Question

Use the inner product <u, v>= 2u₁v₁ + u₂v₂ in R² and the Gram-Schmidt orthonormalization process to transform  {(−2, 1), (−2, 7)}

into an orthonormal basis. (Use the vectors in the order in which they are given.)

Answer 1

Given that lot IR? Solhr <u,us = 24,4+ u "2 and {(-2,1),(-2,7)} 04 = (-2,1), de (-2,7) and {B, Bas be orthogonal basis for and {ring} be orthonormal basis for 18² Then by Gramschmidt orthognormalization process, are get B = 0,= (-2,1) + B2 = </2, 8,2 B 0 ee (from ol AA (d 2, 8,) <l-2,7), -2,1) = 26-2)62)+ 7/1) : +847 =15 and <B, , ß, ) = <!-2, 1), (2, 1)) 26-2)(-2) + 0+1 = 9 IS (-2, 1) 9 10 - B2 = (-2,7) =(-2,7) - (- (-2+ 18 , 7-23) 5 3 ) 1

出 m <p: A) A op P. Now, (21) (from) (9) (-2, )) 3 and i =(34) B. A. : : IP, <4.A.yjx (A) = 244 + Now, 十 3 3 3 3 32 256 9 9 32 1. r = NS 280 9 (子 %) 3 3 (33) 4.5 (子,学) EG) 6 2 NS 25 2 26 1. The orthonormal basis for 1R² is * ),(, 2.) 3 -