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

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 enclosed by the curve xy=1, x-axis and the ordinates x=1,x=2,and A_(2) is the area enclosed by the curve xy=1, x-axis and the ordinates x=2, x=4, then

Find the relation between acceleration a_(1) and a_(2)

Area of the triangle formed by the vertex, focus and one end of latusrectum of the parabola (x+2)^(2)=-12(y-1) is

Let A_(r) be the area of the region bounded between the curves y^(2)=(e^(-kr))x("where "k gt0,r in N)" and the line "y=mx ("where "m ne 0) , k and m are some constants A_(1),A_(2),A_(3),… are in G.P. with common ratio

Let V be the vertex and L be the latusrectum of the parabola x^2=2y+4x-4 . Then the equation of the parabola whose vertex is at V. Latusrectum L//2 and axis s perpendicular to the axis of the given parabola.

Let points A_(1), A_(2) and A_(3) lie on the parabola y^(2)=8x. If triangle A_(1)A_(2)A_(3) is an equilateral triangle and normals at points A_(1), A_(2) and A_(3) on this parabola meet at the point (h, 0). Then the value of h I s

Make the constraint relation between a_(1),a_(2) and a_(3)

The spectrum of a black body at two temperatures 27^(@)C and 327^(@)C is shown in the figure. Let A_(1) and A_(2) be the areas under the two curves respectively. Find the value of (A_(2))/(A_(1))

Using contraint equation. Find the relation between a_(1) and a_(2).