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?

See en.wikipedia.org/wiki/Octal#Octal_to_Decimal_conversion. – 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.


2yes 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

1@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
The formula is 1_{8} = 1_{10} and 10_{8} = 8_{10}. 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.
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_(n1)*k^1 + ... + a_1*k^(n1).