Find the coodinates of the point of intersection of the curves `y= cos x , y= sin 3x ` if `-(pi)/(2) le x le (pi)/(2)`

Find the coordinates of the points of intersection of the curves y=cos x,y=sin3xquad if-(pi)/(2)<=x<=(pi)/(2)

The co-ordinates of points of intersection of the curves y=cos x and y=sin3x,x in[-(pi)/(2),(pi)/(2)] are

The number of points of intersection of the curves 2y =1 " and " y = "sin" x, -2 pi le x le 2 pi , is

The angle of intersection of the curves y=2sin^(2)x and y=cos2x at x=(pi)/(6) is

Find the angle of intersection of the curves y^(2)=(2x)/(pi) and y=sin x

Find the angle of intersection of the curves y^2=(2x)/pi and y=sinx at x = pi/2 is .

The number of points in interval [ - (pi)/(2) , (pi)/(2)], where the graphs of the curves y = cos x and y= sin 3x , -(pi)/(2) le x le (pi)/(2) intersects is

Area of the region bounded by the curves y = tan x, y = cot x and X-axis in 0 le x le (pi)/(2) is

For -(pi)/(2)le x le (pi)/(2) , the number of point of intersection of curves y= cos x and y = sin 3x is