# Finding out whether a is a power of b

I'm currently using singpath.com to practice on my python, but I face an issue with a problem:

A number, a, is a power of b if it is divisible by b and a/b is a power of b. Write a function called is_power that takes parameters a and b and returns True if a is a power of b.

``````def is_power(a,b):
c = a/b
if (((a%b) == 0) and ((c%b) == 0)):
return True
else:
return False
``````

Above is my solution but the system prompt me to generalize my solution. Can anyone tell me whats wrong with my solution?

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The reason reason why your original code does not work is the following: You just check `(c%b) == 0)` aka `(a/b) is divisible by b`, which is much weaker than the `a/b is a power of b` part of the definition.

When you want to solve a problem such as this you should always start with the trivial cases. In this case there are two such cases: `is_power(x,x)` and `is_power(1,x)` - in both the answer is `True`, because `x**1==x` and `x**0==1`.

Once you have these cases covered you just need to write down the rest of the definition. Write code for `(a is divisible by b) and (a/b is a power of b)` and put it all together.

The final function will look like this:

``````def is_power(a,b):
if <trivial case 1> or <trivial case 2>:
return True
# its a recursive definition so you have to use `is_power` here
return <a is divisible by b> and <a/b is a power of b>
``````

The only question left is how to answer `<a/b is a power of b>`. The easiest way to do this is using the function `is_power` itself - this is called recursion.

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This is a correct answer to the problem he's trying to solve, but it's not an answer to his question, which was to ask what was wrong with his code, not how to write different code which solves the problem. –  Keith Irwin Jan 19 '11 at 21:44
Ok, I've added a bit more explanation. –  Jochen Ritzel Jan 19 '11 at 22:36

You are only checking the first two powers: a divides b and a/b divides b. It could be that a = b ** 3 or b ** 4 (or b ** n in general), so the actual solution will have to involve recursion or a loop.

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I wouldn't say to generalize it. I would say to correct it as it's incorrect. Using your solution is_power(12,2) returns True as does is_power(18,3).

I think that the reason that the system says to generalize it is that it's probably working correctly for some of their test cases, but not others. It's likely that the test cases for which it is working are coincidentally those for which it would work if it were hard-coded in a certain way (only checking powers of 2, for example).

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You're checking whether `a/b` is divisible by `b` (in the expression `(c%b) == 0`), rather than whether `a/b` is a power of `b`. Hint: What function would you call to see whether something is a power of `b`?

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To understand recursion, you need first to understand recursion.

`````` def is_power(a, b):
if a < b: # 3 is never a power of 10, right?
return False # prevent recursion
if a == b:  # a is always a**1, right?
return True  # prevent recursion
else:
return is_power(a / b, b) # recursion!
``````

Note that for integers `a / b` will give you rounding errors. Make sure you pass floats.

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1 is a power of 5 though :p –  Jochen Ritzel Jan 19 '11 at 18:17
Yes, I should have included a `b == 0` check. –  9000 Jan 19 '11 at 18:19
Also every positive number is a floating power of any positive number ... so you can't use floats. –  Jochen Ritzel Jan 19 '11 at 18:32
You can't use fractional numbers, but you have to use floats to get non-rounding division semantics in Python 2.x. (Fortunately, in 3.x `3 / 2` == 1.5 and not 1 any more.) Rounding errors will lead to incorrect answers, I tried :) To add even more sophistication, you can use `divmod` to get the quotient and the remainder in one go, and return `False` once remainder is nonzero. –  9000 Jan 19 '11 at 18:37

I don't think you have the right implementation. Based on the problem, the `is_power` function should look something like this:

``````def is_power(a,b):
if a%b == 0 and is_power(float(a)/float(b), b):
return True
else:
return False
``````
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You can cheat and use log.

``````import math

def is_power(a, b):
return math.log(a, b) % 1 == 0
``````
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``````def is_power(a,b):
if(a==b):
return True
if(a%b==0):
if is_power(a/b,b):
return True
else:
return False
else:
return False
``````
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Try to offer some explanation for your answer instead of just providing a code block. It will help other users to understand the answer instead of correcting a localized problem. Thanks! –  Conner Aug 16 '12 at 4:27

You are answering to the first constraint but not to the second,
You check to see that `(a/b)%b == 0` which is a special case of "`(a/b) is a power of b`". Therefor the generalization error (try to think of generalizing that specific case.

What you wrote is not a solution to `is power of` for example you will indicate `12` as a power of `2` since:

• `12%2 = 0`,
• `(12/2)%2 = 0`

But that is clearly wrong.

As others said, think of recursion (or the less preferable looping solution).

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