Comparing VectorsIn Exercises 21–26, determine whether
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Calculus
- Write v as the sum of two vector components if v = i + 3j and w = 2i+j. O v = (-2i+2j) + (i + j) O v = (-i+j) + (-2i+2j) O v= (-i+2j) + (i + 2j) O v= (2i+j) + (-i + 2j) vy rain later F1 1 O Q A F2 -ő- @ 2 W S F3 -☀+ Alt # 3 E F4 D $ A LA 4 F5 R S F Q Search er do % 5 F6 T F7 6 G Y F8 & 7 H U F9 8 J F10 1 ( 9 Z X CV BN M F11 K a O @ 0arrow_forwardQuestion: Suppose that v1=(2,1,0,3), v2=(3,-1,5,2), and v3=(-1,0,2,1). Which of the following vectors are in span ? Explain your work. A) (2, 3, -7, 3) B) (0, 0, 0 ,0) C) (1, 1, 1, 1) D) (-4, 6, -13, 4) My Comments: I've attempted this problem by setting the vectors equal to the multiple choice answers. I placed them in augmented form and took the reduced row echelon form. However, so far A and B are coming out equal making me conclude that A and B are in span. Am I solving this correctly? Did I get it right? (I've attached my work as well.)arrow_forward1: Find u · v, u u, and v v. (a) u = (1, 1, -2, 3), v = (-1,0, 5, 1) (b) u = (2, –1, 1,0, -2), v= (1, 2, 2, 2, 1)arrow_forward
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