Question: x = 4-s+t . Find a vector of length V2 which is perpendicular to the plane 1 = y = 1+s-t z = 1+s+t 6.

x = 4-s+t . Find a vector of length V2 which is perpendicular to the plane 1 = y = 1+s-t z = 1+s+t 6. Find a vector perpendicular to the 2-space line: Qx - Ny + R = 0. Explain how you got your answer. 7. Find the point where line L: [x, y, z] = [-1, 3, -1] + t [2, -5, -2] crosses the xy - plane. 8. Find the symmetric form of the line that passes through P(-2, 5) and is parallel to the line 3x - 4y + 1 = 0 9 . If these planes intersect, describe the intersection. If they don't intersect explain why. 71: 3x - 6y + 12z - 6 = 0 and 12: 2x - 4y + 8z - 4 = 0 10. Determine the point on the line 3x + 4y = 12 that is closest to (0, 0). Draw a sketch

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