Find a unit vector orthogonal to the vectors ? = 〈1,5, −2〉 and ?⃗ = 〈−1,3,0〉.

Find the angle theta between vectors u=(5,6) and v=(-8,7). Find a unit vector orthogonal to v.

Find the angle theta between vectors u=(5,6) and v=(-8,7). Find a unit vector orthogonal to v.

(1 point) Find a non-zero vector x⃗ perpendicular to the vectors v⃗ =[1,5,−2] and u⃗ =[1,4,3]....

(1 point) Find a non-zero vector x⃗ perpendicular to the vectors v⃗ =[1,5,−2] and u⃗ =[1,4,3]. x⃗ = [ , , ]

Find two unit and orthogonal vectors a 〈?, ?, ?〉 and 〈−?, ?, ?〉.

Find two unit and orthogonal vectors a 〈?, ?, ?〉 and 〈−?, ?, ?〉.

find any vectors which are orthogonal to the vector <2,5,-3>

find any vectors which are orthogonal to the vector <2,5,-3>

Find two unit vectors orthogonal to both 2, 4, 1 and −1, 1, 0 .

Find two unit vectors orthogonal to both 2, 4, 1 and −1, 1, 0 .

Find a unit vector orthogonal to <1,3,-1> and <2,0,3>

Find a unit vector orthogonal to <1,3,-1> and <2,0,3>

Find two unit vectors orthogonal to both given vectors. i + j + k,   3i +...

Find two unit vectors orthogonal to both given vectors. i + j + k,   3i + k < _ , _ , _ > (smaller i-value) < _ , _ , _ > (larger i-value)

Find two unit vectors orthogonal to ?=〈−4,4,5〉a=〈−4,4,5〉 and ?=〈4,0,−4〉b=〈4,0,−4〉 Enter your answer so that the first...

Find two unit vectors orthogonal to ?=〈−4,4,5〉a=〈−4,4,5〉 and ?=〈4,0,−4〉b=〈4,0,−4〉 Enter your answer so that the first vector has a positive first coordinate

Show complete solution. 1. Find two unit vectors that are parallel to the ?? −plane and...

Show complete solution. 1. Find two unit vectors that are parallel to the ?? −plane and are orthogonal to the vector ? = 3? − ? + 3?.

1) If u and v are orthogonal unit vectors, under what condition au+bv is orthogonal to...

1) If u and v are orthogonal unit vectors, under what condition au+bv is orthogonal to cu+dv (where a, b, c, d are scalars)? What are the lengths of those vectors (express them using a, b, c, d)? 2) Given two vectors u and v that are not orthogonal, prove that w=‖u‖2v−uuT v is orthogonal to u, where ‖x‖ is the L^2 norm of x.