Slope Fields and Euler’s Method

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Presentation transcript:

Slope Fields and Euler’s Method 6.1 Slope Fields and Euler’s Method

Quick Review

Quick Review Solutions

What you’ll learn about Differential Equations Slope Fields Euler’s Method Essential Question How do we use differential equations and visually demonstrate them using slope fields?

Differential Equation An equation involving a derivative is called a differential equation. The order of a differential equation is the order of the highest derivative involved in the equation. Example Solving a Differential Equation

First-order Differential Equation If the general solution to a first-order differential equation is continuous, the only additional information needed to find a unique solution is the value of the function at a single point, called an initial condition. A differential equation with an initial condition is called an initial-value problem. It has a unique solution, called the particular solution to the differential equation.

Example Solving an Initial Value Problem Find the particular solution to the equation and y = 2 when x = 0.

Example Solving an Initial Value Problem Solve the initial value problem explicitly y = 3 when x = 1.

Example Solving an Initial Value Problem Find the particular solution to the equation whose graph passes through the point (1, ½ ).

Example Using the Fundamental Theorem to Solve an Initial Value Problem Find the solution to the differential equation for which f (3) = 5.

Slope Field The differential equation gives the slope at any point (x, y). This information can be used to draw a small piece of the linearization at that point, which approximates the solution curve that passes through that point. Repeating that process at many points yields an approximation called a slope field.

Example Constructing a Slope Field Construct a slope field for the differential equation At any point (0, y), the slope, dy/dx = cos 0 = At any point (p, y) or (-p, y), the slope, dy/dx = The slope of odd multiples of p/2 will be At any point (2p, y) or (-2p, y), the slope, dy/dx = If you connect these, the graph of the f (x) should appear.

Euler’s Method for Graphing a Solution to an Initial Value Problem Begin at the point ( x, y ) specified by the initial condition. Use the differential equation to find the slope dy /dx at the point. Increase x by Dx. Increase y by Dy, where Dy = (dy/dx) Dx. This defines a new point ( x + Dx, y + Dy) that lies along the linearization. Using this new point, return to step 2. Repeating the process constructs the graph to the right of the initial point. To construct the graph moving to the left from the initial point, repeat the process using negative values for Dx.

Example Applying Euler’s Method Use Euler’s method with increments of Dx = 0.1 to approximate the value of y when x = 1.5 given

Pg. 327, 6.1 #1-49 odd