12. Passes through the point of intersection of t) and t) and orthogonal to both lines, where x=2+t, y=-2+2t, and z=1+t, z=3+2t.
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To find the point of intersection, we need to set the x, y, and z values of both lines equal to each other and solve for t. For the first line: x = 2 + t y = -2 + 2t z = 1 + t For the second line: z = 3 + 2t Setting the z values equal to each other: 1 + t = 3 Show more…
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