Find numbers xx and yy so that w⃗ −x⋅u⃗ −y⋅v⃗ w→−x⋅u→−y⋅v→ is perpendicular to both u⃗...

Find numbers x and y so that w⃗ −x⋅u⃗ −y⋅v⃗ w→−x⋅u→−y⋅v→ is perpendicular to both u⃗...

Find numbers x and y so that w⃗ −x⋅u⃗ −y⋅v⃗ w→−x⋅u→−y⋅v→ is perpendicular to both u⃗ and v⃗, where w⃗ =[9,132,42], u⃗ =[6,1,1], and v⃗ =[3,3,−21](notice that u⃗ is perpendicular to v⃗)

Find numbers x and y so that w-x⋅u-y⋅v is perpendicular to both u and v, where...

Find numbers x and y so that w-x⋅u-y⋅v is perpendicular to both u and v, where w=[-28,-25,39], u=[1,-4,2], and v=[7,3,2].

For the function w=f(x,y) , x=g(u,v) , and y=h(u,v). Use the Chain Rule to     Find...

For the function w=f(x,y) , x=g(u,v) , and y=h(u,v). Use the Chain Rule to     Find ∂w/∂u and ∂w/∂v when u=2 and v=3 if g(2,3)=4, h(2,3)=-2, gu(2,3)=-5,        gv(2,3)=-1 , hu(2,3)=3, hv(2,3)=-5, fx(4,-2)=-4, and fy(4,-2)=7    ∂w/∂u=    ∂w/∂v =

It is not true that the equality u x (v x w) = (u x v)...

It is not true that the equality u x (v x w) = (u x v) x w for all vectors. 1. Find explicit vector for u, v and w where this equality does not hold. 2. U, V and W are all nonzero vectors that satisfy the equality. Show that at least one of the conditions below holds: a) v is orthogonal to u and w. b) w is a scalar multiple of u. You can possibly use a...

Let s = f(x; y; z) and x = x(u; v; w); y = y(u; v;...

Let s = f(x; y; z) and x = x(u; v; w); y = y(u; v; w); z = z(u; v; w). To calculate ∂s ∂u (u = 1, v = 2, w = 3), which of the following pieces of information do you not need? I. f(1, 2, 3) = 5 II. f(7, 8, 9) = 6 III. x(1, 2, 3) = 7 IV. y(1, 2, 3) = 8 V. z(1, 2, 3) = 9 VI. fx(1, 2, 3)...

Suppose that A=[xy67]A=[x6y7] and B=[x0xy]B=[xx0y], for some real numbers xx and yy. Find all ordered pairs...

Suppose that A=[xy67]A=[x6y7] and B=[x0xy]B=[xx0y], for some real numbers xx and yy. Find all ordered pairs (x,y)(x,y) such that AB=BA AB=BA.

Let the linear transformation T: V--->W be such that T (u) = u2 If a, b...

Let the linear transformation T: V--->W be such that T (u) = u2 If a, b are Real. Find T (au + bv) , if u = (x, y) v = (z, w) and uv = (xz-yw, xw + yz) Let the linear transformation T: V---> W be such that T (u) = T (x, y) = (xy, 0) where u = (x, y), with 2, -3. Then, if u = ( 1.0) and v = (0.1). Find the value...

Let u=[6,2 ], v=[3,3 ], and b=[4,1 ]. Find (x⋅u+y⋅v-b)×2 u, where x,y are scalars.

Let u=[6,2 ], v=[3,3 ], and b=[4,1 ]. Find (x⋅u+y⋅v-b)×2 u, where x,y are scalars.

In 3 dimensions, draw vectors u, v, w, and x such that u+v+w=x. The vectors u...

In 3 dimensions, draw vectors u, v, w, and x such that u+v+w=x. The vectors u and x share an initium. You may pick the size of your vectors. Make sure the math works. Find the angle between vector x and vector u.

Find yy as a function of xx if y(4)−12y‴+36y″=0, y(0)=5,  y′(0)=14,  y″(0)=36,  y‴(0)=0 y(x)=?

Find yy as a function of xx if y(4)−12y‴+36y″=0, y(0)=5,  y′(0)=14,  y″(0)=36,  y‴(0)=0 y(x)=?