6. Suppose that the coefficient functions p(t) and q(t) are continuous in the interval (0, x), and the functions y,(t) = t,y2(t) = sint are solutions of the ODE y" + p(t)y +q(t)y=0 0

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Answer 6a. Suppose that the coefficient functions p(t) and q(t) are continuous in the interval (0,π), and the functions ?1(?) = ?, ?2(?) = ???? are solutions of the ODE
6. Suppose that the coefficient functions p(t) and q(t) are continuous in the interval (0, x),
and the functions y, (t) = t, y2(t) = sint are solutions of the ODE
y" + p(t)y' +q(t)y=0
0 <t < n
a) Compute the Wronskian of y, y2. Are they linearly independent on the interval
(0, n)
b) Is the pair {y, Y2} fundamental set of solutions for the ODE?
c) Find the solutions y(t) of the initial value problem for the ODE with initial conditions
y(T/2) = 0, y'(/2) = 2
Transcribed Image Text:6. Suppose that the coefficient functions p(t) and q(t) are continuous in the interval (0, x), and the functions y, (t) = t, y2(t) = sint are solutions of the ODE y" + p(t)y' +q(t)y=0 0 <t < n a) Compute the Wronskian of y, y2. Are they linearly independent on the interval (0, n) b) Is the pair {y, Y2} fundamental set of solutions for the ODE? c) Find the solutions y(t) of the initial value problem for the ODE with initial conditions y(T/2) = 0, y'(/2) = 2
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