If `A_1` is the area of the parabola `y^2=4 ax` lying between vertex and the latusrectum and `A_2` is the area between the latusrectum and the double ordinate `x=2 a`, then `A_1/A_2` is equal to

If A_(1) is the area of the parabola y^(2)=4ax lying between vertex and the latusrectum and A_(2) is the area between the latusrectum and the double ordinate x=2a, then (A_(1))/(A_(2)) is equal to

Let A_(1) be the area of the parabola y^(2)=4ax lying between vertex and latus rectum and A_(2) be the area between latus rectum and double ordinate x=2a . Then A_(1)//A_(2)=

Area of the portion of the parabola y^(2)=4ax included between the X-axis, the ordinate at x = 2a and its latusrectum is

If A_1,A_2 be two AM's and G_1,G_2 be the two GM's between two number a and b , then (A_1+A_2)/(G_1G_2) is equal to

Let the circle x^2 + y^2 = 4 divide the area bounded by tangent and normal at (1, sqrt3) and x -axis in A_1 and A_2. Then A_1/A_2 equals to