# BigInteger.pow(BigInteger)?

I'm playing with numbers in Java, and want to see how big a number I can make. It is my understanding that BigInteger can hold a number of infinite size, so long as my computer has enough Memory to hold such a number, correct?

My problem is that BigInteger.pow accepts only an int, not another BigInteger, which means I can only use a number up to 2,147,483,647 as the exponent. Is it possible to use the BigInteger class as such?

``````BigInteger.pow(BigInteger)
``````

Thanks.

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`BigInteger` cannot represent numbers of infinite size, it can only represent numbers "close to" arbitrary size. The maximum representable number depends on your implementation (internal data structures) and the available heap memory. –  Roland Illig Jan 3 '11 at 6:45
why do you need it? Like Saeed says below even smallest such value where int is not enough is too big... –  Fakrudeen Jan 3 '11 at 7:35
It only makes sense when you compute modulo a `BigInteger`, for that case it exists: download.oracle.com/javase/6/docs/api/java/math/… –  starblue Jan 3 '11 at 12:28
–  finnw Jan 30 '11 at 21:12

You can write your own, using repeated squaring:

``````BigInteger pow(BigInteger base, BigInteger exponent) {
BigInteger result = BigInteger.ONE;
while (exponent.signum() > 0) {
if (exponent.testBit(0)) result = result.multiply(base);
base = base.multiply(base);
exponent = exponent.shiftRight(1);
}
return result;
}
``````

might not work for negative bases or exponents.

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+1 for showing that it's possible (even though it's probably not a good idea) –  Sean Patrick Floyd Jan 3 '11 at 9:30
@Sean Patrick Floyd, @Keith Randall, It's possible to write code as simple as this but it's not possible to use it, what's the usage of big integer coef in this case????? did you can use a range of big integer which is not in int????? This code is just slow, because biginteger is very slower than int. –  Saeed Amiri Jan 3 '11 at 11:38
Yes, it will be pretty slow, and probably not very useful. But it answers the OP's question as to how to test how big a BigInteger he can make. And the same algorithm IS useful when using modular arithmetic - see BigInteger.modPow, which does take a BigInteger exponent. –  Keith Randall Jan 3 '11 at 16:26
I think `OP` asked for why there is no pow for big integer coef in java not how to implement it. –  Saeed Amiri Jan 3 '11 at 17:25
@Saeed, he didn't ask why BigInteger.pow is that way, he asked if it was possible to use a larger exponent. –  Keith Randall Jan 3 '11 at 20:29

The underlying implementation of BigInteger is limited to (2^31-1) * 32-bit values. which is almost 2^36 bits. You will need 8 GB of memory to store it and many times this to perform any operation on it like toString().

BTW: You will never be able to read such a number. If you tried to print it out it would take a life time to read it.

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2^2,147,483,647 has at least 500000000 digit, in fact computing pow is NPC problem, [Pow is NPC in the length of input, 2 input (m,n) which they can be coded in O(logm + logn) and can take upto nlog(m) (at last the answer takes n log(m) space) which is not polynomial relation between input and computation size], there are some simple problems which are not easy in fact for example sqrt(2) is some kind of them, you can't specify true precision (all precisions), i.e BigDecimal says can compute all precisions but it can't (in fact) because no one solved this up to now.

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@Fakrudeen, It's NPC in space. –  Saeed Amiri Jan 3 '11 at 11:35
Computing power is not NPC. It is very much polynomial. For an example algo. see Keith's answer. Calculating n^m is atmost (mlogn) ^2 * logm which is clearly less than (max(n,m))^4. Also your definition of NPC is not correct. NPC means you can verify the answer in polynomial time, but the solution is NP hard (polynomial in non deterministic TM model). –  Fakrudeen Jan 3 '11 at 11:40
NPC in space would imply atleast NPC in time, Because using up that much space itself will take up NPC time! –  Fakrudeen Jan 3 '11 at 11:42
@Fakrudeen, The input can be coded in O(log(m) + log(n), this is true yes? and the outpul m^n can be coded in `n log(m)` which has no polynomial relation to input size (log(m) +log(n))^veryLargeNumber < n log(m) (i.e m == n), and NPC in space doesn't mean NPC in time or vise versa. and that's not my definition it's Gary and Johnson books definition. –  Saeed Amiri Jan 3 '11 at 11:45
Also for your computation, input can be coded in O(log m+ log n) and if the answer is `n log(m)*...` indeed it's NPC in time too, but I just try to talk about space (to say we can't use it) –  Saeed Amiri Jan 3 '11 at 11:49

You can only do this in Java by modular arithmetic, meaning you can do a a^b mod c, where a,b,c are `BigInteger` numbers.

This is done using:

`````` BigInteger modPow(BigInteger exponent, BigInteger m)
``````

Read the `BigInteger.modPow` documentation here.

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java wont let you do BigInteger.Pow(BigInteger) but you can just put it to the max integer in a loop and see where a ArithmeticException is thrown or some other error due to running out of memory.

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