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Binary Addition Binary Multiplication. Section 4.5 and 4.7. Topics. Calculations Examples Signed Binary Number Unsigned Binary Number Hardware Implementation Overflow Condition Multiplication. Unsigned Number. (2-bit example). Unsigned Addition. 1+2=. Unsigned Addition. 1+3=.
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Binary AdditionBinary Multiplication Section 4.5 and 4.7
Topics • Calculations Examples • Signed Binary Number • Unsigned Binary Number • Hardware Implementation • Overflow Condition • Multiplication
Unsigned Number (2-bit example)
Unsigned Addition • 1+2=
Unsigned Addition • 1+3= (Indicates Overflow) (Carry Out)
Unsigned Subtraction (1) • 1-2= (1’s complement) (2’s complement)
Unsigned Subtraction (2) • 2-1=
Summary for Unsigned Addition/Subtraction • Overflow can be an issue in unsigned addition • Unsigned Subtraction (M-N) • If M≥N, and end carry will be produced. The end carry is discarded. • If M<N, • Take the 2’s complement of the sum • Place a negative sign in front
Signed Binary Numbers • 4-bit binary number • 1 bit is used as a signed bit • -8 to +7 • 2’s complement
Signed Addition (70+80) (Indicates a negative number) 70=21+22+26=2+4+64 80=24+26=16+64 10010110→01101001 →01101010 21+23+25+26=2+8+32+64=106 10010110↔-106 010010110 010010110↔ 21+22+24+27=2+4+16+128=150 Conclusion: There is a problem of overflow Fix: Use the end carry as the sign bit, and let b7 be the extra bit.
Signed Subtraction (70-80) (Indicates a negative number) 70=21+22+26=2+4+64 80=24+26=16+64 11110110→00001001 →00001010 21+23=10 11110110↔-10 (No Problem)
Signed Subtraction (-70-80) (Indicates a positive number! A negative number expected.) 70=21+22+26=2+4+64 80=24+26=16+64 101101010 →010010101 → 010010110 010010110 ↔21+22+24+27=2+4+16+128=150 101101010 ↔-150 Conclusion: There is a problem of overflow Fix: Use the end carry as the sign bit, and let b7 be the extra bit.
Observations • Given the similarity between addition and subtraction, same hardware can be used. • Overflow is an issue that needs to be addressed in the hardware implementation • A signed number is not processed any different from an unsigned number. The programmer must interpret the results of addition and subtraction appropriately.
The Mode Input (1) If M=0, = If M=1, = B0
The Mode Input (2) If M=0, If M=1,
M=0 B3 B2 B0 B1 0
M=1 1 2’s complement is generated of B is generated!
Unsigned Addition When two unsigned numbers are added, an overflow is detected from the end carry.
Detect Overflow in Signed Addition Observe The cary into the sign bit The carry out of the sign bit If they are not equal, they indicate an overflow.
Two-Bit Binary Multiplier (multiplicand) (multiplier)
Four-bit by three-bit Binary Multiplier S10=A0B1+A1B0 S11=A0B2+A1B1+C1 S12=A0B3+A1B2+C2 S13=0+A1B3+C3 (S1X, where 1 is the first 4-bit adder)