# Difference between revisions of "Euler problems/131 to 140"

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== [http://projecteuler.net/index.php?section=view&id=131 Problem 131] == |
== [http://projecteuler.net/index.php?section=view&id=131 Problem 131] == |
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Determining primes, p, for which n3 + n2p is a perfect cube. |
Determining primes, p, for which n3 + n2p is a perfect cube. |
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problem_140 = undefined |
problem_140 = undefined |
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</haskell> |
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## Revision as of 12:14, 30 September 2007

## Contents

## Problem 131

Determining primes, p, for which n3 + n2p is a perfect cube.

Solution:

```
problem_131 = undefined
```

## Problem 132

Determining the first forty prime factors of a very large repunit.

Solution:

```
problem_132 = undefined
```

## Problem 133

Investigating which primes will never divide a repunit containing 10n digits.

Solution:

```
problem_133 = undefined
```

## Problem 134

Finding the smallest positive integer related to any pair of consecutive primes.

Solution:

```
problem_134 = undefined
```

## Problem 135

Determining the number of solutions of the equation x2 − y2 − z2 = n.

Solution:

```
problem_135 = undefined
```

## Problem 136

Discover when the equation x2 − y2 − z2 = n has a unique solution.

Solution:

```
problem_136 = undefined
```

## Problem 137

Determining the value of infinite polynomial series for which the coefficients are Fibonacci numbers.

Solution:

```
problem_137 = undefined
```

## Problem 138

Investigating isosceles triangle for which the height and base length differ by one.

Solution:

```
problem_138 = undefined
```

## Problem 139

Finding Pythagorean triangles which allow the square on the hypotenuse square to be tiled.

Solution:

```
problem_139 = undefined
```

## Problem 140

Investigating the value of infinite polynomial series for which the coefficients are a linear second order recurrence relation.

Solution:

```
problem_140 = undefined
```