This transfer is possible in two ways: direct transfer and using the decimal system.
First we will perform the translation through the decimal system
let\'s translate to decimal like this:
13∙163+10∙162+15∙161+10∙160+11∙16-1+10∙16-2+10∙16-3 = 13∙4096+10∙256+15∙16+10∙1+11∙0.0625+10∙0.00390625+10∙0.000244140625 = 53248+2560+240+10+0.6875+0.0390625+0.00244140625 = 56058.7290039062510
got It: DAFA.BAA16 =56058.7290039062510
Translate the number 56058.7290039062510 в octal like this:
the Integer part of the number is divided by the base of the new number system:
56058 | 8 | | | | | |
-56056 | 7007 | 8 | | | | |
2 | -7000 | 875 | 8 | | | |
| 7 | -872 | 109 | 8 | | |
| | 3 | -104 | 13 | 8 | |
| | | 5 | -8 | 1 | |
| | | | 5 | | |
|
the Fractional part of the number is multiplied by the base of the new number system:
|
0. | 72900390625*8 |
5 | .83203*8 |
6 | .65625*8 |
5 | .25*8 |
2 | .0*8 |
the result of the conversion was:
56058.7290039062510 = 155372.56528
the Final answer: DAFA.BAA16 = 155372.56528
Now we will perform a direct translation.
let\'s do a direct translation from hexadecimal to binary like this:
DAFA.BAA16 = D A F A. B A A = D(=1101) A(=1010) F(=1111) A(=1010). B(=1011) A(=1010) A(=1010) = 1101101011111010.101110101012
the Final answer: DAFA.BAA16 = 1101101011111010.101110101012
Fill in the number with missing zeros on the left
Fill in the number with missing zeros on the right
let\'s make a direct translation from binary to post-binary like this:
001101101011111010.1011101010102 = 001 101 101 011 111 010. 101 110 101 010 = 001(=1) 101(=5) 101(=5) 011(=3) 111(=7) 010(=2). 101(=5) 110(=6) 101(=5) 010(=2) = 155372.56528
the Final answer: DAFA.BAA16 = 155372.56528