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What is the difference between perfect square and difference of squares?

1 Answer

Jul 7, 2015

A perfect square can be factored as $(p+q)^2$
The difference of squares can be factored as $(p+q)(p-q)$

Explanation:

I assume here that we are dealing with polynomials that can be factored into binomials.

For trinomials of the form
$color(white)("XXXX")$ $ax^2+bx+c$

$ax^2+bx+c$ is a perfect square if
$color(white)("XXXX")$ $EE_p | p^2 = ax^2$
$color(white)("XXXX")$ $EE_q | q^2 = c$
and
$color(white)("XXXX")$ $p*q = bx$

Since the difference of squares factors as
$color(white)("XXXX")$ $(p+q)(p-q)$
$color(white)("XXXX")$ $color(white)("XXXX")$ $=p^2 - q^2$
an obvious requirement for $ax^2+bx+c$ to be the difference of squares is that $b=0$

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