If ∫fxdx=Fx then ∫5×fxdx=Fx5 because integration is th

If $\int f (x) d x = F (x)$ , then $\int 5 \times f (x) d x = \frac{F (x)}{5}$ , because integration is the inverse process of differentiation

True

False

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Right Answer is: B

SOLUTION

We saw in the properties of integration that $\int k f (x) = k \int f (x)$ . The function given to us are in the form k f(x). So, $\int 5 \times f (x)$ will be equal to $5 \int f (x)$ . We are given $\int f (x) = F (x)$ . So, we get $\int 5 \times f (x) = 5 \int f (x) = 5 F (x)$ . So the given statement is false.

If ∫fxdx=Fx then ∫5×fxdx=Fx5 because integration is th

Right Answer is: B

SOLUTION

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