MATH 200 Final: MATH 200 UVic Math 200 Final December 1997

Uni ver si t y of vi ct or i a. Instructors: poll r steacy po2]r. steacy po3] cbose. This question paper has 12 pages plus cover. Page 1. pj l_ find the volume of the parallelepiped having one vertex at the origin and three adjacent vertices p = (1,2,3), q = (3,-1,2) and r= (2,0,4). Pi: let & be the line with equations x=3+2t, y=4+t, z=3+t and let lz be the line with equations. Find the coordinates of the point where these two lines intersect, or state that the lines do not intersect. Page 2: let ii1 be the plane with equation x + 3 - z?z = 6 and let & be the plane with equation. 2x-y+z=2. (a) find equations for the line formed by the intersection of iii with ii2 . Pi (b) find an equation for the plane conttining the line forfed by the intersection of iii with. It2 and the containing point p = (-2,0,1)_