Definition 28. Let V be a vector space over F (here F= R, C). Then the function(•₁•): V × V → Fis said to be an inner product on V if the following conditions are satisfied:(x, x) is realand (x,x) ≥ 0 for all(x,x) = 0 if and only ifx € 0₂.(i)(ii)(iii)(x, ay) = a(x, y) for allx, y V(iv)(x, y+z) = (x, y) + (x, z) for all(v) (x, y) = (y,x) for all x, y V.(a) (.,.): R¹ × R¹ → R is defined asxεν.(x, y) = x¹y,and for allx,y,z € V.Example: Verify that each of the following mappings define a real inner product.a EF.for all x, y ER".

A function define on a vector space V over F is said to be inner product, if the given five…

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Example: Verify that each of the following mappings define a real inner product. (a) (...): R¹ × R¹ → R is defined as (x, y) = x¹y, for all x, y ER".

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter8: Applications Of Trigonometry

Section8.3: Vectors

Problem 60E

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Question

Definition 28. Let V be a vector space over F (here F= R, C). Then the function
(•₁•): V × V → F
is said to be an inner product on V if the following conditions are satisfied:
(x, x) is real
and (x,x) ≥ 0 for all
(x,x) = 0 if and only if
x € 0₂.
(i)
(ii)
(iii)
(x, ay) = a(x, y) for all
x, y V
(iv)
(x, y+z) = (x, y) + (x, z) for all
(v) (x, y) = (y,x) for all x, y V.
(a) (.,.): R¹ × R¹ → R is defined as
xεν.
(x, y) = x¹y,
and for all
x,y,z € V.
Example: Verify that each of the following mappings define a real inner product.
a EF.
for all x, y ER".

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