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Redochka · Answer 1 · 2023-04-29T13:41:41+0000

Answer:

Recall that:

Now, notice that:

$\begin{gathered} -2(x-5)^2+9=-2((x-5)^2-(9)/(2))=-2((x-5)^2-(3^2)/(√(2)^2)) \\ =-2((x-5)^2-((3)/(\sqrt2))^2)=-2((x-5)^2-((3√(2))/(2))^2). \end{gathered}$

Using the first property in the answering tab we get:

(x-5)^2-((3√(2))/(2))^2=(x-5-(3√(2))/(2))(x-5+(3√(2))/(2))

Therefore we can rewrite the given equation as follows:

Therefore the x-intercepts of the given equation are:

$\begin{gathered} x=-(-5-(3√(2))/(2))=5+(3√(2))/(2) \\ and \\ x=-(-5+(3√(2))/(2))=5-(3√(2))/(2). \end{gathered}$

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