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Exercise 3. For each of the following, show that the differential form is not exact, but becomes exact when multiplied through by the given integrating

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Exercise 3. For each of the following, show that the differential form is not exact, but becomes exact when multiplied through by the given integrating factor u(t, y). Then find the general solution to the differential form equation. (1) et dt + ( e' cot(y) + 2- y dy =0, u(t, y) = sin(y); sin(y)

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