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Let f:[0,2]→R a function which is continuous on [0,2] and is differentiable on (0,2) with f(0)= x² Let F(x)=∫f(√t)dt, for x∈[0,2], if F′(x)=f′(x),∀x∈(0,2), then F(2) equals to 0
A. e4−1 B. e2−1 C. e−1 D. e4
Sagot :
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