This transfer is possible in two ways: direct transfer and using the decimal system.
first, let\'s make a direct transfer.
Fill in the number with missing zeros on the left
let\'s make a direct translation from binary to post-binary like this:
0000110101111010011002 = 000 011 010 111 101 001 100 = 000(=0) 011(=3) 010(=2) 111(=7) 101(=5) 001(=1) 100(=4) = 03275148
the Final answer: 000110101111010011002 = 03275148
now let\'s make the transfer using the decimal system.
let\'s translate to decimal like this:
0∙220+0∙219+0∙218+0∙217+1∙216+1∙215+0∙214+1∙213+0∙212+1∙211+1∙210+1∙29+1∙28+0∙27+1∙26+0∙25+0∙24+1∙23+1∙22+0∙21+0∙20 = 0∙1048576+0∙524288+0∙262144+0∙131072+1∙65536+1∙32768+0∙16384+1∙8192+0∙4096+1∙2048+1∙1024+1∙512+1∙256+0∙128+1∙64+0∙32+0∙16+1∙8+1∙4+0∙2+0∙1 = 0+0+0+0+65536+32768+0+8192+0+2048+1024+512+256+0+64+0+0+8+4+0+0 = 11041210
got It: 0000110101111010011002 =11041210
Translate the number 11041210 в octal like this:
the Integer part of the number is divided by the base of the new number system:
110412 | 8 | | | | | |
-110408 | 13801 | 8 | | | | |
4 | -13800 | 1725 | 8 | | | |
| 1 | -1720 | 215 | 8 | | |
| | 5 | -208 | 26 | 8 | |
| | | 7 | -24 | 3 | |
| | | | 2 | | |
|
the result of the conversion was:
11041210 = 3275148
the Final answer: 000110101111010011002 = 3275148