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

The area under the curve y=sinx , y=cosx , y-axis is A_1 , y=sinx , y=cosx , x-axis is A_2 then A_1:A_2 is

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

Let L be the line created by rotating the tangent line to the parabola y=x^2 at the point (1,1), about A by an angle (-pi/4). Let B be the other intersection of line L with y=x^2. If the area inclosed by the L and the parabola is (a_1/a_2) where a_1 and a_2 are co prime numbers, find(a_1+a_2)

If the intercepts made by tangent, normal to a rectangular x^2-y^2 =a^2 with x-axis are a_1,a_2 and with y-axis are b_1, b_2 then a_1,a_2 + b_1b_2=

If A_1 is area between the curve y=Sinx , y=Cosx and y-axis in 1st quadrant and A_2 is area between y=Sinx , y=Cosx x= pi/2 and x-axis in 1st quadrant . Then find A_2/A_1

If the area of the circle is A_1 and the area of the regular pentagon inscribed in the circle is A_2, then find the ratio (A_1)/(A_2)dot

If the area of the circle is A_1 and the area of the regular pentagon inscribed in the circle is A_2, then find the ratio (A_1)/(A_2)dot