" Suppose that "F(x)" is an antiderivative of "f(x)=(sin x)/(x),x>0" then "int_(1)^(3)(sin2x)/(x)dx" can be expressed as "

Suppose that F(x) is an anti-derivative of f(x)=(sin x)/(x), wherex >0. Then int_(1)^(3)(sin2x)/(x)dx can be expressed as (a) F(6)-F(2)( b ) (1)/(2)(F(6)-f(2))( c) (1)/(2)(F(3)-f(1))( d) 2(F(6))-F(2))

Suppose that F(x) is an anti derivative of f(x)=(sinx)/x , where xgt0 . Then int_(1)^(3)(sin2x)/x dx can be expressed as

Suppose that F (x) is an antiderivative of f (x)=sinx/x,x>0 , then int_1^3 (sin2x)/x dx can be expressed as

Suppose that F (x) is an antiderivative of f (x)=sinx/x,x>0 , then int_1^3 (sin2x)/x dx can be expressed as

Find the antiderivative of sin2x+3x

Evaluation of definite integrals by subsitiution and properties of its : If anti derivative of f(x)=(sinx)/(x) is F(x) then int_(1)^(3)(sin2x)/(x)dx=.........(xgt0)

If f(x)+f(3-x)=0 ,then int_(0)^(3)1/(1+2^(f(x)))dx=

If f(x)+f(3-x)=0 , then int_(0)^(3)1/(1+2^(f(x)))dx=

Let f(x)=sin^(4)x-cos^(4)x int_(0)^((pi)/(2))f(x)dx =