1-) Obtain expressions for the line and plane that are tangential and normal respectively to the...

Obtain expressions for the line and plane that are tangential and normal respectively to the curve...

Obtain expressions for the line and plane that are tangential and normal respectively to the curve 3x2y+y2z=−2 and 2xz −x2y=3 at the point (1,-1,1).

Find the equations of (i) the tangent plane and (ii) the normal line to the surface...

Find the equations of (i) the tangent plane and (ii) the normal line to the surface 2(x − 2)^2 + (y − 1)^2 + (z − 3)^2 = 10, at the point (3, 3, 5)

Find an equation of the plane. The plane that passes through the point (−1, 1, 3)...

Find an equation of the plane. The plane that passes through the point (−1, 1, 3) and contains the line of intersection of the planes x + y − z = 4 and 3x − y + 4z = 3

Write an equation for the tangent line to the plane curve xy^2 − 2x^2 + 3...

Write an equation for the tangent line to the plane curve xy^2 − 2x^2 + 3 x + y = 7 at the point P .(1,-3)

Find the equation of the tangent plane and normal line to the following surfaces at the...

Find the equation of the tangent plane and normal line to the following surfaces at the specified points: 1) x^2 + y^2 + z^2 = 16, (3, 2, √3) 2) x^2 + y^2 - z^2 = 9, (3, 1, 1) 3) z = √x + √y, (4, 9, 5)

(a) Find the equation of the plane p containing the point P(1,3,2)and normal to the line...

(a) Find the equation of the plane p containing the point P(1,3,2)and normal to the line l which has parametric form x=2,y=t+1,z=2 t+4. Put x, y and z on the left hand side and the constant on the right-hand side. (b) Find the value of t where the line l intersects the plane p. (c) Enter the coordinates of the point where the line l intersects the plane p.

Compute equations of tangent plane and normal line to the surface z = x cos (x+y)...

Compute equations of tangent plane and normal line to the surface z = x cos (x+y) at point (π/2, π/3, -√3π/4).

Find an equation of the plane. The plane that passes through the point (−3, 3, 2)...

Find an equation of the plane. The plane that passes through the point (−3, 3, 2) and contains the line of intersection of the planes x + y − z = 2 and 2x − y + 4z = 1

1. Solve all three: a. Determine whether the plane 2x + y + 3z – 6...

1. Solve all three: a. Determine whether the plane 2x + y + 3z – 6 = 0 passes through the points (3,6,-2) and (-1,5,-1) b. Find the equation of the plane that passes through the points (2,2,1) and (-1,1,-1) and is perpendicular to the plane 2x - 3y + z = 3. c. Determine whether the planes are parallel, orthogonal, or neither. If they are neither parallel nor orthogonal, find the angle of intersection: 3x + y - 4z...

Find equations of the normal plane and osculating plane of the curve at the given point...

Find equations of the normal plane and osculating plane of the curve at the given point x = sin(2t), y = t, z = cos(2t) at (0, pi, 1)