Mathematics, 02.11.2019 03:31 Spongebone4571
Modify lab04ex2.m so that it solves (l4.7) using euler’s method with n = 1000 in the interval 0 ≤ t ≤ 50 (use the file euler. m from lab 3 to implement euler’s method; do not delete the lines that implement ode45). let [te, ye] be the output of euler, and note that ye is a matrix with two columns from which the euler’s approximation to y(t) must be extracted. plot the approximation to the solution y(t) computed by ode45 (in black) and the approximation computed by euler (in red) in the same window (you do not need to plot v(t) nor the phase plot). are the solutions identical? comment. what happens if we increase the value of n?
Answers: 1
Mathematics, 21.06.2019 14:00
Which point is on the line y=-2+3? (-2,-1) (3,3) (3,-3) (-3,-9)
Answers: 2
Mathematics, 21.06.2019 16:50
Proceed as in example 3 in section 6.1 to rewrite the given expression using a single power series whose general term involves xk. ∞ n(n − 1)cnxn − 2 n = 2 − 4 ∞ ncnxn n = 1 + ∞ cnxn n = 0
Answers: 1
Mathematics, 22.06.2019 00:30
Graph the line y=4/3 x+1 . use the line tool and select two points on the line.
Answers: 1
Modify lab04ex2.m so that it solves (l4.7) using euler’s method with n = 1000 in the interval 0 ≤ t...
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