Question

Find the general equation of the plane containing both point (-4,4,-7) and the line of intersection of planes −4x−5y−5z=−29 and 8x−2y+6z=−18

Answer #1

Find a plane containing the point (-6,-5,2) and the line of
intersection of the planes −7x−y−7z=−55 and x+2y−5z=−19

1) Find an equation of the plane. The plane through the point
(7, 0, 4)and perpendicular to the line x = 3t,y = 3 − t,z = 1 +
7t
2) Consider the following planes.x + y + z = 2, x + 6y + 6z =
2
(a) Find parametric equations for the line of intersection of
the planes. (Use the parameter t.) (x(t), y(t), z(t))
=
(b)Find the angle between the planes. (Round your answer to one
decimal...

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

Determine the equation of the line of intersection of the two
planes 5x-2y-2z=1 and 4x+z=6.

. Find the intersection of the planes x − y + 5z = 9 and
x = 1 + s − t
y = 1 +2 s − t
z = 2 − s + t .
(a) Find the line ℓ1 perpendicular to the first of these planes
and passing across the point (1, 2, 2).
(b) Find a line ℓ2 perpendicular to the second of these planes
and passing across the point (1, 2, 2).
(c) Find the...

Find the scalar equation for the plane passing through the point
P=(3, −5, −5) and containing the line L defined
by
x = 3+4t
y = −3−3t
z = −9+2t

1/ Find linear equation for the plane containing (-1,2,1) that
is parallel to the plane 2x - y + 3z = 1
2/ Find linear equation for the plane containing (2,0,9) that is
perpendicular to the line (x-2)/5 = (y+4)/3 = z/2

Find an equation of the tangent plane and find the equations for
the normal line to
the following surface at the given point.
3xyz = 18 at (1, 2, 3)

Find an equation for the line with the given properties. Express
the equation in general form. Slope 9/4 ?; containing the point
(-6,-8)

A curve traces the intersection point of two lines. The first
line is flat, starts at height 1, and moves down with constant
speed. The second line is through the origin, starts off vertical,
and rotates at a constant angular speed. Both lines reach the
x-axis at the same time.
a. Find an equation for the curve tracing the
intersection.
b. Use L’Hopital’s rule to find the intersection point of the
curve with the x-axis.

ADVERTISEMENT

Get Answers For Free

Most questions answered within 1 hours.

ADVERTISEMENT

asked 2 minutes ago

asked 2 minutes ago

asked 2 minutes ago

asked 2 minutes ago

asked 2 minutes ago

asked 2 minutes ago

asked 2 minutes ago

asked 3 minutes ago

asked 3 minutes ago

asked 5 minutes ago

asked 5 minutes ago

asked 7 minutes ago