Analyze and sketch a graph of the function. Label any

Mahagnazk

Mahagnazk

Answered question

2021-11-23

Analyze and sketch a graph of the function. Label any intercepts, relative extrema, points of inflection, and asymptotes. Use a graphing utility to verify your results y=3x232x

Answer & Explanation

Luis Sullivan

Luis Sullivan

Beginner2021-11-24Added 11 answers

Step 1 Given Function
y=3x232x
To Find: Relative extreme, Point of inflection and Asymptotes.
On Sketching the graph of given function we get,
image
Step 2: From first derivative test definition
Suppose that isa critical point of then
If f(x)>0 to the left of x=c and f(x)<0 to the right of x=c then x=c is a local maximum.
If f(x)<0 to the left of x=c and f`(x)>0 to the right of x=c then x=c is a local minimum.
If f`(x) is the same sign on both sides of x=c then x=c is neither a local maximum nor a local local minimum.
Step 3: On differentiating the given equation we obtain,
dydx=3×{23}x132
dydx={2x13}2
Now, to find critical points substitute,
dydx=0
{2x13}2=0
{2x13}=2
x13=1
x=1
So the critical points obtained
x=O and x=1
So the intervals are
Checking the sign of f`(x)
at each monotone interval we have,
Step 5: By the Inflection point Definition
An inflection point is a point on graph at which the second derivative changes sign
If f(x)>0 then f(x) concave upwards
IF f(x)<0 then f(x) concave downwards
Here, We have,
f(x)=23x43
Checking the sign we obtain,
∝<x<0x=00<x<∝SignNA+BehaviorConcaveDownwardNAConcaveDownward

On the Above analysis we find that there are
No any point of Inflection that we have for the given function.
Resulting in No any Vertical as well as Horizontal Asymptotes.

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