • Sum-of-products expression • Sum term • Product-of-sums expression • Normal term • Minterm (n variables) • Maxterm (n variables)

21. Truth table vs. minterms & maxterms

22. Combinational analysis

23. Signal expressions • Multiply out:F = ((X + Y¢) × Z) + (X¢× Y × Z¢) = (X × Z) + (Y¢× Z) + (X¢× Y × Z¢)

24. New circuit, same function

25. “Add out” logic function • Circuit: POS CIRCUIT

26. Shortcut: Symbol substitution You can use this method to write equations from schematics

27. Different circuit, same function You need tautology checking to compare functions of two schematics

28. Another example: factorization and conversion to NAND and NOR gates

29. Short Review of Exor Logic • A  A = 0 • A  A’ = 1 • A  1=A’ • A’  1=A • A  0=A • A  B= B  A • A B = B A • A(B  C) = AB  AC • A+B = A  B  AB • A+B = A  B when AB = 0 • A  (B  C) = (A  B)  C • (A B) C = A (B C) • A+B = A  B  AB = A B(1 A) = A  BA’ These rules are sufficient to minimize Exclusive Sum of Product expression for small number of variables We will use these rules in the class for all kinds of reversible, quantum, optical, etc. logic. Try to remember them or put them to your “creepsheet”.

30. Challenge Problems for ambitious students • Problem 2. Prove that A+B = A  B  AB • Problem 3 . Prove that A+B = A  B when AB = 0 • Problem 1. Express function AB+CD+A’C using only EXORs and AND gates Problem 4. Given are three functions of three inputs: A = NOT(a), B = NOT(b), C = NOT(c). You have only two inverters. You can have an arbitrary large set of two-input AND and OR gates. Realize these three functions with the gates that you have at your disposal. You cannot use other gates. You can use only two inverters. Draw the schematic of the solution