If f(x)=\frac{x^{3}}{x^{2}-25}, what are the points of inflection, concavity and

Rylan Sullivan

Rylan Sullivan

Answered question

2022-04-22

If f(x)=x3x225, what are the points of inflection, concavity and critical points?

Answer & Explanation

Tatairfzk

Tatairfzk

Beginner2022-04-23Added 12 answers

Answer: Critical numbers: 0 and ±75
Step 1
Concave down on (,5) and on (0, 5)
Concave up on (-5, 0) and on (5,)
Inflection point (0, 0)
Step 2
f(x)=x2(x275)(x225)2
f'(x) DNE at x=±5 but those are not in the domain, so they are not critical.
f(x)=0 at x=0 and at x±75 which are in the domain, so they are all critical numbers.
fx)=50x(x2+75)(x225)3 could change sign at 0 and at ±5.
On (,5),fx)<0, so f is concave down.
On (5,0),fx)>0, so f is concave up.
On (0,5),fx)<0, so f is concave up.
On (5,),fx)<0, so f is concave up.
The concavity changes at x=5,0 and 5. An inflection point is a point of the graph where concavity changes. Since -5 and 5 are not in the domain of f, there are no IPs there, but f(0)=0, so (0, 0) is an Infle pt.

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