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(Section 11.3) Find the projection of u onto v and find the vector component of u orthogonal to v for: u=8 i+2j v = (2, 1, -2)
Find the orthogonal projection of v=[1 8 9] onto the subspace V of R^3 spanned by [4 2 1] and [6 1 2] (1 point) Find the orthogonal projection of v= onto the subspace V of R3 spanned by 2 6 and 1 2 9 projv(v)
2 6 (1 point) Find the orthogonal projection of v 14 onto the subspace V of Rspanned by 6 and 8 projv(v) =
19 -4 (1 point) Find the orthogonal projection of v17 onto the subspace V of R3 spanned by 4 and-6 7 4 533/51 projv(V)-1267/51 -448/51
(1 point) Find the orthogonal projection of -17 4 -10 V = -13 4 onto the subspace V of R4 spanned by -5 2 -2 -1 -18 Xi = and X2 = -4 projv(v) =
(1 point) Find the orthogonal projection of 0 0 -7 1 V = 4 onto the subspace V of R4 spanned by 1 -1 -1 -1 -1 -1 -1 1 , and 7 1 -1 1 proj,(v) =
show all work please, thanks Find the projection of vector v onto line L. v = <5,-1,2>, L: x=3, y + 4 22 3 # 1 , 2: Find the projection of vector 1. =(5,-1,2), l: x = onto line f. y+4 3, -1 Z-2 3 y + 4 22 3 # 1 , 2: Find the projection of vector 1. =(5,-1,2), l: x = onto line f. y+4 3, -1 Z-2 3
Verify that (u,,uz) is an orthogonal set, and then find the orthogonal projection of y onto Span (u.uz). 1-17 [3] 2,,= -1 . uz = = To verify that (uy,uz) is an orthogonal set, find u. U. Uyuz = 0 (Simplify your answer.) The projection of y onto Span{u,, 42} is (Simplify your answers.)
26 or 28 or both 25 28, find the vector projection of u onto v. Then write u In ExcTe wo orthogonal vectors, one of which is projyu. Insum of two orthogonal vect as a sum of two 26. (3.-7),2, 6) 27, u(8, 5), v 28, 2, 8), v-(9,-3 29 and 30, find the interior angles of the triangle with 25 28, find the vector projection of u onto v. Then write u In ExcTe wo orthogonal vectors, one of...
(1 point) Find the orthogonal projection of -1 -5 V = 9 -11 onto the subspace V of R4 spanned by -4 -2 -4. -5 X1 = and X2 1 -28 -4 0 projv(v)