# Java Imposible puzzler [closed]

Anyone can get the equation for this? I couldn't

``````class Calculator {
public int count = 0;
public void calc(int n, int p) {
count++;
if (p>n) return;
for (int i=0; i<n; i++) {
calc(n, p+1);
}
}
}

// int n is input by keyboard
Calculator c = new Calculator();
c.calc(n, 0);
System.out.println(c.count);
``````

Anybody with the equation or any information ... thanks

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## closed as not a real question by Sean Patrick Floyd, Brian Roach, bmargulies, Brad Larson♦, John SaundersApr 15 '11 at 20:27

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center. If this question can be reworded to fit the rules in the help center, please edit the question.

I don't understand your question. –  Etienne de Martel Apr 14 '11 at 16:57
What "equation"? –  Joseph Weissman Apr 14 '11 at 16:58
Sure looks like Homework. Hint: It is two different ways to do iterations. Work it out for some small numbers of n. Also, the equation is a very simple expression. –  Captain Giraffe Apr 14 '11 at 17:00

## 2 Answers

The `count` is incremented once and then calc is called `n` times, this recurses `1 + n` times due to the `p > n` test. BTW If it were `p >= n` it would recurse `n` times.

The equation is

``````1 + n * (1 + n * ... (1 + n))
``````

where the expression `1 + n` appears `1 + n` times.

e.g. calc(3,0) = 121 =

``````1 + 3 * (1 + 3 * (1 + 3 * (1 + 3)))
``````
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this is correct, beat me to it –  Richard H Apr 14 '11 at 17:14
@Richard, by at least 2 seconds. ;) –  Peter Lawrey Apr 14 '11 at 17:15

I think this will call

``````calc(n, 1); // this tree will appear n times
calc(n, 2); // this tree will appear n times
calc(n, 3) // this tree will appear n times
.
.
calc(n, n+1) // this call will appear n times
``````

Each invocation of `calc` will increment `count`. Calclating the number of calls is equivalent to calculating the number of nodes of a complete n-ary tree of height `n+2` (the root of this tree represents the call `c.calc(n, 0)`). So I think the solution is

``````count = n^0 + n^1 + n^2 + ... + n^n + n^(n+1)
``````
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The count for n = 3 is 121, n = 4 is 1365. –  Peter Lawrey Apr 14 '11 at 17:26
@Peter you are right, my formula for calculating the count of nodes was wrong :) Now it's correct. –  Johannes Schaub - litb Apr 14 '11 at 17:38