2032 base four expanded notation

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17-02-2017
Mathematics

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2032 base four expanded notation

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LammettHash LammettHash · Answer 1 · 2017-02-18T00:08:17+01:00

Assuming 2032 is itself a number in base 4, you have

[tex]2032_4=2\times4^3+3\times4^1+2\times4^0[/tex]

Or, if you mean to ask about converting 2032 into base 4, you have

[tex]\dfrac{2032}4=508[/tex] with remainder 0, which means the "ones" digit is 0.
[tex]\dfrac{508}4=127[/tex] with remainder 0, which means the "tens" digit is also 0.
[tex]\dfrac{127}4=31[/tex] with remainder 3, so the "hundreds" digit is 3.
[tex]\dfrac{31}4=7[/tex] with remainder 3, so the "thousands" digit is also 3.
[tex]\dfrac74=1[/tex] with remainder 3, so the next digit is also 3.
[tex]\dfrac14=0[/tex] with remainder 1, so the next (and final) digit is 1.

So, [tex]2032_{10}=133300_4[/tex].