# How can I convert a number from base 8 to base 10?

I know 75(base8) = 61(base10), but I can't easily find the formula for this. How does one convert from base 8 to base 10?

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–  KennyTM Feb 12 '10 at 12:02

To convert any base to base 10 just do the following:

For every digit in the different base multiply that by the base and digit. For example:

``````75 (base 8) = 7*8^1 + 5*8^0 = 61
``````

Works for any base ... binary, hex, you name it just do that and it will convert to base 10.

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wow ... we all just posted these answers within seconds of eachother... –  Travis Feb 12 '10 at 12:05
so `5*8^0` is the same as `5*1`? –  HollerTrain Feb 12 '10 at 12:06
yes it is ... anything raised tot he zero power is equal to 1 ... aka 8^0 = 1 –  Travis Feb 12 '10 at 12:13
That's not a method for converting it to base 10, that's just a method for interpreting it as an integer. The base 10 conversion is done by your calculator (or else you just you did it subconsciously in your head). –  Mark Byers Feb 12 '10 at 12:21
@Mark: What's the difference? Once you get the integer 61, expressing it in base 10 is as easy as writing "61". –  Daniel Daranas Feb 12 '10 at 14:05

0 * 85 + 0 * 84 + 0 * 83 + 0 * 82 + 7 * 81 + 5 * 80 = 61

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@MSalters: Nice edit, thank you. –  Daniel Daranas Feb 12 '10 at 14:06

The formula is 18 = 110 and 108 = 810. Everything else can be derived from that.

If you have a sequence of base 8 digits you want to convert to a base 10 number, process them from left to right, keeping a total you initialize at zero. For each digit x, set the total to 8*total+x. After processing the last digit, the total will be the base ten value of the base 8 sequence.

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75 in base 8 = 5*8^0 + 7*8^1 = 5 + 56 = 61

In general, to convert the number a_1a_2a_3...a_n from base k to base 10, use the formula:

a_n*k^0 + a_(n-1)*k^1 + ... + a_1*k^(n-1).

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given this is a programming site:

``````int oct_to_dec = 075;
printf("%d",oct_to_dec);
``````
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137461(base8) = 1 x 8^0 + 6 x 8^1 + 4 x 8^2 + 7 x 8^3 + 3 x 8^4 + 1 x 8^5

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