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DIPTI PUBLICATION ( AP EAMET)-DEFINITE INTEGRATION-EXERCISE 1B
- If f(y)=e^(y),g(y)=y:ygt0andF(t)=int(0)^(t)f(t-y)g(y)dy, then
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- The solution for x of the equation int(sqrt2)^(x)(dt)//t(sqrt(t^(2)-1)...
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- int(log2)^(t)(dx)/(sqrt(e^(x)-1))=(pi)/(6), then t=
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- int(0)^(pi//2)(sqrt(sinx))/(sqrt(sinx)+sqrt(cosx))dx=
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- int(0)^(pi//2)(cos^(3//2)x)/(cos^(3//2)x+sin^(3//2)x)dx=
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- int(pi//6)^(pi//3)(sin^(3)x)/(sin^(3)x+cos^(3)x)dx=
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- int(0)^(pi//2)(secx)/(secx+cosecx)dx=
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- int(0)^(pi//2)(cotx)/(tanx+cotx)dx=
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- int(0)^(pi//2)(sqrt(cotx))/(sqrt(tanx)+sqrt(cotx))dx=
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- int(0)^(pi//2)(1)/(1+sqrt(cotx))dx=
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- int(0)^(pi//2)(dx)/(1+tan^(3)x)=
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- int(0)^(pi//2)(200sinx+100cosx)/(sinx+cosx)dx=
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- int(0)^(pi//2)(5tanx-3cotx)/(tanx+cotx)dx=
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- int(0)^(pi//2)(3secx+5cosecx)/(secx+cosecx)dx=
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- int(0)^(pi//2)log(tanx)dx=
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- int(0)^(oo)(logx)/(1+x^(2))dx=
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- The value of the integral int(0)^(oo)(xlogx)/((1+x^(2))^(2))dx is
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- Show that underset(0)overset(pi//2)int (x)/(sinx+cosx)dx=(pi)/(2sqrt(2...
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- Evaluate the integral underset(0)overset(pi)int (x sinx)/(1+cos^(2)x...
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- int(0)^(pi)(xtanx)/(secx+cosx)dx=
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