A circel centered at origin and having radius `pi` units is divided by the curve `y= sin x` in two parts. Then area of the upper part equals to :

The area bounded by the curve y =4 sin x, x-axis from x =0 to x = pi is equal to :

The area bounded by the curve y = sin x , x in [0,2pi] and the x-axis is equal to

The parabola y^(2)=2x divides the circle x^(2)+y^(2)=8 in two parts.Then,the ratio of the areas of these parts is

If the area bounded by the curve y= sin ax, y = 0, x=pi//a and x=pi //3a( a gt 0) , is 3 then a is equal to

Find area under the curve y=sin 2x between the ordinates x=pi/2 and x=pi .

If the ordinate x = a divides the area bounded by the curve y=1+(8)/(x^(2)) and the ordinates x=2, x=4 into two equal parts, then a is equal to

The radius of a sphere is r cm. Its divided into two equal parts. The whole surface area of two parts is _______.

Draw the diagram to show the area enclosed by the curves : y ^(2) =16 x and x ^(2) = 16y. The straight line x =4 divides the area into two parts. Find the area of the larger portion by integration.

There are 4 circles on the figure.Two of them have radius 2 and the smallest one has radius 1.If the area of the dashed part is equal to the area of the filled part then find the radius of the largest circle.r

Let f(x) be a polynomial of degree three such that the curve y=f(x) has relative extremes at x=+-(2)/(sqrt(3)) and passes through (0,0) and (1,-1) dividing the circle x^(2)+y^(2)=4 in two parts the ratio of the areas of two parts