The angle between the curves `y = sinx` and `y = cosx` is

The angle at which the curves y=sinx " and " y= cosx intersect in [0,pi], is

The angle between the curve 2y=e^(-x/2) and the y - axis is

Area enclosed by the curves y=sinx+cosx and y=abs(cosx-sinx) and the lines x=0 and x= pi/2

If A_1 is area between the curve y=Sinx , y=Cosx and y-axis in 1st quadrant and A_2 is area between y=Sinx , y=Cosx x= pi/2 and x-axis in 1st quadrant . Then find A_2/A_1

Draw a rough sketch of the curves y=sinx and y=cosx as x varies from 0 to pi/2 . Find the area of the region enclosed by the curves and the y-axis.

The area between the curves y=cosx, x-axis and the line y=x+1, is

The area of the region between the curves y= sqrt((1+sinx)/(cosx))and y = sqrt((1-sinx)/(cosx)) bounded by the lines x = 0 and x = pi/4 is

The area under the curve y=sinx , y=cosx , y-axis is A_1 , y=sinx , y=cosx , x-axis is A_2 then A_1:A_2 is

The angle of intersection between the curves y=[|sinx|+|cosx|] and x^(2)+y^(2)=5 , where [x] denotes the greatest integer, is theta , then the value of tan theta is