1. 11.5 Lines and Planes in Space For an animation of this topic visit:

2. The parametric equations of a line

3. Symmetric equations of the line

4. Example 1
Find the parametric and symmetric equations of the line L that passes through (1,-2,4) and is parallel to v = <2,4,-4>

5. Example 1 solution
Find parametric and symmetric equations of line L that passes
through the point (1,-2,4 ) and is parallel to v = <2,4,-4>
Solution to find a set of parametric equations of the line, use the coordinates x1 =1, y1=-2, z1 = 4 and direction numbers a=2, b = 4 and c=-4
x= 1+2t, y = -2+4t, z=4-4t (parametric equations)
Because a,b and c are all nonzero, a set of symmetric equations is

6. Example 2
Find a set of parametric equations of the line that passes through the points (-2,1,0) and (1,3,5), Graph the equation (next slide shows axis).

7. Example 2 solution

9. Problem 26 Determine if any of the following lines are parallel.
L1: (x-8)/4 = (y-5)/-2 = (z+9)/3
L2: (x+7)/2 = (y-4)/1 = (z+6)/5
L3: (x+4)/-8 = (y-1)/4 = (z+18)/-6
L4: (x-2)/-2 = (y+3)/1 = (z-4)/1.5

10. Problem 28
Determine whether lines intersect, and if so find the point of intersection and the angle of intersection.
x = -3t+1, y = 4t + 1, z = 2t+4
x=3s +1, y = 4s +1, z = -s +1

11. Solution 28 x = -3t+1, y = 4t + 1, z = 2t+4
x=3s +1, y = 4s +1, z = -s +1
Set x y and z equations equal
-3t+1 =3s s +1 = 4t s +1 = 2t+4
From the first one we get s=-t
When s=-t is plugged into the second we get t=1/3
When plugged into the third equation we get t = -3
Hence the lines do not intersect

12. Problem 30
Determine whether lines intersect, and if so find the point of intersection and the angle of intersection.
(x-2)/-3 = (y-2)/6 = z-3
(x-3)/2=y+5=(z+2)/4

13. Hint on Problem 30 (x-2)/-3 = (y-2)/6 = z-3 (x-3)/2=y+5=(z+2)/4
Write the equations in parametric form
Then solve as per #28 These do intersect.
Use the dot product of the direction vectors to find the angle between the two lines
<-3,6,1> ∙ <2,1,4>

15. Example 3
Find the equation of a plane containing points (2,1,1), (0,4,1) and (-2,1,4)

16. Example 3 Solution

17. Drawing a plane