At the point were a line intersects a plane [with the equation (24x+32y+40z=480) and three points of A(5, 10, 1), B(6, 3, 6), and C(12, 1, 4)], the vector i-, vector j-, and vector k-coefficients of the line equal the corresponding values of x, y, and z for the plane. By substituting these coefficients, for x, y, and z in the equation for the plane, find the directed distance, d, from the known point (7, 11, 3) to the intersection point (x, y, z).

asked by Grace

13 years ago

739 views

0

0

1 answer

You have two vectors:

a = (7,11,3)
b = (x,y,z)

The vector from a to b can be found by

a + d = b

so, d = b - a
= (x-7,y-11,z-3)

so the distance is |d| in the direction of d.

answered by Steve

0

0

Question

At the point were a line intersects a plane [with the equation (24x+32y+40z=480) and three points of A(5, 10, 1), B(6, 3, 6), and C(12, 1, 4)], the vector i-, vector j-, and vector k-coefficients of the line equal the corresponding values of x, y, and z for the plane. By substituting these coefficients, for x, y, and z in the equation for the plane, find the directed distance, d, from the known point (7, 11, 3) to the intersection point (x, y, z).

1 answer

You have two vectors:

a = (7,11,3)
b = (x,y,z)

The vector from a to b can be found by

a + d = b

so, d = b - a
= (x-7,y-11,z-3)

so the distance is |d| in the direction of d.

Steve · Answer

You have two vectors: a = (7,11,3) b = (x,y,z) The vector from a to b can be found by a + d = b so, d = b - a = (x-7,y-11,z-3) so the distance is |d| in the direction of d.