Line x =0 divides the region mentioned above in two parts,The ratio of the area left-hand side of the line to that of right-hand side of the line is-

Ratio of the area of two similar triangle is 16:25. find the ratio of their sides.

Using intregation find the area of the region bounded by the line 2y + x=8 and the lines x= 2 and x =4

Point R (h, k) divides a line segment between the axes in the ratio 1:2 Find equation of the line.

Let ABCD is a square with sides of unit lenghts . Points E and F are taken on sides AB and AD respectively so that AE =AF . Let P be a point inside the square ABCD. Let a line passing throught point A divides the square ABCD into two parts so that area of one part is double to another , then lenght of the line segment inside the square is -

The area of the region bounded by the curves y=x^(2),y=|2-x^(2)| and y=2 which lies to the right of the line x=1, is

x axis divides the line segment containing two endpoints (3, 6) and (2,-5) in the ratio is

If the ratio of the sides of two similar triangles be 4:9 , then ratio of areas will be

(a , 2b ) divides the line segment joining by the points (3a,0),(0,3b) in the ratio-

If a triangle is inscribed in an ellipse and two of its sides are parallel to the given straight lines, then prove that the third side touches the fixed ellipse.

Find the ratio in which the area bounded by the curves y^2=12 x and x^2=12 y is divided by the line x=3.