Solve the differential equation dy t - y(0)=1 dt y by the Euler method with h=0.1 to get y(0.2). Then repeat with h=0.2 to get another estimate of y(0.2). Extrapolate these results assuming that errors are proportional to step-size, and compare the derived result to the analytical result. L "

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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. Solve the differential equation
dy t
y(0)=1
dt
by the Euler method with h=0.1 to get y(0.2). Then repeat with
h=0.2 to get another estimate of y(0.2). Extrapolate these results
assuming that errors are proportional to step-size, and compare the
derived result to the analytical result.
Transcribed Image Text:. Solve the differential equation dy t y(0)=1 dt by the Euler method with h=0.1 to get y(0.2). Then repeat with h=0.2 to get another estimate of y(0.2). Extrapolate these results assuming that errors are proportional to step-size, and compare the derived result to the analytical result.
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