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Question

The graphs of f(x)=x2+2 and g(x)=x3x2kx+2, k>0 are shown below. The graphs intersect and create two closed regions A and B.


Which of the following is (are) CORRECT?

A
Area(A)=Area(B) k>0
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B
Area(A)=12Area(B) k>0
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C
Area(A)=4 sq. unit when k=4
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D
Area(B)=1 sq. unit when k=2
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Solution

The correct option is D Area(B)=1 sq. unit when k=2
f(x)=x2+2 and g(x)=x3x2kx+2
Intersection point of f(x) and g(x):
x2+2=x3x2kx+2
x3kx=0
x=0,±k

From the graph, we can conclude that
g(x)f(x) for kx0f(x)g(x) for 0xk
So,
A=0k[g(x)f(x)] dxB=k0[f(x)g(x)] dx

Since, g(x)f(x)=x3kx is an odd function, so
kk[g(x)f(x)] dx=00k[g(x)f(x)] dx+k0[g(x)f(x)] dx=0A0k[g(x)f(x)] dx=0AB=0A=B

Now,
B=k0(kxx3)dxB=[kx22x44]k0B=k24

Therefore,
When k=4
A=B=4 sq. unit
When k=2
A=B=1 sq. unit

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