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For a first order linear differential equation the solution process is as given below:
1. Place the differential equation in the correct initial form, (1).
2. Determine the integrating factor, µ (t) and using (10).
3. Multiply everything in the differential equation through µ (t) and verify that the left side turns into the product rule (µ (t) y(t))' and write this as such.
4. Integrate both sides; ensure you properly deal along with the constant of integration.
5. Resolve for the solution y(t).
The subsequent type of first order differential equations which we'll be searching is correct differential equations. Before we find in the full details behind solving precise diff
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f Y is a discrete random variable with expected value E[Y ] = µ and if X = a + bY , prove that Var (X) = b2Var (Y ) .
need answer to integers that equal 36
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