A family of curves is given by the equation (x2/a2)+(y2/b2)=1. The differential equation representing this family of curves is given by x y (d2 y/d x2)+A x((d y/d x))2-y (d y/d x)=0. The value of A is

Question

A family of curves is given by the equation (x2/a2)+(y2/b2)=1. The differential equation representing this family of curves is given by x y (d2 y/d x2)+A x((d y/d x))2-y (d y/d x)=0. The value of A is (A) 0 (B) 1 (C) 3 (D) 5

Tardigrade Admin · Accepted Answer

Differentiating the equation (x2/a2)+(y2/b2)=1 w.r.t. x, we get (2 x/a2)+(2 y/b2) (d y/d x)=0 or (x2/a2)+(x y/b2) (d y/d x)=0 or 1-(y2/b2)+(x y/b2) (d y/d x)=0 [∵ (x2/a2)=1-(y2/b2)] Differentiating again w.r.t. x, we get (-2 y/b2) (d y/d x)+(y/b2) (d y/d x)+(x/b2) (d y/d x) ⋅ (d y/d x)+(x y/b2) (d2 y/d x2)=0 or x y (d2 y/d x2)+x((d y/d x))2-y (d y/d x)=0 comparing with the given differential equation, we get A =1.

Q. A family of curves is given by the equation a2x2​+b2y2​=1. The differential equation representing this family of curves is given by xydx2d2y​+Ax(dxdy​)2−ydxdy​=0. The value of A is

0

1

3

5

Q. A family of curves is given by the equation $\frac{x ^{2}}{a ^{2}} + \frac{y ^{2}}{b ^{2}} = 1$ . The differential equation representing this family of curves is given by $x y \frac{d ^{2} y}{d x ^{2}} + A x (\frac{d y}{d x})^{2} - y \frac{d y}{d x} = 0$ . The value of $A$ is