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Addition and Subtraction. Outline. Arithmetic Operations (Section 1.2) Addition Subtraction Multiplication Complements (Section 1.5) 1’s complement 2’s complement Signed Binary Numbers (Section 1.6) 2’s complement Addition Subtraction. Addition. 101101+100111 Rules
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Outline • Arithmetic Operations (Section 1.2) • Addition • Subtraction • Multiplication • Complements (Section 1.5) • 1’s complement • 2’s complement • Signed Binary Numbers (Section 1.6) • 2’s complement • Addition • Subtraction
Addition • 101101+100111 • Rules • Any carry obtained in a given significant position is used by the pair of digits one significant position higher
Subtraction • 101101-100111 • The borrow in a given significant position adds 2 to a minuend digit
Multiplication • 1011 X 101
Complement • 1’s complement • 2’s complement
1’s complement • Rule: 1’s complement of a binary number is formed by changing • 1’s to 0’s • 0’s to 1’s • 1011000→0100111 • 0101101 →
2’s Complement • Alternative Method • Write the 1’s complement • Add 000…1 to 1’s complement • Example • 1101100 • 0010011 (1’s complement) • 0010100 (2’s complement)
Unsigned Subtraction • X-Y • Determine Y’s 2’s complement • X+(2’s complement of Y) • If X is larger or equal to Y, an end carry will result. Discard the end carry. • If X is less than Y, no end carry will result. To obtain the answer in a familiar form, take the 2’s complement of the sum and place a negative sign in front.
Subtraction of Unsigned Number • Example 1.7 (2’s complement) • X=1010100 • Y=1000011 • X-Y (Discard end carry) • Y-X (No end carry)
Signed Binary Number • Signed-magnitude representation • Signed 1’s complement representation • Signed 2’s complement representation
Signed Magnitude Representation • Rules • Represent the sign in the leftmost position • 0 for positive • 1 for negative • Example • 01001↔(+)9 • 11001↔(-)9 • Used in ordinary arithmetic, but not in computer arithmetic
Interpretation • The user determines whether the number is signed or unsigned • 01001 • 9 (unsigned binary) • +9 (signed binary) • 11001 • 25 (unsigned binary) • -9 (signed binary)
Signed Complement System • A signed complement system negates a number by taking its complement • Example • 00001001 (9) • 11110110 (-)9 in signed 1’s complement • 11110111 (-)9 in signed 2’s complement • Usage: • 1’s complement: Seldom used • 2’s complement: Most common
Arithmetic Addition • The rule for adding signed numbers in 2’s complement form is obtained from addition of two numbers • A carry out of the sign bit is discarded • In order to obtain correct answer, we must ensure that the result has a sufficient number of bits to accommodate the sum • Useful Facts • Positive numbers have 0 in the leftmost bit • Negative numbers have a 1 in the leftmost bit
Negative Number • Determine the value of a negative number in signed 2’s complement by converting the number to a positive number to place it in a more familiar form • 11111001 is negative because the left most bit is 1. • 2’s complement: 00000111 (+7) • Therefore, 11111001 is -7