Let T : V → V be the adjacency operator of the Petersen graph as illustrated in the enclosed file. Here V is the vector space of all formal real linear combinations of the vertices v1, ... , U10 of the Petersen graph. 1. Show that the subspace spanned by u = v1 + v2 + V3 + V4 + v5 and w = v + v7 + Vg + v9 + V10 is stable under T, by calculating T(u) and T(w) explicitly. 2. Use part 1 to calculate (by hand) an eigenvector for T satisfying T(v) = 3v, and an eigenvector satisfying T(v) = v.

Let T : V → V be the adjacency operator of the Petersen graph as illustrated in the enclosed file. Here V is the vector space of all formal real linear combinations of the vertices v1, ... , U10 of the Petersen graph. 1. Show that the subspace spanned by u = v1 + v2 + V3 + V4 + v5 and w = v + v7 + Vg + v9 + V10 is stable under T, by calculating T(u) and T(w) explicitly. 2. Use part 1 to calculate (by hand) an eigenvector for T satisfying T(v) = 3v, and an eigenvector satisfying T(v) = v.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.7: Distinguishable Permutations And Combinations

Problem 12E

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Question

Let T : V → V be the adjacency operator of the Petersen graph as illustrated in the enclosed file. Here V is the
vector space of all formal real linear combinations of the vertices v1, .
... , v10 of the Petersen graph.
1. Show that the subspace spanned by u = v1 + v2 + V3 + V4 + V5 and w = V6 + v7 + Vg + V9 + V10 is
stable under T, by calculating T(u) and T(w) explicitly.
2. Use part 1 to calculate (by hand) an eigenvector for T satisfying T(v) = 3v, and an eigenvector satisfying
T(v) =
= v.

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