The non-exact differential (x² + y²)dx + (3xy² + 2xy + x³)dy = 0 can be reduced to exact after multiplying by the integrating factor None of these μ(ν) = 3 This Option μ(x) = e3x This Option
The non-exact differential (x² + y²)dx + (3xy² + 2xy + x³)dy = 0 can be reduced to exact after multiplying by the integrating factor None of these μ(ν) = 3 This Option μ(x) = e3x This Option
Chapter6: Exponential And Logarithmic Functions
Section6.1: Exponential Functions
Problem 60SE: The formula for the amount A in an investmentaccount with a nominal interest rate r at any timet is...
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The non-exact differential...(x² + y²)dx + (3xy² + 2xy + x³)dy = 0 can be
reduced to exact after multiplying by the integrating factor
None of these
μ(y) = 3
This Option
μ(x) = e3x
This Option
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