For x in R and a continuous function f,...

For `x in R` and a continuous function `f,` let `I_1=int_(sin^2t)^(1+cos^2t)xf{x(2-x)}dx` and `I_2=int_(sin^2t)^(1+cos^2t)f{x(2-x)}dx`.Then `(I_1)/(I_2)` is (a) -1 (b) 1 (c) 2 (d) 3

Similar Questions

Explore conceptually related problems

For x epsilonR , and a continuous function f let I_(1)=int_(sin^(2)t)^(1+cos^(2)t)xf{x(2-x)}dx and I_(2)=int_(sin^(2)t)^(1+cos^(2)t)f{x(2-x)}dx . Then (I_(1))/(I_(2)) is

I=int(sin^2x)/(1+cos x)dx

If I_(1)=int_(3pi)^(0) f(cos^(2)x)dx and I_(2)=int_(pi)^(0) f(cos^(2)x) then

If I_(1)=int_(1-x)^(x) x sin{x(1-x)}dx and I_(2)=int_(1-x)^(x) sin{x(1-x)}dx , then

Let f be a positive function. Let I_1=int_(1-k)^k xf([x(1-x)])dx , I_2=int_(1-k)^kf[x(1-x)]dx ,w h e r e2k-1> 0. T h e n(I_1)/(I_2)i s 2 (b) k (c) 1/2 (d) 1

If f(x)=(e^x)/(1+e^x), I_1=int_(f(-a))^(f(a))xg(x(1-x)dx and I_2=int_(f(-a))^(f(a)) g(x(1-x))dx , then the value of (I_2)/(I_1) is (a) -1 (b) -2 (c) 2 (d) 1

Let f be a positive function. If I_1 = int_(1-k)^k x f[x(1-x)]\ dx and I_2 = int_(1-k)^k f[x(1-x)]\ dx, where 2k-1 gt 0. Then I_1/I_2 is

Let I_(1)=int_(0)^(1)(|lnx|)/(x^(2)+4x+1)dx and I_(2)=int_(1)^(oo)(lnx)/(x^(2)+4x+1)dx , then

If I_1=int_0^pixf(sin^3x+cos^2x)dxa n d I_2=int_0^(pi/2)f(sin^3x+cos^2x)dx ,t h e nr e l a t eI_1a n dI_2

If I_1=int_0^pixf(sin^3x+cos^2x)dxand I_2=int_0^(pi/2)f(sin^3x+cos^2x)dx , then relate I_1 and I_2

For `x in R` and a continuous function `f,` let `I_1=int_(sin^2t)^(1+cos^2t)xf{x(2-x)}dx` and `I_2=int_(sin^2t)^(1+cos^2t)f{x(2-x)}dx`.Then `(I_1)/(I_2)` is (a) -1 (b) 1 (c) 2 (d) 3

Similar Questions

Recommended Questions