First prove Schwartz inequality; |x ・ y| ≤ ∥x∥∥y∥ Then show ∥x + y∥ ≤ ∥x∥ + ∥y∥ Then show d_2 (x,y) = ∥x - y∥ Is one meter.

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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In〖 R〗^n, Euclidean internal and soft multiplication are defined as follows;

x.y=∑_(j=1)^n▒〖x_j y_(j,) 〗 x=(x_1 ,x_2 ,…,x_(n ) ),y=(y_1 ,y_2 ,…,y_(n ) );
‖x‖=√(x⋅x)=〖( ∑_(j=1)^n▒〖|x_j | ) 〗〗^(1/2) (x=(x_1 ,…,x_(n ) )).
First prove Schwartz inequality; |x ・ y| ≤ ∥x∥∥y∥
Then show ∥x + y∥ ≤ ∥x∥ + ∥y∥
Then show d_2 (x,y) = ∥x - y∥ Is one meter.

In R", Euclidean internal and soft multiplication are defined as
follows;
x. y =
XjYj,
x = (x1 , x2 , ..., Xn ), y = (y1 , Y2 , ., Yn);
j=1
1/2
||x|| = Vx · x =
Vx•x = x;)
(x = (x1 , ..,Xn )).
j=1
A) First prove Schwartz inequality; |x•y[ < || x |Il y |
B) Then show || x + y ||< || x || + || y ||
C) Then show d2(x, y) = || x – y || Is one meter.
Transcribed Image Text:In R", Euclidean internal and soft multiplication are defined as follows; x. y = XjYj, x = (x1 , x2 , ..., Xn ), y = (y1 , Y2 , ., Yn); j=1 1/2 ||x|| = Vx · x = Vx•x = x;) (x = (x1 , ..,Xn )). j=1 A) First prove Schwartz inequality; |x•y[ < || x |Il y | B) Then show || x + y ||< || x || + || y || C) Then show d2(x, y) = || x – y || Is one meter.
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