How do you factor the expression $20x^2 + 60 x + 45$ ?

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How do you factor the expression $20x^2 + 60 x + 45$ ?

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Answer 1 · 2018-03-02T11:08:04

$20x^2 +60x +45$

$=5(4x^2 +12x+9)$

$=5(4x^2 +6x +6x+9)$

$=5 (2x(2x+3) + 3(2x+3))$

$=5 (2x+3)(2x+3)$

ALTERNATIVELY,

$20x^2 +60x+45$

$=5(4x^2+12x+9)$

$=5((2x)^2 +2*2x*3 +3^2))$

$=5(2x+3)^2$

Answer 2 · 2018-03-02T11:08:39

$(10x+15)(2x+3)=5(2x+3)^2$

Explanation:

We have the quadratic expression $20x^2+60x+45$ .

This is of the form $ax^2+bx+c$ , and here, $a=20, b=60, c=45$ .

First we must find $axxc$ . Here, $axxc=20xx45=900$

Now, we must find two factors of $axxc=900$ , that add up to give $b$ .

You can do this fast after loads of practice, and I'm just going to go and say it: The factors are $30$ and $30$ . They multiply to give $900$ , and add up to give $60$ . We can write our equation as:

$20x^2+30x+30x+45$

$=10x(2x+3)+15(2x+3)$

$=(10x+15)(2x+3)$

$=5(2x+3)(2x+3)$

$=5(2x+3)^2$

Hence factored.

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How do you factor the expression $20x^2 + 60 x + 45$ ?

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How do you factor the expression 20x^2 + 60 x + 4520x^2 + 60 x + 45?

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How do you factor the expression $20x^2 + 60 x + 45$ ?