Q3 please Write on paper and write the question too so I can print. Thanks a lot. Will upvote if done. 3. Let C[0, 1] be equipped with the inner product (f.g) = f f(x)g(x)dx, where f = f(x) and g = g(x).Let f = x. Find ||f||.b.)answer.Let f = x² and g = (1-x)². Are x and y orthogonal in this inner product space? Justify your

Given that is equipped with inner product .(a) Given . We need to find .(b) Given and . We need to…

Answered: Let C[0, 1] be equipped with the inner…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Q8 and Q9 please thank you !
Haylee wrote two numbers on the chalkboard. The numbers she wrote were 5.7 and -6- 1 What would be the product of the two numbers Haylee wrote? Record your answer in the boxes below. Be sure to use the correct place value. +/-
et △ABC be a triangle in S^2 (the two-dimensional sphere). Let the dual point C'∈S^2 of C be defined by the following three conditions:(i) d(C' , A)=π/2(ii) d(C' , B)=π/2(iii) d(C' , C)≤π/2A' and B' are defined analogously. Thus we get a dual triangle △A' B' C'. More precisely, △ABC is a non-degenerate triangle, andit follows (you may assume) that △A' B' C' is too.(question) Are there triangles △ABC in S^2 identical to their own dual △A'B'C'? I would be very thankful if you could provide some explanation with the steps, thank you in advance.

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Let C[0, 1] be equipped with the inner product (f. g) = ff(x) g(x) dx, where f = f(x) and g = g(x). ) Let f = x². Find ||'||. -) nswer. Let f= x² and g = (1-x)². Arex and y orthogonal in this inner product space? Justify your