Let `P` be the point on the curve `4x^2+\ alpha^2y^2=4a^2,0

Let P be the point on the curve 4x^(2)+alpha^(2)y^(2)=4a^(2),0

Let P be the point on curve 4x^2+α^2 y^2=4α^2 , 0 A. 1 B. 2 C. 3 D. 4

Find the point on the curve 4x^2 + a2y^2 = 4a^2, 4 < a^2 < 8 that is farthest from the point (0,-2)

Examine whether point (1, 2) lies on the curve 4x^2 - y^2 =0 .

Examine whether point (1, 2) lies on the curve 4x^2 - y^2 =0 .

Let A be the point where the curve 5 alpha ^(2) x ^(3) +10 alpha x ^(2)+ x + 2y - 4=0 (alpha in R, alpha ne 0) meets the y-axis, then the equation of tangent to the curve at the point where normal at A meets the curve again, is:

Let A be the point where the curve 5 alpha ^(2) x ^(3) +10 alpha x ^(2)+ x + 2y - 4=0 (alpha in R, alpha ne 0) meets the y-axis, then the equation of tangent to the curve at the point where normal at A meets the curve again, is:

The point on the curve 4x^2+a^2y^2=4a^2 ; 4lta^2lt8 that is farthest from the point (0,-2) is

The point on the curve 4x^2+a^2y^2=4a^2 ; 4lta^2lt8 that is farthest from the point (0,-2) is

The point on the curve 4x^(2)+a^(2)y^(2)=4a^(2)4