2 Answers

Betelgeuce · Answer 1 · 2023-10-04T09:09:11+0000

Answer:

(x-3)^2-11

Explanation:

Given quadratic expression:

x^2-6x-2

To write the given expression in the form (x + a)² + b, complete the square.

Add and subtract the square of half the coefficient of the term in x:

$\implies x^2-6x+\left((-6)/(2)\right)^2-2-\left((-6)/(2)\right)^2$

Simplify:

$\implies x^2-6x+\left(-3\right)^2-2-\left(-3\right)^2$

$\implies x^2-6x+9-2-9$

The first three terms x² - 6x + 9 form a perfect square trinomial.

A perfect square trinomial can be written as the square of a binomial.

Factor the perfect square trinomial:

$\implies(x-3)^2-2-9$

Simplify:

$\implies(x-3)^2-11$

Therefore, the given expression written in the form (x + a)² + b is:

$\boxed{(x-3)^2-11}$

Ffabri · Answer 2 · 2023-10-07T05:24:37+0000

Answer:

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Convert this to vertex form by completing the square.

Recall identity (a ± b)² = a² ± 2ab + b² and apply as given below:

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