This transfer is possible in two ways: direct transfer and using the decimal system.
first, let\'s make a direct transfer.
let\'s translate to decimal like this:
1∙88+1∙87+1∙86+0∙85+0∙84+1∙83+1∙82+0∙81+1∙80 = 1∙16777216+1∙2097152+1∙262144+0∙32768+0∙4096+1∙512+1∙64+0∙8+1∙1 = 16777216+2097152+262144+0+0+512+64+0+1 = 1913708910
got It: 1110011018 =1913708910
Translate the number 1913708910 в hexadecimal like this:
the Integer part of the number is divided by the base of the new number system:
19137089 | 16 | | | | | | |
-19137088 | 1196068 | 16 | | | | | |
1 | -1196064 | 74754 | 16 | | | | |
| 4 | -74752 | 4672 | 16 | | | |
| | 2 | -4672 | 292 | 16 | | |
| | | 0 | -288 | 18 | 16 | |
| | | | 4 | -16 | 1 | |
| | | | | 2 | | |
|
the result of the conversion was:
1913708910 = 124024116
answer: 1110011018 = 124024116
now let\'s make the transfer using the decimal system.
let\'s do a direct translation from octal to binary like this:
1110011018 = 1 1 1 0 0 1 1 0 1 = 1(=001) 1(=001) 1(=001) 0(=000) 0(=000) 1(=001) 1(=001) 0(=000) 1(=001) = 0010010010000000010010000012
answer: 1110011018 = 10010010000000010010000012
Fill in the number with missing zeros on the left
let\'s do a direct translation from binary to hexadecimal like this:
00010010010000000010010000012 = 0001 0010 0100 0000 0010 0100 0001 = 0001(=1) 0010(=2) 0100(=4) 0000(=0) 0010(=2) 0100(=4) 0001(=1) = 124024116
answer: 00010010010000000010010000018 = 124024116