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ML KHANNA-INTEGRATION-PROBLEM SET (2)(MULTIPLE CHOICE QUESTIONS)
- I(m,n)=int0^1x^m(logx)^ndx =
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- If I(m,n)=int0^1t^m(1+t)^ndt,m,n,inR , then I (m,n) is
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- The solution of the equation overset(x)underset(log(2))int (1)/(e^(x)-...
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- Evaluate int1/((e^(x)-1)^(2))dx.
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- int(0)^(oo)(1)/(1+e^(x))dx=
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- int1/(x(x^n+1))dx =
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- int1/(x(x^3+1))dx =
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- int1/(xsqrt((1+x^n)))dx=
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- Evaluate int1/(xsqrt(1+x^3))dx
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- Let f (x) be a function satisfying f'(x) = f (x) with f (0) = 1 and g ...
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- If int g(x) dx = g (x) , then int(f(x) + f' (x)) g (x) dx is equal to
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- int(x^2dx)/((xsinx+cosx)^2) =
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- int0^(pi//4)((x^2)/(xsinx+cosx)^2)dx
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- int(-1)^(1/2)(e^x(2-x^2)dx)/((1-x)sqrt(1-x^2))i se q u a lto (sqrt(e)...
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- int(sqrt(x^(2)+1)[log(x^(2)+1)-2logx])/(x^(4))dx is equal to
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- int(x^(4)-1)/(x^(2)(x^(4)+x^(2)+1)^(1/2))dx" is equal to "
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- int(x^2-1)/(x^3sqrt(2x^4-2x^2+1))dxi se q u a lto (sqrt(2x^4-2x^2+1))...
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- intcos(blog""x/a)dx =
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- inte^(ax)cosbx dx =
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- If Im = int1^(e) (log x)^(m) dx, then Im+I(m-1) =
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