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Question

A function y=f(x) has a second-order derivative f′′(x)=6(x1). If its graph passes through the point (2,1) and at that point tangent to the graph is y=3x5, then the value of f(0) is

A
1
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B
1
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C
2
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D
0
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Solution

The correct option is B 1
We have f′′(x)=6(x1)
Integrating, we get
f(x)=3(x1)2+c ...(1)

At (2,1),y=3x5 is tangent to y=f(x).
Thus, f(2)=3.

From equation (1),
3=3(21)2+cc=0
f(x)=3(x1)2
Integrating, we get
f(x)=(x1)3+c.

Since, the curve passes through (2,1),
1=(21)3+cc=0
f(x)=(x1)3
f(0)=1

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