How do you find the solutions for f'(3) f'(4) and f'(5), if you are given a graph with the curve $y=f(x)$ ?

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Answer 1 · 2018-07-24T03:48:37

See details and example.

Make another graph for $f' ( x )$ and make lines x = 3, 4, 5 to read

f' values, respectively.

Exemplification:

$y = f ( x ) = xsqrtx - 1 and g ( x ) = f' ( x ) =3/2 sqrtx$

g-graph:reveals values near 2.5, 3 and 3.5.
graph{(y - 1.5sqrtx)(x-3+0y)(x-4+0y)(x-5+0y)=0}.

4-sd values, by trial and error y-bracketing method:

Graph for 4-sd $f' ( 3 ) = 2.598$
graph{(y - 1.5 sqrt x)(x-3)=0[2.95 3.05 2.597 2.599]}
By substitution, f ' ( 4 ) = 3, exactly.

Graph for 4-sd $f' ( 5 ) = 3.354$
graph{(y - 1.5 sqrt x)(x-5)=0[4.95 5.05 3.353 3.355]}

How do you find the solutions for f'(3) f'(4) and f'(5), if you are given a graph with the curve y=f(x)y=f(x)?