# Project euler 45

I'm not yet a skilled programmer but I thought this was an interesting problem and I thought I'd give it a go.

Triangle, pentagonal, and hexagonal numbers are generated by the following formulae:

• Triangle T_(n)=n(n+1)/2 1, 3, 6, 10, 15, ...
• Pentagonal P_(n)=n(3n−1)/2 1, 5, 12, 22, 35, ...
• Hexagonal H_(n)=n(2n−1) 1, 6, 15, 28, 45, ...

It can be verified that T_(285) = P_(165) = H_(143) = 40755.

Find the next triangle number that is also pentagonal and hexagonal.

Is the task description.

I know that Hexagonal numbers are a subset of triangle numbers which means that you only have to find a number where Hn=Pn. But I can't seem to get my code to work. I only know java language which is why I'm having trouble finding a solution on the net womewhere. Anyway hope someone can help. Here's my code

``````public class NextNumber {

public NextNumber() {
next();
}

public void next() {

int n = 144;
int i = 165;
int p = i * (3 * i - 1) / 2;
int h = n * (2 * n - 1);
while(p!=h) {
n++;
h = n * (2 * n - 1);

if (h == p) {
System.out.println("the next triangular number is" + h);
} else {
while (h > p) {
i++;
p = i * (3 * i - 1) / 2;
}
if (h == p) {
System.out.println("the next triangular number is" + h); break;
}
else if (p > h) {
System.out.println("bummer");
}
}

}

}
}
``````

I realize it's probably a very slow and ineffecient code but that doesn't concern me much at this point I only care about finding the next number even if it would take my computer years.

-

We know that T285 = P165 = H143 = 40755. We start with `nt=286`, `np=166` and `nh=144` and work out the respective triangle, pentagonal, and hexagonal numbers. Whichever resulting number is smallest, we bump up its `n` value. Continue doing this until all numbers are equal and you have your answer.

A Python implementation of this algorithm runs in 0.1 seconds on my computer.

The problem with your code is overflow. While the answer fits into a 32 bit `int`, the temporary values `i * (3 * i - 1)` overflows before reaching the answer. Using 64 bit `long` values fixes your code.

-

Your code looks like it will produce the correct answer fairly quickly. The while loop can be simplified if you just print the result after the loop terminates:

``````while (p != h) {
n++;
h = n * (2 * n - 1);
while (h > p) {
i++;
p = i * ((3 * i - 1) / 2);
}
}
System.out.println("the next triangular number is" + h);
``````

Note: your inner loop looks very much like the inner loop of my C++ solution. It produced the desired answer in about 0.002 seconds on my machine.

-
Okay. thx guys, don't know why my computer won't show me a result :) But nevertheless good to hear that it's not totally off. –  Peter Jan 1 '11 at 22:17
@Peter: I checked and you may be having integer overflow when computing `p`. Notice the extra parentheses I have added in the expression `p = i * ((3 * i - 1) / 2)`. My code goes into an infinite loop if I remove the parentheses. –  Blastfurnace Jan 1 '11 at 22:34
@marcog: You beat me to it, must type faster... –  Blastfurnace Jan 1 '11 at 22:35
@Blast If `i` is even, then `3*i-1` is odd and `((3 * i - 1) / 2)` will round down by .5 due to integer arithmetic. You were just lucky in that it was odd for the final answer. –  marcog Jan 1 '11 at 22:48
@marcog: Thanks for the correction, I'm going to go and fix my code. –  Blastfurnace Jan 1 '11 at 22:59

Another solution that takes 2 ms:

``````public class P45 {

public static void main(String[] args) {
long H = 0;
long i = 144;
while(true) {
H = i*((i<<1)-1);
if ( isPentagonal(H) && isTriangle(H) ) {
break;
}
i++;
}
System.out.println(H);
}

private static boolean isPentagonal(long x) {
double n = (1 + Math.sqrt(24*x+1)) / 6;
return n == (long)n;
}

private static boolean isTriangle(long x) {
double n = (-1 + Math.sqrt((x<<3)+1)) / 2;
return n == (long)n;
}

}
``````

Improved:

• You already specified that: hexagonal numbers are triangle numbers, but I add a short proof: `k*(2*k-1)` can be written in the following form `i*(i+1)/2` if `i = 2*k-1`.
• In this case `isTriangle` can be removed.
• The performance will be similar because that function was called seldom (it was called only when the number was pentagonal).
-