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Number System - Computer Fundamental - IndianTechnoEra

what is number system?
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NUMBER SYSTEM

A numeral system is a writing system for expressing numbers; that is, a mathematical notation for representing numbers of a given set, using digits or other symbols in a consistent manner. The same sequence of symbols may represent different numbers in different numeral systems.

Two types of number systems are:

  • Non-positional number systems
  • Positional number systems


1. NON-POSITIONAL NUMBER SYSTEMS

Characteristics

  • Use symbols such as i for 1, ii for 2, iii for 3, iiii for 4, iiiii for 5, etc.
  • Each symbol represents the same value regardless of its position in the number.
  • The symbols are simply added to find out the value of a particular number.

 

Difficulty

  • It is difficult to perform arithmetic with such a number system.

 

2. POSITIONAL NUMBER SYSTEMS

  • The value of each digit is determined by:
    • The digit itself
    • The position of the digit in the number
    • The base of the number system

(base = total number of digits in the number system)

  • The maximum value of a single digit is always equal to one less than the value of the base

Characteristics

  • Use only a few symbols called digits.
  • These symbols represent different values depending on the position they occupy in the number.

 

DECIMAL NUMBER SYSTEM

Characteristics

  • A positional number system has 10 symbols or digits (0, 1, 2, 3, 4, 5, 6, 7, 8, 9). Hence, its base = 10.
  • The maximum value of a single digit is 9 (one less than the value of the base).
  • Each position of a digit represents a specific power of the base (10)
  • We use this number system in our day-to-day life.

Example

258610 = (2 x 103) + (5 x 102) + (8 x 101) + (6 x 100)

= 2000 + 500 + 80 + 6

 

BINARY NUMBER SYSTEM

Characteristics

  • A positional number system has only 2 symbols or digits (0 and 1). Hence its base = 2.
  • The maximum value of a single digit is 1 (one less than the value of the base).
  • Each position of a digit represents a specific power of the base (2).
  • This number system is used in computers.

Example

10101= (1 x 24) + (0 x 23) + (1 x 22) + (0 x 21) x (1 x 20)

= 16 + 0 + 4 + 0 + 1

= 2110

Representing numbers in different number systems

In order to be specific about which number system we are referring to, it is a common practice to indicate the base as a subscript. Thus, we write:

10101= 2110

BIT (Binary digiT)

  • Bit stands for binary digit.
  • A bit in computer terminology means either a 0 or a 1.
  • A binary number consisting of n bits is called an n-bit number.

 

Characteristics

  • A positional number system has total 8 symbols or digits (0, 1, 2, 3, 4, 5, 6, 7). Hence, its base = 8.
  • The maximum value of a single digit is 7 (one less than the value of the base.
  • Each position of a digit represents a specific power of The base (8).

 

OCTAL NUMBER SYSTEMS

Since there are only 8 digits, 3 bits (23 = 8) are sufficient to represent any octal number in binary

Example

20578

= (2 x 83) + (0 x 82) + (5 x 81) + (7 x 80)

= 1024 + 0 + 40 + 7

= 107110

HEXADECIMAL NUMBER SYSTEM

Characteristics

  • A positional number system has total 16 symbols or digits (0, 1, 2, 3, 4, 5, 6, 7, 8, 9, a, b, c, d, e, f). Hence its base = 16.
  • The symbols a, b, c, d, e and f represent the decimal values 10, 11, 12, 13, 14 and 15 respectively.
  • The maximum value of a single digit is 15 (one less than the value of the base).
  • Each position of a digit represents a specific power of the base (16).
  • Since there are only 16 digits, 4 bits (24 = 16) are sufficient to represent any hexadecimal number in binary.

Example

1af16 = (1 x 162) + (a x 161) + (f x 160)

= 1 x 256 + 10 x 16 + 15 x 1

= 256 + 160 + 15

= 43110

 Number System

CONVERT A NUMBER'S BASE:

 Another base number to decimal base

Method

Step 1: determine the column (positional) value of each digit

Step 2: multiply the obtained column values by the digits in the corresponding columns

Step 3: calculate the sum of these products

Example

47068 = ?10

Common values multiplied by the corresponding digits

 

47068 = 4 x 83 + 7 x 82 + 0 x 81 + 6 x 80

= 4 x 512 + 7 x 64 + 0 + 6 x 1

= 2048 + 448 + 0 + 6

Sum of these products

= 250210

Base

 Decimal base to another base

Division-remainder method

  • Step 1: divide the decimal number to be converted by the value of the new base
  • Step 2: record the remainder from step 1 as the right most digit (least significant digit) of the new base number. 
  • Step 3: divide the quotient of the previous divide by the new bas
  • Step 4: record the remainder from step 3 as the next digit (to the left) of the new base number

Repeat steps 3 and 4, recording remainders from right to left, until the quotient becomes zero in step 3 note that the last remainder thus obtained will be the most significant digit (msd) of the new base number

Example

95210 = ?8

Solution:

8

952

Reminders

 

119

0

 

14

7

 

1

6

 

0

1

 

Hence, 95210 = 16708

 Some based to another based

  • Step 1: convert the original number to a decimal number (base 10)
  • Step 2: convert the decimal number so obtained to the new base number

Example

5456 = ?4

Solution:

Step 1: convert from base 6 to base 10

5456 = 5 x 62 + 4 x 61 + 5 x 60

= 5 x 36 + 4 x 6 + 5 x 1

= 180 + 24 + 5

= 20910

Step 2: convert 20910 to base 4

 

4

209

Reminders

 

52

1

 

13

0

 

3

1

 

0

3

Hence,           20910 = 31014

So,                  5456 = 20910 = 31014

Thus, 5456 = 31014

 

 

Shortcut method for converting:
 Binary number to its equivalent octal number

  • Step 1: divide the digits into groups of three starting from the right.
  • Step 2: convert each group of three binary digits to one octal digit using the method of binary to decimal conversion.

Example

11010102 = ?8

Step 1: divide the binary digits into groups of 3 starting from right

001     101     010

Step 2: convert each group into one octal digit

0012 = 0 x 22 + 0 x 21 + 1 x 20 = 1

1012 = 1 x 22 + 0 x 21 + 1 x 20 = 5

0102 = 0 x 22 + 1 x 21 + 0 x 20 = 2

Hence, 1101010= 1528

 

 Octal number to its equivalent binary number

  • Step 1: convert each octal digit to a 3 digit binary number (the octal digits may be treated as decimal for this conversion).
  • Step 2: combine all the resulting binary groups (of 3 digits each) into a single binary number.

Example

5628 = ?2

Step 1: convert each octal digit to 3 binary digits

58 = 1012, 68 = 1102, 28 = 0102

Step 2: combine the binary groups

5628 = 101/5         110/6           010/2

Hence, 5628 = 1011100102

 

 Binary number to hexadecimal number

  • Step 1: divide the binary digits into groups of four starting from the right
  • Step 2: combine each group of four binary digits to one hexadecimal digit

 

Example

1111012 = ?16

Step 1: divide the binary digits into groups of four starting from the right

0011               1101

Step 2: convert each group into a hexadecimal digit

00112 = 0 x 23 + 0 x 22 + 1 x 21 + 1 x 2= 310 = 316

11012 = 1 x 23 + 1 x 22 + 0 x 21 + 1 x 2= 310 = d16

Hence, 111101= 3d16

 

 Hexadecimal to its equivalent binary number 

  • Step 1: convert the decimal equivalent of each hexadecimal digit to a 4 digit binary number.
  • Step 2: combine all the resulting binary groups (of 4 digits each) in a single binary number.

Example

2ab16 = ?2

  • Step 1: convert each hexadecimal digit to a 4 digit binary number

216 = 210 = 00102

A16 = 1010 = 10102

B16 = 1110 = 10112

 

  • Step 2: combine the binary groups

2ab16 = 0010/2           1010/a               1011/b

Hence, 2ab16 = 0010101010112ractional numbers

 

10. FRACTIONAL NUMBERS 

Fractional numbers are formed same way as decimal number system

In general, a number in a number system with base Would be written as:

Aan-1… a. A-1 a-2 … a-m

And would be interpreted to mean:

An x bn + an-1 x bn-1 + … + a0 x b0 + a-1 x b-1 + a-2 x b-2 + … + a-m x b-m

The symbols an, an-1, …, a-m in above representation should be one of the symbols allowed in the number system

 

Formation of fractional & binary number system 

Binary point

Position          4          3          2          1          0          .           -1         -2         -3         -4

Position value

24                  23                  22                  21                  20                                          2-1                 2-2                 2-3                 2-4

Quantity represented

 

16        8          4          2          1                      ½                     1/4                1/8                1/16

Example

110.1012 = 1 x 22 + 1 x 21 + 0 x 20 + 1 x 2-1 + 0 x 2-2 + 1 x 2-3

= 4 + 2 + 0 + 0.5 + 0 + 0.125

= 6.62510

Number system (example)

Octal point

Position          3          2          1          0          .           -1         -2         -3

Position value

83                  82                  81                  80                  .                        8-1                 8-2                 8-3

Quantity represented

512     64        8          1                      1/8                1/64              1/512

 

Example

127.548

= 1 x 82 + 2 x 81 + 7 x 80 + 5 x 8-1 + 4 x 8-2

= 64 + 16 + 7 + 5/8 + 4/64

= 87 + 0.625 + 0.0625

= 87.687510

  

Key words/phrases

  • Base
  • Least significant digit (lsd)
  • Binary number system
  • Memory dump
  • Binary point
  • Most significant digit (msd)
  • Bit
  • Non-positional number
  • Decimal number system
  • System
  • Division-remainder technique
  • Number system
  • Fractional numbers
  • Octal number system
  • Hexadecimal number system
  • Positional number system

Questions from this unit:

    What is number system?
    How many types of number system?
    What is non-positional number system?
    What are characteristic of non-positional number system?
    What are difficulties of non-positional number system?
    What is positional number system?
    What are characteristic of positional number system?
    What are difficulties of positional number system?
    How many types of representation of number system?
    What decimal number system?
    What is binary number system?
    What is octal number system?
    What is hexadecimal number system?
    What is ASCII code?
    What is BIT?
    What is full form of bit?
    What is binary digit?
    What is the characteristic of binary digit?
    How to convert number base?
    How to convert another number base into decimal base?
    How to convert decimal number base into another base?
    How to convert some based to another based?
    How to convert binary number to its equivalent octal number?
    How to convert octal number to its equivalent binary number?
    How to convert binary number to hexadecimal number?
    How to convert hexadecimal to its equivalent binary number?
    What is fractional numbers?
    What is formation of fractional & binary number system?


                                                          تعليقان (2)

                                                          1. #include

                                                            int main()
                                                            {
                                                            int letter;
                                                            printf("Enter any small letter; \n");
                                                            scanf("%d",&letter);

                                                            switch(letter)
                                                            {
                                                            case 1:
                                                            printf("Averngers. \n");
                                                            break;

                                                            case 2:
                                                            printf("Batsman. \n");
                                                            break;

                                                            case 3:
                                                            printf("chaio. \n");
                                                            break;

                                                            case 4:
                                                            printf("Dum. \n");
                                                            break;
                                                            case 5:
                                                            printf("Ester. \n");
                                                            break;

                                                            case 6:
                                                            printf("Fear. \n");
                                                            break;

                                                            case 7:
                                                            printf("Good Father. \n");
                                                            break;

                                                            case 8:
                                                            printf("Hitman. \n");
                                                            break;
                                                            case 9:
                                                            printf("Iron Man. \n");
                                                            break;

                                                            case 10:
                                                            printf("Jaguarrr. \n");
                                                            break;
                                                            default: printf("Pleas enter the number between 1 to 10!");

                                                            }

                                                            ret…
                                                          2. To run java in command prompt

                                                            if you created a java file with name 'Hello.java'
                                                            then follow the given steps:

                                                            1. open cmmand prompt at your existing java file
                                                            2. run 'javac Hello.java'
                                                            3. then run 'java Hello'
                                                          Feel free to ask your query...
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