This video shows how to use Laplace transforms to determine Y(s) given a differential equation and initial conditions.

# Laplace Transform: Find Y(s)=L(y) Given a Nonhomogeneous Differential Equation

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# Laplace Transform: Find Y(s)=L(y) Given a Nonhomogeneous Differential Equation

# Laplace Transform: Find Y(s)=L(y) Given a Homogeneous Differential Equation

This video shows how to use Laplace transforms to determine Y(s) given a differential equation and initial conditions.

# Write a Differential Equation to Model the Change in a Bank Account: Changing Deposit Amount

# Ex: Solve an IVP with a Separable Differential Equation in the form (y^6x)dy/dx=1+x

# Ex: Solve an IVP with a Separable Differential Equation in the form dy/dt=t/(t^2y+y)

This video explains how to solve in initial value problem involving a separable differential equation.

# Ex: Solve an IVP with a Separable Differential Equation in the form y’=axy-bx

This video explains how to solve in initial value problem involving a separable differential equation.

# Differential Equaitons: Find the Order and Classify as Linear or Nonlinear

This video shows how to use Laplace transforms to determine Y(s) given a differential equation and initial conditions.

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This video explains how to write a differential equation to model the change in the balance of an bank account that pay continuous interest and the deposit amounts increase continuously.

This video explains how to solve in initial value problem involving a separable differential equation.

This video explains how to determine the order of a differential equation and how to determine if it is linear or nonlinear.