# Exponentiation of real numbers

I've come across an interesting exercise and it says: Implement a function x^y using standard functions of Turbo Pascal

For `integer` variables I can use `for` loop but I cannot understand how to work with `real` variables in this case.

I've been thinking about how to do this using Taylor series (can't understand how to use it for exponentiation) and I also found out that `x^y = exp(y*log(x))` but there is only `ln` (natural logarithm) in standard functions...

PS I'm not asking you to write code: give me advise or link or something that will help to solve this problem, please.

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If only log base is the issue then you can apply log formula and change bases. – user1990169 Sep 12 '13 at 16:28
@AbhishekBansal, explain quite a bit detail, please. – Yulian Khlevnoy Sep 12 '13 at 16:38

## 2 Answers

log(x) in your formula is natural logarithm, so you can use

``````x^y = exp(y*ln(x))
``````

without any doubts. Both exp and ln are standard Turbo Pascal functions

(general formula is x^y = b^(y * base-b logarithm of x)

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Thanks, I'll verify it. But could you explain how did you find out that `log(x)` int the question is `ln(x)`, please? – Yulian Khlevnoy Sep 12 '13 at 16:50
log(x) is abstract logarithm without base indication. Exp using implies natural logarithm. – MBo Sep 12 '13 at 17:01

log x base y = ln(x) / ln(y) = (log x base 10)/(log y base 10)

Following link has more information regarding logarithms. Check out the "Changing the Base" section. http://en.wikipedia.org/wiki/List_of_logarithmic_identities

You can change your base to natural logarithm and compute accordingly.

``````For x = 3.2, y = 2.5,
Say 3.2^2.5 = m
ln(m) = 2.5*ln(3.2)
Hence m = exp( 2.5 * ln(3.2) )
``````

Actually for the above, you do not even need to change bases

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How can it be applied for `x:= 3.2` and `y:= 2.5`, for example? – Yulian Khlevnoy Sep 12 '13 at 16:43