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- Exact Differential Equation
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- Homogeneous Differential Equation
- Integrate by partial fractions
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- FOIL Method
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When we identify that a differential equation has an expression of the form $Ax+By+C$, we can apply a linear substitution in order to simplify it to a separable equation. We can identify that $x-y+1$ has the form $Ax+By+C$. Let's define a new variable $u$ and set it equal to the expression
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$u=x-y+1$
Learn how to solve problems step by step online. Solve the differential equation dy/dx=sin(x-y+1). When we identify that a differential equation has an expression of the form Ax+By+C, we can apply a linear substitution in order to simplify it to a separable equation. We can identify that x-y+1 has the form Ax+By+C. Let's define a new variable u and set it equal to the expression. Isolate the dependent variable y. Differentiate both sides of the equation with respect to the independent variable x. Now, substitute x-y+1 and \frac{dy}{dx} on the original differential equation. We will see that it results in a separable equation that we can easily solve.