Can Eulus method be applied to solve the following
IVP in the interval (0,2) y' (t) = 4+y2, y(0)=0
Answers
Step-by-step explanation:
Euler's method is a numerical method that you can use to approximate the solution to an initial value problem with a differential equation that can't be solved using a more traditional method, like the methods we use to solve separable, exact, or linear differential equations
Use Euler's Method to find the approximation to the solution at t=1 , t=2 , t=3 , t=4 , and t=5 . Use h=0.1 , h=0.05 , h=0.01 , h=0.005 , and h=0.001 for the approximations. We'll leave it to you to check the details of the solution process. The solution to this linear first order differential equation is.
The Euler method often serves as the basis to construct more complex methods. Euler's method relies on the fact that close to a point, a function and its tangent have nearly the same value. Let h be the incremental change in the x-coordinate, also known as step size.
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