Find a set of parametric equations for the line of intersection of the planes 3x-2y-z=7 x-4y+2z=0

equation of the line is

L (x, y, z) = (0,-7/4,-7/2) + (2,7/4, 5/2) * t, where t is the parameter

Step-by-step explanation:

for the planes

3x-2y-z=7

x-4y+2z=0

multiplying by 2 the first equation and summing both equations

7x-8y=14

for y=0, x=2 → z = - 1 (replacing in any plane equation)

for x=0, y=-7/4 → z=-7/2 (replacing in any plane equation)

then (2,0,-1) and (0,-7/4,-7/2) belongs to the line → thus one parallel vector to the line is

v = (2,0,-1) - (0,-7/4,-7/2) = (2,7/4, 5/2)

the parametric equation of the line is

L (x, y, z) = (0,-7/4,-7/2) + (2,7/4, 5/2) * t, where t is the parameter

Note

for t=0 → L (x, y, z) = (0,-7/4,-7/2)

for t=1 → L (x, y, z) = (2,0,-1)

To find a set of parametric equations for the line of intersection of the planes 3x+2y-z=7 eqn1

x-4y+2z=0 eqn2

Mulitply eqn 1 by 2, to solve this simultaneously

6x+4y-2z=14 eqn3

x - 4y+2z=0

Add eqn 3 to eqn 2, we have

7x = 14

x = 2, put this into eqn2 and assume y = v

2 - 4v + 2z = 0

2z = 4v-2, z=2v-1

Hence, a set of parametric equations are x = 2, y = v and z=2v-1