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If f(x) = 13 when f(x)=5x -√8, find x.

User Alireza Mirian
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1 Answer

13 votes
13 votes

Given that we have the function f(x) = 5x-√8, it is equal to 13 at some value of x. This relation can be written in equation as


5x-\sqrt[]{8}=13

Move √8 to the other side of the equation so that only the term with x will be left on the left-hand side. We have


5x=13+\sqrt[]{8}

Divide both sides by 5, we get


\begin{gathered} (5x)/(5)=\frac{13+\sqrt[]{8}}{5} \\ x=\frac{13+\sqrt[]{8}}{5} \end{gathered}

The square root of 8 can be further simplified as


\sqrt[]{8}=\sqrt[]{4\cdot2}=2\sqrt[]{2}

Hence, the value of x can also be rewritten as


x=\frac{13+2\sqrt[]{2}}{5}

Thus, the value of x to satisfy f(x) = 13 when f(x)=5x -√8 is


x=\frac{13+\sqrt[]{8}}{5}=\frac{13+2\sqrt[]{2}}{5}=(13)/(5)+\frac{2\sqrt[]{2}}{5}

User FGiorlando
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