# 2^power without using math.pow and multiplication

Is there any way to use code 2^power without using math.pow or multiplication operator. So far,

I've though of using 2 counters and additions, but my programs doesn't seem to be working. Here is my work thus far.

``````int counter=0; // k
int userNumber=0; // p
int power=0;
int sum=0;

cout << "Enter a non-negative number: ";
cin >> userNumber;

while (userNumber > counter)
{
power +=2;
counter++;
power++;
}

sum = power - 1;
// post-condition: Sum = 2^p -1
cout << "The output is " << sum << endl;
return 0;
``````
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Is this an interview question? Or homework? The reason why I'm asking, we have exactly that question on our job interview. There's a really simple answer based on a relatively obscure C++ feature, but if you're supposed to guess for yourself... –  Seva Alekseyev Sep 23 '11 at 2:57
@SevaAlekseyev: I dare say you need to come up with more insightful interview questions. ;-) –  Chris Jester-Young Sep 23 '11 at 2:58
You'd be surprised how many people flunk this. Also, remember the FizzBuzz. –  Seva Alekseyev Sep 23 '11 at 3:01
I'd hire any programmer that doesn't get that one right just to be able to fire him or her the following second. Now getting the fine differences right about dividing by 2 and bit shifts, that'd be something else. –  Voo Sep 23 '11 at 3:03
@SevaAlekseyev Why is it important exactly to ask about obscure language dependent "features" on an interview? –  Austin Henley Sep 23 '11 at 3:45

``````   pow = 1;
while(userNumber > counter){
pow = pow+pow;
counter++;
}
``````
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I feel so stupid now; This makes so much sense! Thanks you SOOO much!! –  Naman Sep 23 '11 at 3:34
@Namen: It seems that you didn't like any of the bit-shift answers. Was there a reason for this? –  Mysticial Sep 23 '11 at 3:40
This looks more like an attempt to calculate 2*userNumber, not 2^userNumber. And since power is initialized to zero, this always generates zero. –  IronMensan Sep 23 '11 at 12:09
@IronMensan This program generates 2^userNumber. In each loop pow is 2^counter because 2^n = (2^(n-1) + 2^(n-1)). –  gibraltar Feb 13 '13 at 21:45
You edited it 3 minutes before leaving that comment. Not cool, it was a horrible failure when first posted. –  codetaku Jan 23 at 15:32

You can calculate `2^n` with bit-manipulation. Simply do:

``````1 << n;
``````

This works because left-shifting with binary numbers is equivalent to multiplying by 2.

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+1 for 2k, now you won't have to get permission for your edits anymore. :) –  Mysticial Sep 23 '11 at 3:01
Q.E.D: ideone.com/Tc7Cg –  Johnsyweb Sep 23 '11 at 3:02

Check out the `ldexp` function.

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`ldexp` is for floating point numbers, not ints! –  Chris Jester-Young Sep 23 '11 at 2:57
@Chris Jester-Young As is math.pow(). The problem seems actually much more interesting for FP than int (I mean for int that's trivial really) –  Voo Sep 23 '11 at 2:59
I assumed we were generalizing to floating point, given that math.pow was given as an option. And because the integer case is uninteresting. –  Raymond Chen Sep 23 '11 at 4:00