Using Maple..

Combine the simple shooting method(that's the first one we did) and the bisection method to find the solution of the differential equation y"+3e_3x = 0, with boundary conditions y(0) = 0, y(1) = -1. In this problem you should use the bisection method to find the root of the equation for a. (Your accuracy should be up to the 4^th decimal point. Do not use the Maple Bisection command). Your aim is to put everything in one Maple executable command, i.e., you should press the enter key once, and the whole program should run to completion*. It should include the plot of your result together with the plot of the exact solution, for comparison. Your eventual step h should be such that the agreement between the two solutions is good. *Of course, you should build your program in segments, and after you know they work, you can group them together. Combine the simple shooting method(that's the first one we did) and the bisection method to find the solution of the differential equation y"+3e_3x = 0, with boundary conditions y(0) = 0, y(1) = -1. In this problem you should use the bisection method to find the root of the equation for a. (Your accuracy should be up to the 4^th decimal point. Do not use the Maple Bisection command). Your aim is to put everything in one Maple executable command, i.e., you should press the enter key once, and the whole program should run to completion*. It should include the plot of your result together with the plot of the exact solution, for comparison. Your eventual step h should be such that the agreement between the two solutions is good. *Of course, you should build your program in segments, and after you know they work, you can group them together