[Guest]

Prove that at least one of the numbers x + 3 and x² + 3x + 3 is not a perfect cube, where x is a nonnegative integer.

[unreality]

edit: nvm.

Edited December 29, 2009 by unreality

[Izzy]

Your edit scares me..

Am I missing something? x=1.

[Guest]

Your edit scares me..

Am I missing something? x=1.

The OP asks for a proof, that for every value of a nonnegative integer x, at least one of the numbers amongst x + 3 and x^2 + 3x + 3 is not a perfect cube.

Edited December 31, 2009 by K Sengupta

[Guest]

Prove that at least one of the numbers x + 3 and x² + 3x + 3 is not a perfect cube, where x is a nonnegative integer.

if x+3 and x^2+3x+3 are both perfect cubes, then their product must be a perfect cube.

thus x^3+6x^2+18x+9 is a perfect cube

(x^3+6x^2+18x+9)^(1/3) can never be an integer at an integer value of x.

As a result, x+3 and x^2+3x+3 cannot both be perfect cubes.

[superprismatic]

if x+3 and x^2+3x+3 are both perfect cubes, then their product must be a perfect cube.

thus x^3+6x^2+18x+9 is a perfect cube

(x^3+6x^2+18x+9)^(1/3) can never be an integer at an integer value of x.

As a result, x+3 and x^2+3x+3 cannot both be perfect cubes.

You state that "(x^3+6x^2+18x+9)^(1/3) can never be an integer at an integer value of x." Why is that?

[Guest]

You state that "(x^3+6x^2+18x+9)^(1/3) can never be an integer at an integer value of x." Why is that?

(x+2) cubed is x^3+6x^2+18x+8.

this will always be a perfect cube.

x^3+6x^2+18x+9 is one greater. the only cubes that differ by one are -1,0,and 1. if x is a nonnegative integer, then x is not any of those cubes, let alone three less than any of those cubes.

sorry I forgot to mention that part of the proof.

[Guest]

Then (X+3)(X^2 + 3X +3) = Y^3 +1 which cann't be product of 2cubic numbers unless if Y= 0 i.e. X= (-2) but given that X is non negative. So no solution.