# Can someone explain this snippet of code? - C++ [duplicate]

Possible Duplicate:
Using Recursion to raise a base to its exponent - C++

``````int raisingTo(int base, unsigned int exponent)
{
if (exponent == 0)
return 1;
else
return base * raisingTo(base, exponent - 1);
}
``````

I wrote this code for raising an exponent to its base value using values passed by value from the `main()`. This function uses recursion to do this. Can someone explain how it returns a value each time it calls itself? I need a detailed explanation of this code.

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## marked as duplicate by Oliver Charlesworth, talonmies, Ben Voigt, Michael Krelin - hacker, BartFeb 19 '12 at 16:30

Did you try just doing it on paper? – Christian Jonassen Feb 19 '12 at 16:20
@Bart writing code that works but you don't understand is not uncommon for new programmers – Seth Carnegie Feb 19 '12 at 16:20
Does copying the code from a school assignment count as "wrote it"? – Alan Feb 19 '12 at 16:24
And the explanation of how it works is explicitly given there as well... – Bart Feb 19 '12 at 16:25
@MichaelKrelin-hacker No, but how would I have known he copied it? I don't automatically assume people are lying when they don't understand something they say they wrote (I've done it plenty of times). – Seth Carnegie Feb 19 '12 at 16:32

It is best illustrated by doing iterations manually (as suggested in the comments). Suppose we have `base = 2` and `exponent = 2`.

• During the first iteration the function returns `2 * (whatever function yields when called with the arguments 2 and (2 - 1), which is 1)`.
• The second iteration with the arguments 2 and 1 gets the result `2 * (whatever the next iteration with arguments 2 and 0 returns)`.
• The thrid iteration will also be the last one since the function is set to return 1 when exponent is 0.

Now we have the full chain 2 * 2 * 1, therefore the result of the calculation is 4.

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Thank you so much Malcolm! – Ram Sidharth Feb 19 '12 at 16:43
@Malcolm.I understand it now. Thanks Malcolm. – Ram Sidharth Feb 19 '12 at 16:47

We use the equation: `x^n = x * x^(n-1)` which is true for all real numbers.

So that we use it to create recursive function. The bottom of recursion is when the exponent == 0.

For example `2^4 = 2 * 2^3`; `2^3 = 2 * 2^2`; `2^2 = 2 * 2^1`; `2^1 = 2 * 2^0` and `2^0 = 1`.

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+1, you wrote the code the OP "wrote", so you get to the second level ;-) – Michael Krelin - hacker Feb 19 '12 at 16:28
@MichaelKrelin-hacker.Thank you for your most enlightening comment. If you are willing to answer my question, please do. Thank you. – Ram Sidharth Feb 19 '12 at 16:42