Let's solve the equation dv/dt = 9.8 - 0.196v
Let's put this equation in its general form: dv/dt + 0.19v = 9.8.
Let's find the magical function μ(t). The solution of the general form of the first linear differential equation above defines this function as:
In the differential equation p(t) = 0.19 therefore
Let's multiply both sides of the equation by the value of μ(t)
The left side of the equation is the derivative of the product
Therefore we have
Let's integrate both sides of the equation we have:
1) We make sure that the differential equation is written in its proper explicit form
2) We find the integrating factor
4) We substitute the left side of the equation by the derivative of a product
5) We integrate both sides of the equation in order to find the unknown
Practice. Solve the following differential equation dy/dx = 3 + 2.5y
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