" Let "I_(1)=int_(0)^(1)(e^(k))/(1+k)dk" and "I_(2)=int_(0)^(1)(k^(2)dk)/(e^(k^(3))(2-k^(3)))" then "(I_(1))/(I_(2))" is "

If I_(1)=int_(0)^(1)(e^(x))/(1+x)dx aand I_(2)=int_(0)^(1)(x^(2))/(e^(x^(3))(2-x^(3)))dx then (I_(1))/(I_(2)) is

Let f be a positive function. Let I_(1)=int_(1-k)^(k)x f[x(1-x)]dx , I_(2)=int_(1-k)^(k)f[x(1-x)]dx , where 2k-1gt0 . Then (I_(1))/(I_(2)) is

If i is the greatest of the definite integrals I_(1)=int_(0)^(1)e^(-x)cos^(2)dx,I_(2)=int_(0)^(1)e^(-x^(2))cos^(2)xdx and I_(3)=int_(0)e^(-x^(2))dx,I_(4)=int_(0)^(1)e^(-((x^(2))/(2)))dx then (A)I_(1)(B)I_(2)(C)I_(3)(D)I_(4)

Let f be a positive function.If I_(1)=int_(1-k)^(k)xf[x(1-x)]dx and I_(2)=int_(1-k)^(k)f[x(1-x)]backslash dx, where 2k-1>0. Then (I_(1))/(I_(2)) is

Let f be a positive function.Let I_(1)=int_(1-k)^(k)xf([x(1-x)])dxI_(2)=int_(1-k)^(k)f[x(1-x)]dx, where 2k-1>0. Then (I_(1))/(I_(2))is 2(b) k(c)(1)/(2) (d) 1

If I=sum_(k=2)^(10)int_(k)^(k^(2))(k-1)/(x(x-1))dx, then

Consider the integrals I_(1)=int_(0)^(1)e^(-x)cos^(2)xdx,I_(2)=int_(0)^(1) e^(-x^(2))cos^(2)x dx,I_(3)=int_(0)^(1) e^(-x^(2))dx and I_(4)=int_(0)^(1) e^(-x^(1//2)x^(2))dx . The greatest of these integrals, is

Consider the integrals I_(1)=int_(0)^(1)e^(-x)cos^(2)xdx,I_(2)=int_(0)^(1) e^(-x^(2))cos^(2)x dx,I_(3)=int_(0)^(1) e^(-x^(2))dx and I_(4)=int_(0)^(1) e^(-(1//2)x^(2))dx . The greatest of these integrals, is