if `int(1-5sin^2x)/(cos^5xsin^2x)dx=f(x)/(cos^5x)+c` then `f(x)`A. `-cotx`B. `-"cosec "x`C. `"cosec "x`D. cot x

if `int(1-5sin^2x)/(cos^5xsin^2x)dx=f(x)/(cos^5x)+c` then `f(x)`A. `-c

1.	if `int(1-5sin^2x)/(cos^5xsin^2x)dx=f(x)/(cos^5x)+c` then `f(x)`A. `-cotx`B. `-"cosec "x`C. `"cosec "x`D. cot x
Answer» Correct Answer - d Let `I=int(1-5 sin^(2)x)/(cos^(5)x sin^(2)x)dx` . Then, `I=int((cos^(2)x+sin^(2)x)-5sin^(2)x)/(cos^(5)x sin ^(2)x)dx` `rArr I=int(cos^(2)x-4sin^(2)x)/(cos^(5)xsin^(2)x)dx=int(cos^(5)x-4sin^(2)xcos^(3)x)/(cos^(8) xsin^(2)x)dx` `rArrI=int(d)/(dx)((1)/(cos^(4)xsinx))=(1)/(cos^(4)xsinx)+C` `rArrI=(cotx)/(cos^(5)x)+C` `rArr(f(x))/(cos^(5)x)+C=(cotx)/(cos^(5)x)+C` `rArr f(x) = cotx`.

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if `int(1-5sin^2x)/(cos^5xsin^2x)dx=f(x)/(cos^5x)+c` then `f(x)`A. `-cotx`B. `-"cosec "x`C. `"cosec "x`D. cot x

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