'Exercise 1 Let the inner product space (Rm , ( +) ) and a sequence of vectors {Tz} in Rm_ Assume that Jc € Rm limn ++0 - Tn I. Prove that Vv € Rm lim (Tn; " v) = (I,v)_ n+0'
Added by Joanna P.
Step 1
First, we know that the limit of the sequence {Tn} is T, which means that for any ε > 0, there exists an N such that for all n > N, ||Tn - T|| < ε. Show more…
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