Consider the initial-value problem y'= 2x - 3y + 1, y(1) = 6. The analytic solution is = + =x + 47 e-3(x-1). 1 2. 9 3 9 (a) Find a formula involving c and h for the local truncation error in the nth step if Euler's method i y(x) 47 h²e-3(c-1) 2 (b) Find a bound for the local truncation error in each step if h = 0.1 is used to approximate y(1.5 0 225

Approximate y(1.5) using h = 0.1 and h = 0.05 with Euler's method

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Consider the initial-value problem y' = 2x - 3y + 1, y(1) = 6. The analytic solution is y(x) = 1 + x +47e² e-3(x - 1). (a) Find a formula involving c and h for the local truncation error in the nth step if Euler's method is -h²e² ‚—3(c-1) 47 (b) Find a bound for the local truncation error in each step if h = 0.1 is used to approximate y(1.5). 0.235