The curve satisfies the differential equation
A.
Given curve is,
On differentiating both sides w.r.t. x, we get
Again, differentiating both sides w.r.t. x, we get
If u(x) and u(x) are two independent solutions of the differential equation
then additional solution(s) of the given differential equation is(are)
y = 5u(x) + 8v(x)
y = c1{u(x) - v(x)} + c2v(x), c1 and c2 are arbitrary constants
y = c1u(x)v(x) + c2u(x)v(x), c1 and c2 are arbitrary constant
y = u(x)v(x)
A family of curves is such that the length intercepted on the y-axis between the origin and the tangent at a point is three times the ordinate of the point of contact. The family of curves is
xy = C, C is a constant
xy2 = C, C is a constant
x2y = C, C is a constant
x2y2 = C, C is a constant
Let y be the solution of the differential equation
satisfying y(1) = 1. Then, y satisfies
y = xy - 1
y = xy
y = xy + 1
y = xy + 2