Use the Euler's Method to approximate the solution of the equation. Complete the table. dy dx x+2y², y(0) = 2, Ax = 0.05, n = = 5 (number of points)

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Sure! Below is a transcription suitable for an educational website: --- **Using Euler's Method to Approximate Solutions of a Differential Equation** We are tasked with approximating the solution of the following differential equation using Euler's Method: \[ \frac{dy}{dx} = x + 2y^2 \] With the initial condition given as: \[ y(0) = 2 \] And the parameters specified as: - \( \Delta x = 0.05 \) - \( n = 5 \) (number of points) **Euler's Method Formula:** \[ y_n = y_{n-1} + \Delta x \cdot f(x_{n-1}, y_{n-1}) \] **Table for Euler's Method Approximation:** | \( n \) | \( x_n \) | \( y_n \) | |---------|-----------|-----------| | 0 | | | | 1 | | | | 2 | | | | 3 | | | | 4 | | | | 5 | | | **Instructions:** 1. Use the initial condition to fill in the values at \( n = 0 \). 2. Apply Euler's Method iteratively to compute \( y_n \) for each subsequent \( n \). 3. Complete the table by calculating the approximate values of \( y_n \) at discrete points \( x_n \). This process aids in understanding how numerical methods can be used to solve differential equations by approximating solutions at discrete points.