3.7.4. Let M be a finite-dimensional subspace of a normed space X. Suppose that n E M and any E X, but y M. Define M₁ = M + span{y} {m+cy: me M, CEF}. = (b) Given x M₁, let x = m₂ + cry as in part (a) and set ||||M₁ = ||m₂||+|c₂|. vormis Prove that M₁ is a norm on M₁. 139

Advanced Engineering Mathematics
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ISBN:9780470458365
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Chapter2: Second-order Linear Odes
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3.7.4. Let M be a finite-dimensional subspace of a normed space X. Suppose
that xn E M and rn - y E X, but y M. Define
M1 = M + span{y}
{m+cy : m € M, CEF}.
(b) Given a E M1, let r = m, + Czy as in part (a) and set
%3D
||||M, = ||m|| + |cl-
%3D
139
Prove that || - ||M, is a norm on M1.
Transcribed Image Text:3.7.4. Let M be a finite-dimensional subspace of a normed space X. Suppose that xn E M and rn - y E X, but y M. Define M1 = M + span{y} {m+cy : m € M, CEF}. (b) Given a E M1, let r = m, + Czy as in part (a) and set %3D ||||M, = ||m|| + |cl- %3D 139 Prove that || - ||M, is a norm on M1.
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