cmp 100 introduction to computing lecture binary numbers & logic operations
TRANSCRIPT
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CMP 100 Introduction to Computing
LectureBinary Numbers & Logic Operations
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Learning Goals for Today
1. To become familiar with number system used by the microprocessors - binary numbers
2. To become able to perform decimal-to-binary conversions
3. To understand the NOT, AND, OR and XOR logic operations – the fundamental operations that are available in all microprocessors
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BINARY(BASE 2)
numbers
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DECIMAL(BASE 10)
numbers
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Decimal (base 10) number system consists of 10 symbols or digits
0 1 2 3 4
5 6 7 8 9
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Binary (base 2) number system consists of just two
0 1
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Other popular number systems
• Octal– base = 8– 8 symbols (0,1,2,3,4,5,6,7)
• Hexadecimal– base = 16– 16 symbols (0,1,2,3,4,5,6,7,8,9,A,B,C,D,E,F)
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Decimal (base 10) numbers are expressed in the positional notation
4202 = 2x100 + 0x101 + 2x102 + 4x103
The right-most is the least significant digit
The left-most is the most significant digit
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Decimal (base 10) numbers are expressed in the positional notation
4202 = 2x100 + 0x101 + 2x102 + 4x103
1’s multiplier
1
![Page 10: CMP 100 Introduction to Computing Lecture Binary Numbers & Logic Operations](https://reader035.vdocuments.mx/reader035/viewer/2022062804/5697bf7c1a28abf838c83f14/html5/thumbnails/10.jpg)
Decimal (base 10) numbers are expressed in the positional notation
4202 = 2x100 + 0x101 + 2x102 + 4x103
10’s multiplier
10
![Page 11: CMP 100 Introduction to Computing Lecture Binary Numbers & Logic Operations](https://reader035.vdocuments.mx/reader035/viewer/2022062804/5697bf7c1a28abf838c83f14/html5/thumbnails/11.jpg)
Decimal (base 10) numbers are expressed in the positional notation
4202 = 2x100 + 0x101 + 2x102 + 4x103
100’s multiplier
100
![Page 12: CMP 100 Introduction to Computing Lecture Binary Numbers & Logic Operations](https://reader035.vdocuments.mx/reader035/viewer/2022062804/5697bf7c1a28abf838c83f14/html5/thumbnails/12.jpg)
Decimal (base 10) numbers are expressed in the positional notation
4202 = 2x100 + 0x101 + 2x102 + 4x103
1000’s multiplier
1000
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Binary (base 2) numbers are also expressed in the positional notation
10011 = 1x20 + 1x21
+ 0x22 + 0x23
+ 1x24
The right-most is the least significant digit
The left-most is the most significant digit
![Page 14: CMP 100 Introduction to Computing Lecture Binary Numbers & Logic Operations](https://reader035.vdocuments.mx/reader035/viewer/2022062804/5697bf7c1a28abf838c83f14/html5/thumbnails/14.jpg)
Binary (base 2) numbers are also expressed in the positional notation
10011 = 1x20 + 1x21
+ 0x22 + 0x23
+ 1x24
1’s multiplier
1
![Page 15: CMP 100 Introduction to Computing Lecture Binary Numbers & Logic Operations](https://reader035.vdocuments.mx/reader035/viewer/2022062804/5697bf7c1a28abf838c83f14/html5/thumbnails/15.jpg)
Binary (base 2) numbers are also expressed in the positional notation
10011 = 1x20 + 1x21
+ 0x22 + 0x23
+ 1x24
2’s multiplier
2
![Page 16: CMP 100 Introduction to Computing Lecture Binary Numbers & Logic Operations](https://reader035.vdocuments.mx/reader035/viewer/2022062804/5697bf7c1a28abf838c83f14/html5/thumbnails/16.jpg)
Binary (base 2) numbers are also expressed in the positional notation
10011 = 1x20 + 1x21
+ 0x22 + 0x23
+ 1x24
4’s multiplier
4
![Page 17: CMP 100 Introduction to Computing Lecture Binary Numbers & Logic Operations](https://reader035.vdocuments.mx/reader035/viewer/2022062804/5697bf7c1a28abf838c83f14/html5/thumbnails/17.jpg)
Binary (base 2) numbers are also expressed in the positional notation
10011 = 1x20 + 1x21
+ 0x22 + 0x23
+ 1x24
8’s multiplier
8
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Binary (base 2) numbers are also expressed in the positional notation
10011 = 1x20 + 1x21
+ 0x22 + 0x23
+ 1x24
16’s multiplier
16
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Counting in Decimal0123456789
10111213141516171819
20212223242526272829
30313233343536...
01
1011
100101110111
10001001
101010111100110111101111
10000100011001010011
10100101011011010111110001100111010110111110011101
1111011111
100000100001100010100011100100
.
.
.
Counting in Binary
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Why binary?Because this system is natural for digital computers
The fundamental building block of a digital computer – the switch – possesses two natural states, ON & OFF.
It is natural to represent those states in a number system that has only two symbols, 1 and 0, i.e. the binary number system
In some ways, the decimal number system is natural to us humans. Why?
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bitbinary diginary digit
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Byte = 8 bits
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Decimal Binary conversion
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Convert 75 to Binary75237 1218 129 024 122 021 020 1
1001011
remainder
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Check
1001011 = 1x20 + 1x21
+ 0x22 + 1x23
+
0x24 + 0x25
+ 1x26
= 1 + 2 + 0 + 8 + 0 + 0 + 64
= 75
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Convert 100 to Binary100250 0225 0212 126 023 021 120 1
1100100
remainder
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That finishes our first topic - introduction to binary numbers and their conversion to and from decimal numbers
Our next topic is …
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Boolean Logic
Operations
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Let x, y, z be Boolean
variables. Boolean variables can only have binary values i.e., they can have values which are either 0 or 1
For example, if we represent the state of a light switch with a Boolean variable x, we will assign a value of 0 to x when the switch is OFF, and 1 when it is ON
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A few other names for the states of these Boolean variables
0 1
Off On
Low High
False True
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We define the following logic operations or functions among the Boolean variables
Name Example Symbolically
NOT y = NOT(x) x´
AND z = x AND y x · y
OR z = x OR y x + y
XOR z = x XOR y x y
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We’ll define these operations with the help of truth tables
what is the truth table of a logic function
A truth table defines the output of a logic function for all possible inputs
?
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Truth Table for the NOT Operation(y true whenever x is false)
x y = x´0
1
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Truth Table for the NOT Operation
x y = x´0 1
1 0
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Truth Table for the AND Operation(z true when both x & y true)
x y z = x · y0 0
0 1
1 0
1 1
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Truth Table for the AND Operation
x y z = x · y0 0 0
0 1 0
1 0 0
1 1 1
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Truth Table for the OR Operation(z true when x or y or both true)
x y z = x + y0 0
0 1
1 0
1 1
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Truth Table for the OR Operation
x y z = x + y0 0 0
0 1 1
1 0 1
1 1 1
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Truth Table for the XOR Operation(z true when x or y true, but not both)
x y z = x y0 0
0 1
1 0
1 1
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Truth Table for the XOR Operation
x y z = x y0 0 0
0 1 1
1 0 1
1 1 0
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Those 4 were the fundamental logic operations. Here are examples of a few more complex situations
z = (x + y)´
z = y · (x + y)
z = (y · x) w
STRATEGY: Divide & Conquer
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x y x + y z = (x + y)´0 0 0 1
0 1 1 0
1 0 1 0
1 1 1 0
z = (x + y)´
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x y x + y z = y · (x + y)0 0 0 0
0 1 1 1
1 0 1 0
1 1 1 1
z = y · (x + y)
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x y w y · x z = (y · x) w
0 0 0 0 0
0 0 1 0 1
0 1 0 0 0
0 1 1 0 1
1 0 0 0 0
1 0 1 0 1
1 1 0 1 1
1 1 1 1 0
z = (y · x) w
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Number of rows in a truth table?
2n
n = number of input variables
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Assignment # 3
A. Convert the following into binary numbers:i. The last three digits of your roll numberii. 256
B. x, y & z are Boolean variables. Determine the truth tables for the following combinations:i. (x · y) + yii. (x y)´ + w
Consult the CS101 syllabus for the submission instructions & deadline
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What have we learnt today?
1. About the binary number system, and how it differs from the decimal system
2. Positional notation for representing binary and decimal numbers
3. A process (or algorithm) which can be used to convert decimal numbers to binary numbers
4. Basic logic operations for Boolean variables, i.e. NOT, OR, AND, XOR, NOR, NAND, XNOR
5. Construction of truth tables (How many rows?)
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What have we learnt today?
1. About the binary number system, and how it differs from the decimal system
2. Positional notation for representing binary and decimal numbers
3. A process (or algorithm) which can be used to convert decimal numbers to binary numbers
4. Basic logic operations for Boolean variables, i.e. NOT, OR, AND, XOR, NOR, NAND, XNOR
5. Construction of truth tables (How many rows?)