Decompose v into two vectors, V, and v2, where v, is parallel to w and v2...
Decompose v into two vectors, V, and V2, where vais parallel to w and v2 is orthogonal to w. V= -1 -2], w = -21 - v1 = ( Oi+O; v2 = (i+O; (Simplify your answer.)
Decompose v into two vectors V, and V2, where V, is parallel to w and v2 is orthogonal to w. v=i-5j, w = 3i+j 1 29 3 7 O A. Vy=-51+ - 51, V2 = -51 5) 3 1 6 24 O B. Vy = - 51+ - 51, V2 = 51 5 3 1 8 24 OC. V = 5+ - 51, V2 = 51+ 2 2 5 43 OD. Vq = - 31+ - g), V2 = 3i+-gi
Given v = 10i - 4j and w=1- ), a. Find projwv. b. Decompose v into two vectors V, and V2, where V, is parallel to wand v2 is orthogonal to w. a. projwv= (Type your answer in terms of i andj.) b. Vo = (Type your answer in terms of i and j.) V2 (Type your answer in terms of i andj.)
Given v = 10i - 4j and w=-i-. a. Find prow b. Decompose v into two vectors V, and v2, where v, is parallel to wand v2 is orthogonal to w. a. projwv = (Type your answer in terms of i andj) b.vn - (Type your answer in terms of i andj) v2 = (Type your answer in terms of i andj) Enter your answer in each of the answer boxes 103 7/317
ho Determine whether v and w are parallel, orthogonal, or neither. v=3i - 5j 21 w=7i+5 Are vectors v and w parallel, orthogonal, or neither? O Parallel O Neither Orthogonal Click to select your answer
Suppose V1, V2, V3 is an orthogonal set of vectors in R5. Let w be a vector in span(V1, V2, V3) such that (V1, V1) = 51, (V2, V2) = 638, (V3, V3) = 36, (w, V1) = 153, (w, v2) = 4466, (w, V3) = -36, then W = _______ V1 + _______ V2+ _______ V3.
For the given vectors V, and V2, determine V1 + V2, V1 + V2, V1 - V2, V, X V2, V1 V2. Consider the vectors to be nondimensional. у V2 = 15 Vi = 11 4 3 28° --- V1 + V2 = 26 V, + V2 = k) V. - V2 = k) + i + Vix V2 = j+ k) V1 V2 =
(1 point) Find two vectors vi and v2 whose sum is (2, -5), where vi is parallel to (3,-1) while v2 is perpendicular to (3,-1). V1 and
חו (1 point) Suppose V1, V2, V3 is an orthogonal set of vectors in R Let w be a vector in span(V1, V2, V3) such that (v1,vi) = 24, (v2,v2) = 21, (V3, V3) = 9, (w,v) 120, (w, v2) = 147, (w,v3) -36, Vi+ V2+ then w= V3.
1 4 3 13 The vectors V1 = | 2 and V2 = 5 span a subspace V of the indicated Euclidean space. Find a basis for the orthogonal complement vt of V. 8 36 4 13 Select the correct choice below and, if necessary, fill in the answer box(es) within your choice. O A. A basis for the orthogonal complement vt is {}. (Use a comma to separate vectors as needed.) OB. There is no basis for the orthogonal...