most group has less than bits. Step : Convert equivalent octal value using " 's power positional weight method" Table . Octal numbers and their Binary equivalent Octal Binary Equivalent Example Convert (11010110) into octal equivalent number Step : Group the given number into bits from right to left. Note: The left most groups have less than bits, so is added to its left to make a group of bits.
Step- : Find Octal equivalent of each group (11010110) = ( ) . . . Binary to Hexadecimal Conversion Step : Group the given number into bits from right to left.
Step : You can add preceding ’s to make a group of bits if the left most group has less than bits. Step : Convert equivalent Hexadecimal value using " 's power positional weight method" Example Convert (1111010110) into Hexadecimal number Step : Group the given number into bits from right to left. Note: ’s are added to the left most group to make it a group of bits (1111010110) = (3D6) D . .
Conversion of fractional Binary to Decimal equivalent Follow the steps to convert fractional Binary number to its Decimal equivalent. Step : Convert integral part of Binary to Decimal equivalent using positional notation method (Procedure is same as discussed in . . ) Step : To convert the fractional part of binary to its decimal equivalent.
Step . : Write down the Binary digits in the fractional part Step . : For all the digits write powers of from left to right starting from - , - , - ...... -n , now write the equivalent weight.
Chapter Page - - Step . : Multiply each digit with its corresponding weight Step . : Add all the values which you obtained in Step . Table .
Positional notation and weight Positional notation Weight