If f is continuous function and F(x)=∫x0((2t+3)∫2tf(u)du)dt, then the value of ∣∣∣F′′(2)f(2)∣∣∣
A
3
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B
5
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C
7
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D
9
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Solution
The correct option is C 7 ∴F(x)=∫x0((2t+3)∫2tf(u)du)dt
Differentiating both sides w.r.t. x, then F′(x)=(2x+3).∫2xf(u)du
Again differentiating both sides w.r.t. x, then F′′(x)=(2x+3).(0−f(x))+∫2xf(u)du×2∴F′′(2)=−7f(2)+0⇒∣∣∣F′′(2)f(2)∣∣∣=7