1 Answer

CSturgess · Answer 1 · 2023-01-26T00:27:34+0000

Given:-

$f(x)=\begin{cases}(x^2-12x+27)/(x-3) \\ 6px\end{cases}$

To find the value of x=3.

From the question it is clear that the value of 3 lies within,

Now we substituting the value of x=3. we get,

$\begin{gathered} f(x)=(x^2-12x+27)/(x-3)_{} \\ f(3)=(3^2-12*3+27)/(3-3) \\ f(3)=(9-36+27)/(0) \\ f(3)=(0)/(0) \end{gathered}$

So the value of f(3)=0

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