`y=x + sin x,…. x = 0, x=(pi)/(2)`

y=sin x, ….. x = 0, x = (2pi)/(3)

y=sin^(2)x,…..x=0,x=(pi)/(4)

The area (in sq. units) bounded by y=max(sin^(2)x, sin^(4)x), x in [0, (pi)/(2)] with the x - axis, from x=0 to x=(pi)/(2) is

Let y = y (x) be the solution of the differential equation cos x (dy)/(dx) + 2y sin x = sin 2x , x in (0, pi/2) . If y(pi//3) = 0, " then " y(pi//4) is equal to :

If cos x (dy)/(dx)-y sin x = 6x, (0 lt x lt (pi)/(2)) and y((pi)/(3))=0 , then y((pi)/(6)) is equal to :-

Find the area bounded by the y-axis,y=cos x, and y=sin x when 0<=x<=(pi)/(2)

The area bounded by the curve y=|cos x-sin x|,0<=x<=(pi)/(2) and above x - axis is

Verify Rolle's theorem for each of the following functions on indicated intervals; f(x)=sin^(2)x on 0<=x<=pi f(x)=sin x+cos x-1 on [0,(pi)/(2)]f(x)=sin x-sin2x on [0,pi]

If sin^(4)x+cos^(4)y+2=4sin x*cos y and 0<=x,y<=(pi)/(2) then sin x+cos y is equal to

Solve x (dy) / (dx) sin ((y) / (x)) + xy sin ((y) / (x)) = 0 given y (1) = (pi) / (2)