A plane is uniquely determined by three distinct, non-collinear points on the plane. Find three distinct, non-collinear
Posted: Tue Nov 23, 2021 9:10 am
A plane is uniquely determined by three distinct, non-collinear
points on the plane. Find three distinct, non-collinear points on
the plane x=2x=2.
Three distinct, non-collinear points on the
plane x=2x=2: help (points)
A plane is uniquely determined by one point on the plane and
two non-parallel vectors that are parallel to the plane. Find one
point on the plane y=−2y=−2 and two non-parallel vectors
that are parallel to the plane y=−2y=−2.
One point on the plane y=−2y=−2: help
(points)
Two non-parallel vectors that are parallel to the
plane y=−2y=−2: help (vectors)
A plane is uniquely determined by one point on the plane and
one vector perpendicular to the plane. Find one point on the
plane z=4z=4 and one vector perpendicular to the
plane z=4z=4.
One point on the plane z=4z=4: help
(points)
One vector perpendicular to the plane z=4
points on the plane. Find three distinct, non-collinear points on
the plane x=2x=2.
Three distinct, non-collinear points on the
plane x=2x=2: help (points)
A plane is uniquely determined by one point on the plane and
two non-parallel vectors that are parallel to the plane. Find one
point on the plane y=−2y=−2 and two non-parallel vectors
that are parallel to the plane y=−2y=−2.
One point on the plane y=−2y=−2: help
(points)
Two non-parallel vectors that are parallel to the
plane y=−2y=−2: help (vectors)
A plane is uniquely determined by one point on the plane and
one vector perpendicular to the plane. Find one point on the
plane z=4z=4 and one vector perpendicular to the
plane z=4z=4.
One point on the plane z=4z=4: help
(points)
One vector perpendicular to the plane z=4