3. Let X = {r1, T2, X3, T4} and let b: X x X – [0, 00) be symmetric with b(x1, x2) = b(x2, x3) = b(x2, x3) = b(x3, T4) = b(x4, x1) = 1 and 0 otherwise. Let c = 0. Let f(x1) = 0 = f(x2), f (x3) = 1 and f(¤4) = 0. Let a = 1. Find u hich satisfies %3D (Lb.c + a)u= f. Is u unique? Why or why not? What happens when you solve (Lt.c+ a)u=0 instead?

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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3. Let X = {r1, T2, X3, T4} and let b: X x X – [0, 00) be symmetric with
b(x1, x2) = b(x2, x3) = b(x2, x3) = b(x3, T4) = b(x4, x1) = 1
and 0 otherwise. Let c = 0. Let f(x1) = 0 = f(x2), f (x3) = 1 and f(¤4) = 0. Let a = 1.
Find u hich satisfies
%3D
(Lb.c + a)u= f.
Is u unique? Why or why not? What happens when you solve
(Lt.c+ a)u=0
instead?
Transcribed Image Text:3. Let X = {r1, T2, X3, T4} and let b: X x X – [0, 00) be symmetric with b(x1, x2) = b(x2, x3) = b(x2, x3) = b(x3, T4) = b(x4, x1) = 1 and 0 otherwise. Let c = 0. Let f(x1) = 0 = f(x2), f (x3) = 1 and f(¤4) = 0. Let a = 1. Find u hich satisfies %3D (Lb.c + a)u= f. Is u unique? Why or why not? What happens when you solve (Lt.c+ a)u=0 instead?
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