Problem 6.2. Prove that for every vector space E, if f E E is an map, i.e., fof = f, then we have a direct sum idempotent linear E KerfImf, so that f is the projection onto its image Im f (d) Assume that E is finite-dimensional, and let f : E -> E be any p > 2 linear map such that fi fidE Prove that the following properties f= fi, 1 i < p. fio fi 0 for all i /j, 1 << i, j < p Hint Use problem 6.2 Let U1,. . , U, be any p > 2 subspaces of some vector space E. Prove that equivalent are U is a direct sum iff १ ( i-1 Συ (0), i 2,... , p Uin j-1

Advanced Engineering Mathematics
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Chapter2: Second-order Linear Odes
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Please solve question (d) but the question gave a hint to use problem 6.2 which I have uploaded together with question (d). Thank you.

Problem 6.2. Prove that for every vector space E, if f E E is an
map, i.e., fof = f, then we have a direct sum
idempotent linear
E KerfImf,
so that f is the projection onto its image Im f
Transcribed Image Text:Problem 6.2. Prove that for every vector space E, if f E E is an map, i.e., fof = f, then we have a direct sum idempotent linear E KerfImf, so that f is the projection onto its image Im f
(d) Assume that E is finite-dimensional, and let f : E -> E be any p > 2 linear
map such that
fi fidE
Prove that the following properties
f= fi, 1 i < p.
fio fi 0 for all i /j, 1 << i, j < p
Hint Use problem 6.2
Let U1,. . , U, be any p > 2 subspaces of some vector space E. Prove that
equivalent
are
U is a direct sum iff
१ (
i-1
Συ
(0), i
2,... , p
Uin
j-1
Transcribed Image Text:(d) Assume that E is finite-dimensional, and let f : E -> E be any p > 2 linear map such that fi fidE Prove that the following properties f= fi, 1 i < p. fio fi 0 for all i /j, 1 << i, j < p Hint Use problem 6.2 Let U1,. . , U, be any p > 2 subspaces of some vector space E. Prove that equivalent are U is a direct sum iff १ ( i-1 Συ (0), i 2,... , p Uin j-1
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