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

Find a unit vector with positive first coordinate that is orthogonal to the plane through the...

Find a unit vector with positive first coordinate that is orthogonal to the plane through the points P = (-5, 4, -1), Q = (-3, 6, 1), and R = (-3, 6, 2).

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.

Given f(x,y) = 2y/sqrt(x) , find a unit vector u = (u1,u2) such that Duf(1,3) =...

Given f(x,y) = 2y/sqrt(x) , find a unit vector u = (u1,u2) such that Duf(1,3) = 0 and u1 > 0

Find a unit normal vector for the following function at the point P(−1,3,−10): f(x,y)=ln(−x/(−3y−z))

Find a unit normal vector for the following function at the point P(−1,3,−10): f(x,y)=ln(−x/(−3y−z))

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

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

Let u = ⟨1,3⟩ and v = ⟨4,1⟩. (a) Find an exact expression and a numerical...

Let u = ⟨1,3⟩ and v = ⟨4,1⟩. (a) Find an exact expression and a numerical approximation for the angle between u and v. (b) Find both the projection of u onto v and the vector component of u orthogonal to v. (c) Sketch u, v, and the two vectors you found in part (b).

Find an inner product on vector space P of polynomials that makes x and y orthogonal....

Find an inner product on vector space P of polynomials that makes x and y orthogonal. (x=1+t, y=1-t)

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 .

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?.

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