Question

XificurC asked Jun 14, 2023

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1 Answer

Andrei Tita · Answer 1 · 2023-06-19T10:05:20+0000

Answer:

The two roots of the quadratic equation are

$x_1= - (1)/(3) \text{ and } x_2= (2)/(3)$

Explanation:

Original quadratic equation is
9x^(2)-3x-2=0

Divide both sides by 9:

x^(2) - (x)/(3) - (2)/(9)=0

Add
(2)/(9) to both sides to get rid of the constant on the LHS

x^(2) - (x)/(3) - (2)/(9)+(2)/(9)=(2)/(9) ==>
x^(2) - (x)/(3)=(2)/(9)

Add
(1)/(36) to both sides

x^(2) - (x)/(3)+(1)/(36)=(2)/(9) +(1)/(36)

This simplifies to

x^(2) - (x)/(3)+(1)/(36)=(1)/(4)

Noting that (a + b)² = a² + 2ab + b²

If we set a = x and b =
$(1)/(6)\right)$ we can see that

$\left(x - (1)/(6)\right)^2$ =
x^2 - 2.x. (-(1)/(6)) + (1)/(36) = x^(2) - (x)/(3)+(1)/(36)

So

$\left(x - (1)/(6)\right)^2=(1)/(4)$

Taking square roots on both sides

$\left(x - (1)/(6)\right)^2= \pm(1)/(4)$

So the two roots or solutions of the equation are

$x - (1)/(6)=-\sqrt{(1)/(4)}$ and
$x - (1)/(6)=\sqrt{(1)/(4)}$

$\sqrt{(1)/(4)} = (1)/(2)$

So the two roots are

x_1=(1)/(6) - (1)/(2) = -(1)/(3)

and

x_2=(1)/(6) + (1)/(2) = (2)/(3)

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