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Transcript
CSE 111
Representing Numeric Data in a
Computer
Slides adapted from Dr. Kris
Schindler
Unsigned Binary Numbers
Range: 02n-1
where n is the number of bits
Positional Notation
P
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W
e
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n
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5
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1
0
n
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6
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1
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2
b
b
n
1
n
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b
b
b
b
b
b
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4
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2
1
0
Example: 101100two
0
1
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n
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2
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1
b
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2
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b
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2
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b
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b
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b
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0
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n
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
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0
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4
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0
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16
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1

32

4
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8
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32

4
Unsigned Binary Numbers
How do we convert from a decimal number to
a binary number?
i / 2  q 0 , r0
b 0  r0
q 0 / 2  q 1 , r1
b 1  r1
q 1 / 2  q 2 , r2
b 2  r2
...
...
where
i  Decimal Number
b k  Binary Bit k
q x  Quotient
r  Re mainder
Binary
Number
Continue until q=0
 b n ... b 2 b 1 b 0
Unsigned Binary Numbers
How do we convert from a decimal number to
a binary number?
Example: 39ten
39 / 2  19 ,1
19 / 2  9 ,1
9 / 2  4 ,1
4 / 2  2 ,0
2 / 2  1, 0
1 / 2  0 ,1
39
ten
b0  1
b1  1
b2  1
b3  0
b4  0
b5  1
 100111
two
Bit Positions
MSB
Most Significant Bit
Leftmost Bit Position
LSB
Least Significant Bit
Rightmost Bit Position
Signed Binary Numbers
The most significant bit (leftmost) represents
the sign
Negative (-): 1
Positive (+): 0
Signed Binary Numbers
Computers represent signed numbers using two’s
complement notation
Signed Binary Numbers
Two’s Complement
Representation of a negative binary number
Consider an n-bit number, x
The two’s complement of the number is 2n - x
This process is called taking the two’s complement of a number
Taking the two’s complement of a number negates it
Signed Binary Numbers
Two’s Complement
Shortcut for taking the two’s complement of a number
Start at the least significant (rightmost) bit and move left (toward the
most significant bit)
Keep every bit until you reach the first 1
Keep that 1
Invert every bit (01,1  0) after the first 1 as you continue to
move left
Signed Binary Numbers
Two’s Complement
Examples:
-4
 Take the two’s complement of 4 (00000100)
 11111100 = -4
-9
 Take the two’s complement of 9 (00001001)
 11110111 = -9
Since the above are negative, taking the two’s complement will
allow you to determine the magnitude, which is the positive
equivalent
Signed Binary Numbers
Two’s Complement
Examples:
+6
 Since the number is positive, you don’t need to take the two’s
complement
 000000110 = +6
+18
 Since the number is positive, you don’t need to take the two’s
complement
 000010010 = +18
Signed Binary Numbers
Two’s Complement
Since taking the two’s complement of a number negates it,
taking the two’s complement twice gives you the original
number back
Example:
+12 is represented by 00001100
Taking the two’s complement results in -12 (11110100)
Taking the two's complement of -12 results in +12 (00001100)
Floating Point
Very large/small numbers
Fractions
Example
8.5 x
223
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X
2
100.12 x 223
Normalized
 1.0012 x 227
Exponent
 Bias = 127
 127+26 = 153 = 100110012
Significand: 00100000000000000000000
Sign: 0
Number: 01001000100100000000000000000000
References
 J.
Glenn Brookshear, Computer Science - An
Overview, 11th edition, Addison-Wesley as an
imprint of Pearson, 2012
Donald D. Givone, Digital Principles and
Design, McGraw-Hill, 2003
John L. Hennessy and David A. Patterson,
Computer Organization and Design, The
Hardware/Software Interface, 3rd Edition,
Morgan Kaufmann Publishers, Inc., 2005