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Question Attached in Screenshot Below: Only Question 1: This is NOT a test.

Question Attached in Screenshot Below: Only Question 1: This is NOT a test.-example-1
User Shantanu Kher
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1 Answer

22 votes
22 votes

Answer:

Recall that, if the limit exists:


f^(\prime)(x)=\lim _(h\rightarrow0)(f(x+h)-f(x))/(h).

Now, we compute f(x+h):


\begin{gathered} f(x+h)=4.5(x+h)^2-3(x+h)+2 \\ =4.5(x^2+2xh+h^2)-3x-3h+2 \\ =4.5x^2+9xh+4.5h^2-3x-3h+2 \\ =4.5x^2-3x+2+9xh+4.5h^2-3h \\ =f(x)+9xh+4.5h^2-3h\text{.} \end{gathered}

Therefore:


\begin{gathered} \lim _(h\rightarrow0)(f(x+h)-f(x))/(h)=\lim _(h\rightarrow0)(f(x)+9xh+4.5h^2-3h-f(x))/(h) \\ =\lim _(h\rightarrow0)(9xh+4.5h^2-3h)/(h)=\lim _(h\rightarrow0)(9x+4.5h^{}-3) \\ =9x-3. \end{gathered}

Therefore:


f^(\prime)(x)=9x-3.

User Stewsters
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