Boolean Algebra

Boolean Algebra NTU DSD (Digital System Design) 2007

NOT Operation • The NOT operation (or inverse, or complement operation) replaces a Boolean value with its complement: • 0’ = 1 • 1’ = 0 • A’ is read as NOT A or Complement A • Boolean representationF(A) = A’ = A • Truth Table A A’ A A’ 0 1 1 0 Inverter symbol Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

AND Operation • The AND operation is a function of two variables (A, B) • Boolean function representation F(A,B) = A • B = A * B = AB • When both A and B are ‘1’, then F is ‘1’ 0 • 0 = 0 0 • 1 = 0 1 • 0 = 0 1 • 1 = 1 • Truth Table A B Y A Y 0 0 0 0 1 0 1 0 0 B 1 1 1 and symbol Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

OR Operation • The OR operation is a function of two variables (A, B) • Boolean function representationF(A,B) = A + B • When either A or B are ‘1’, then F is ‘1’ 0 + 0 = 0 0 + 1 = 1 1 + 0 = 1 1 + 1 = 1 • Truth Table A B Y A Y 0 0 0 0 1 1 1 0 1 B 1 1 1 or symbol Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

XOR Operation • XOR gate is usual in logic circuits that do binary addition/subtraction. • Note that: • F = A  B = A’B + AB’ A B Y 0 0 0 0 1 1 1 0 1 1 1 0 Y=A  B A B Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Boolean Functions • More complex Boolean functions can be created by combining basic operations A A’ F(A,B) = A’ + B B A B A’ F(A,B) = A’ + B 0 0 1 1 0 1 1 1 1 0 0 0 1 1 0 1 Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

7408 – Quad 2-Input AND Gate IC • 7432 – Quad 2-Input OR Gate IC Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

7404 – Hex Inverter • 7486 – Quad 2-Input Exclusive-OR Gate IC Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Laws and Theorems of Boolean Algebra • 單變數定理(Single Variables Theorem) • Identity • X + 0 = X • X * 1 = X • Null Element • X + 1 = 1 • X * 0 = 0 • Idempotent Theorem • X + X = X • X * X = X • Theorem of Complementarity • X + X’ = 1 • X * X’ = 0 • Involution Theorem • (X’)’ = X Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Laws and Theorems of Boolean Algebra • 多變數定理(Multiple Variables Theorem) • Commutative law • X + Y = Y + X • XY = YX • Associative law • (X + Y) + Z = X + (Y + Z) = X + Y + Z • (XY)Z = X(YZ) = XYZ • Distributive law • X(Y + Z) = XY + XZ • X + (YZ) = (X + Y)(X + Z) • Simplification theorems • XY + XY’ = X (uniting) • X + XY = X (absorption) • (X + Y’)Y = XY • (X + Y)(X + Y’) = X • X(X + Y) = X • XY’ + Y = X + Y • Consensus theorem • XY + X’Z + YZ = XY + X’Z • (X + Y)(X’ + Z)(Y + Z) = (X + Y)(X’ + Z) Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Proof of The Consensus Theorem • XY + X’Z + YZ = XY + X’Z • XY + X’Z + YZ = XY + X’Z + 1·YZ = XY + X’Z + (X + X’)YZ = XY + X’Z + XYZ + X’YZ = XY + XYZ + X’Z + X’YZ = XY(1 + Z) + X’Z(1 + Y) = XY·1 + X’Z·1 = XY + X’Z Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Boolean Algebra and Truth Table • 利用真值表證明兩邊的式子 • 範例： • 證明 x•(y + z) = (x • y) + (x • z) • x(y + z) = xy + xz Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Simplification / Minimization (簡化) • Simplification or Minimization tries to reduce the number of terms in a Boolean equation via use of basic theorems • A simpler equation will mean: • Less gates will be needed to implement the equation • Could possibly mean a faster gate-level implementation • Will use algebraic techniques at first for simplification • Graphical method called K-maps • Computer methods for simplification are widely used in industry Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Minimization Example • Example: full adder's carry out function • Cout = A' B Cin + A B' Cin + A B Cin' + A B Cin= A' B Cin + A B' Cin + A B Cin' + A B Cin + A B Cin= (A' + A) B Cin + A B' Cin + A B Cin' + A B Cin= (1) B Cin + A B' Cin + A B Cin' + A B Cin= B Cin + A B' Cin + A B Cin' + A B Cin + A B Cin= B Cin + A (B' + B) Cin + A B Cin' + A B Cin= B Cin + A (1) Cin + A B Cin' + A B Cin= B Cin + A Cin + A B (Cin' + Cin)= B Cin + A Cin + A B (1)= B Cin + A Cin + A B Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Computation in Digital Logic Circuit NTU DSD (Digital System Design) 2007

Half Adder / Full Adder • S = A’B + AB’ • Cout = AB Full Adder Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Full Adder with Truth Table • S = A’B’Cin + A’BCin’ + ABCin + AB’Cin’ = A’(B’Cin + BCin’) + A(B’Cin’ + BCin) = A’(B ⊕ C) + A(B ⊕ C)’ = A⊕(B⊕Cin) = (A⊕B)⊕Cin • Cout = A’BCin + AB’Cin + ABCin’ + ABCin = BCin + ACin + AB • F = A  B = A’B + AB’ Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Circuit of Full Adder • S = A⊕B⊕Cin = (A⊕ Cin)⊕B • Cout = AB + BCin + ACin Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Behavior Level of Full Adder in Verilog Code module full_adder (a, b, ci, s, co); input a, b, ci; output s, co; assign s = a ^ b ^ ci; assign co = (a & b) | (a & ci) | (b & ci); endmodule Gate Level of Full Adder in Verilog & VHDL Code LIBRARY ieee; USE ieee.std_logic_1164.ALL; ENTITY full_add IS PORT( a : IN STD_LOGIC; b : IN STD_LOGIC; c_in : IN STD_LOGIC; sum : OUT STD_LOGIC; c_out : OUT STD_LOGIC); END full_add; ARCHITECTURE behv OF full_add IS BEGIN sum <= a XOR b XOR c_in; c_out <= (a AND b) OR (c_in AND (a OR b)); END behv; module full_adder (a, b, ci, s, co); input a, b, ci; output s, co; wire NET1, NET2, NET3, NET4 ; xor ( NET1, a, b ); xor ( s , NET1, ci ); and ( NET2, a, b ); and ( NET3, a, ci ); and ( NET4, b, ci ); or ( co, NET2, NET3, NET4 ); endmodule Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Verilog Code of 4-Bit Adder module full_adder (a, b, ci, s, co); input a, b, ci; output s, co; assign s = a ^ b ^ ci; assign co = (a & b) | (a & ci) | (b & ci); endmodule module f_fadder (a, b, s, co); input [3:0] a; input [3:0] b; output [3:0] s; output co; wire net1, net2, net3; full_adder f1(a[0],b[0],0,s[0],net1); full_adder f2(a[1],b[1],net1,s[1],net2); full_adder f3(a[2],b[2],net2,s[2],net3); full_adder f4(a[3],b[3],net3,s[3],co); endmodule Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Answer of Quiz 1 1) Please complete this truth table 2014/9/5 Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/ 21

Answer of Quiz 2 2) Please design an 8-bit adder by drawing block diagram, schematic and related Verilog code 2014/9/5 Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/ 22

Answer of Quiz 2 module full_adder (a, b, ci, s, co); input a, b, ci; output s, co; assign s = a ^ b ^ ci; assign co = (a & b) | (a & ci) | (b & ci); endmodule module f_fadder (a, b, s, co); input [7:0] a; input [7:0] b; output [7:0] s; output co; wire net1, net2, net3, net4, net5, net6, net7; full_adder f1(a[0],b[0],0,s[0],net1); full_adder f2(a[1],b[1],net1,s[1],net2); full_adder f3(a[2],b[2],net2,s[2],net3); full_adder f4(a[3],b[3],net3,s[3],net4); full_adder f5(a[4],b[4],net4,s[4],net5); full_adder f6(a[5],b[5],net5,s[5],net6); full_adder f7(a[6],b[6],net6,s[6],net7); full_adder f8(a[7],b[7],net7,s[7],co); endmodule 2014/9/5 Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/ 23

Basic Input / Output Device Input Devices NTU DSD (Digital System Design) 2007

Logic Switch Circuit High Input Resistance Logic Levels 1 Open Closed Open 0 Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Normally Open / Closed Pushbutton Press Release Press Release 1 1 Closed Open Closed Open Closed Open 0 0 Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Example 4x4 Keypad Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

1 1 1 0 1 1 1 1 0 1 0 1 1 1 1 1 0 1 1 1 Keyboard Scan Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

0 0 0 1 0 0 0 0 1 0 1 0 0 0 0 0 1 0 0 0 Keyboard Scan Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

PS/2 Keyboard Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Make Code & Break Code Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Button Bounce Analog Waveform Digital Waveform Debounce Jackie Kan - 2007 (jackiekan@LinTon.1D24H.com/jackiekan@csie.ntu.edu.tw) http://linton.1d24h.com/~jackiekan/

Boolean Algebra

Boolean Algebra

Presentation Transcript

BOOLEAN ALGEBRA

Boolean Algebra

Boolean Algebra

Boolean Algebra

Boolean Algebra

Boolean Algebra

BOOLEAN ALGEBRA

Boolean Algebra

Boolean Algebra

Boolean Algebra

Boolean algebra

Boolean algebra

Boolean Algebra

Boolean Algebra

BOOLEAN ALGEBRA

Boolean Algebra

Boolean Algebra

Boolean Algebra

Boolean Algebra

Boolean Algebra

Boolean Algebra

Boolean Algebra