find using the starting point a point symmetrical to the plane x-2y+4z-21 = 0.

find using the starting point a point symmetrical to the plane x-2y+4z-21 = 0.

Find the point of intersection of the line x(t) = (0, 1, 3) + (–2, –...

Find the point of intersection of the line x(t) = (0, 1, 3) + (–2, – 1, 2)t with the plane 4x + 5y – 4z = 9. And Find the distance from the point (2, 3, 1) to the plane 3x – 2y + z = 9

Use Lagrange multipliers to find the point on the plane   x − 2y + 3z =...

Use Lagrange multipliers to find the point on the plane   x − 2y + 3z = 6 that is closest to the point (0, 2, 5). (x, y, z) =

Find the distance from the point (6, 1, −1) to the plane x − 2y +...

Find the distance from the point (6, 1, −1) to the plane x − 2y + 2z + 1 = 0.

find dx/dx and dz/dy z^3 y^4 - x^2 cos(2y-4z)=4z

find dx/dx and dz/dy z^3 y^4 - x^2 cos(2y-4z)=4z

Find the parametric equations of the line in which the planes x+2y+4z=1and -2x-2y+z=4 intersect.

Find the parametric equations of the line in which the planes x+2y+4z=1and -2x-2y+z=4 intersect.

Find equations of the tangent plane and normal line to the surface x=2y^2+2z^2−159x at the point...

Find equations of the tangent plane and normal line to the surface x=2y^2+2z^2−159x at the point (1, -4, 8). Tangent Plane: (make the coefficient of x equal to 1). =0. Normal line: 〈1,〈1, ,  〉〉 +t〈1,+t〈1,  ,

Determine whether the planes x−2y+3z−4 = 0 and −2x+5y+4z = −1 are orthogonal.

Determine whether the planes x−2y+3z−4 = 0 and −2x+5y+4z = −1 are orthogonal.

Consider the plane x + 2y + z = 2 and the point P = (2,0,4)...

Consider the plane x + 2y + z = 2 and the point P = (2,0,4) A) Set up an equation to measure the distance d from P to an arbitrary point (x,y,z) on the plane B) Find the pointe on the plane that is closest to P C) What is the shortest distance between point P and the plane?

−6x+4y−5z= 19 −x−2y−4z=−9 −5x+y+4z=−10

−6x+4y−5z= 19 −x−2y−4z=−9 −5x+y+4z=−10

Find the point on the surface z = x 2 + 2y 2 where the tangent...

Find the point on the surface z = x 2 + 2y 2 where the tangent plane is orthogonal to the line connecting the points (3, 0, 1) and (1, 4, 0).