The area between `x = y^(2)` and x = 4 is divided into two equal parts by the line x= a, find the value of a.

If the point (a ,a) is placed in between the lines |x+y|=4, then find the values of adot

The parabolas y^(2) =4x and x^(2) =4y divide the square region bounded by the lines x=4,y=4 and the coordinates axes. If S_1 ,S_2, S_3 are the areas of these parts numbered from the top to bottom respectively,then-

The area enclosed between the curves y=x and x^(2) =y is equal to-

If line 3x-a y-1=0 is parallel to the line (a+2)x-y+3=0 then find the value of adot

If the lines y = 3x + 1 " and " 2y = x + 3 are equally inclined to the line y = mx + 4 ,find the value of m.

Find the area bounded by the x-axis, part of the curve y=(1+8/(x^2)) , and the ordinates at x=2a n dx=4. If the ordinate at x=a divides the area into two equal parts, then find adot

Shade the area bounded by y^(2) =8x and y=x above positive direction of x-axis and use integration to find the area of that part.

The acute angle between the line 3x-4y=5 and the circle x^2+y^2-4x+2y-4=0 is theta . Then find the value of 9costheta .

The value of the parameter a such that the area bounded by y=a^(2)x^(2)+ax+1, coordinate axes, and the line x=1 attains its least value is equal to