The solution of the differential equation
under the condition y = 1 when x = e is
A.
Given, the differential equation is,
It is a linear equation of the form
On putting C = in Eq. (i), 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