The area exclosed by the curves `y=sinx+cosx` and `y=|cosx-sinx|` over the interval `[0,(pi)/(2)]` is

The area enclosed by the curve y=sinx+cosxa n dy=|cosx-sinx| over the interval [0,pi/2] is (a)4(sqrt(2)-2) (b) 2sqrt(2) ( sqrt(2) -1) (c)2(sqrt(2) +1) (d) 2sqrt(2)(sqrt(2)+1)

The area bounded by the curves y=cosx and y=sinx between the ordinates x=0 and x=(3pi)/2 is

Find the area bounded by the y-axis, y=cosx ,and y=sinx when 0lt=xlt=pi/2dot

If cosx+sinx=sqrt2cosx and cosx-sinx=k.sinx, then k^2=?

The area (in squnit) bounded by the curve y= sinx , x-axis and the two ordintes x= pi,x=2pi is

cot2x = cosx + sinx

sinx + cosx = 1/sqrt(2)

The angle of intersection between the curves y=[|sinx|+|cosx|] and x^(2)+y^(2)=10 , where [x] denotes the greatest integer ltx , is-

The area (in square unit ) bounded by the curve y= sinx between the ordinates x=0, x= pi and the x -axis is-

The angle of intersection between the curves y=[|sinx|+|cosx|]andx^2+y^2=10 , where [x] denotes the greatest integer lex , is