The Given Differential Equation is written as follows:
i.e.,
Integrating both sides,we get:
(1)
LHS =
(2)
RHS =
(3)
Substituting (2) & (3), equation (1) becomes:
i.e.,
i.e.,
i.e.,
i.e.
i.e.,
i.e.,
i.e.,
So, the solution of the given Differential Equation is:
Solve the given differential equation. (x2 4) dy (2x - 10xy) dx + 1 + 5...
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solve the differential equation dy y(x - y) dx x2
Find the solution of the differential equation with the given initial condition. Dy/dx = 2x + sec^2x/2y, y(0) = 5.
Consider the following differential equation. (x2 − 4) dy dx + 4y = (x + 2)2 Consider the following differential equation. dy (x2 - 4) dx + 4y = (x + 2)2 Find the coefficient function P(x) when the given differential equation is written in the standard form dy dx + P(x)y = f(x). 4 P(x) = (x2 – 4) Find the integrating factor for the differential equation. SP(x) dx 1 Find the general solution of the given differential equation....
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