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\begin{exerciseStatement}
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 Determine which of the following ODEs is exact. 
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\[ -4 \, t {y'} - 4 \, y = -6 \, t y {y'} - 3 \, y^{2} - 10 \, t \]\[ -4 \, t y^{2} + 3 \, y^{2} + 6 \, y {y'} - 4 \, y = 2 \, t^{2} {y'} \]
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 Then find an implicit solution for this exact ODE satisfying the initial value \(y( 1 )= -1 \). 
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\end{exerciseStatement}
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\begin{exerciseAnswer} 
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The following ODE is exact.
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\[ -4 \, t {y'} - 4 \, y = -6 \, t y {y'} - 3 \, y^{2} - 10 \, t \]
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 Its implicit solution satisfying the initial value is: 
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\[ 3 \, t y^{2} + 5 \, t^{2} - 4 \, t y = 12 \]
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\end{exerciseAnswer}
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