MATH 166 Lecture Notes - Lecture 4: Frustum, Plane Curve

2. (22 marks) State whether each statement is true or false. Provide a brief justification for your answer. (a) The surface-z2 + y2 χ2--l is a hyperboloid of one sheet. (b) The equation y = 3x + 2 in space defines a line. (c) The vector (-2,1,0) is perpendicular to the line with parametric equations x = 1 + t, y-2t, z = 3t. (d) The lines r = (5,3,2)+ s(1,-1,-1) and r = (6,2, 1)+1(-1,1,-2) intersect at the point (6, 2,1) (e) The surface x2 + y2-2y-22 = 0 is a cone. (f) If two planes do not intersect, then their normal vectors are parallel. (g) If two planes ax + by + cz = d and Ax + By + Cz = D are parallel, then a = A, b = B, c=Cand d = D. (h) Two non parallel planes with normal vectors u and v intersect in a line parallel to uxv (i) Any three distinct points A, B,C in space determine a unique plane. (G) The surface2 +2-2z is a sphere. (k) The distance between the line x = y = 1 and the x-axis is V2.

Match the following vector fields with the verbal descriptions of the level curves or level surfaces to which they are perpendicular by putting the letter of the verbal description to the left of the number of the vector field 3. F(x, y, z) 21 t k 7. F(z, y, z)-2i + j-k 11. F(x, y, z)-ri +yi - zk A. ellipses B. hyperboloids C. ellipsoids D. hyperbolas E. circles F. lines G. paraboloids H. planes l. spheres