Provide a written out proof for: Given a point A, there is a line passing through...

Find the equation of the line passing through the point (1,2,3) and perpendicular to the lines...

Find the equation of the line passing through the point (1,2,3) and perpendicular to the lines r1(t) = (3 - 2t, 5 + 8t, 7 - 4t) and r2(t) = (-2t, 5 + t, 7 - t)

find the parametric equation of the line passing through the point (1,7,2), parallel to the plane...

find the parametric equation of the line passing through the point (1,7,2), parallel to the plane x+y+z=2 and perpendicular to the line x=2t, y=(3t+5)2, and z=(4t-1)/3

Find parametric equations for the line passing through the point P(4,5,5), intersecting the line <x, y,...

Find parametric equations for the line passing through the point P(4,5,5), intersecting the line <x, y, z> = <11, -8, 4> + t <3, -1,1> at a 90 degree angle.

Write an equation for a line parallel to y=4x+3y=4x+3 and passing through the point (4,15)

Write an equation for a line parallel to y=4x+3y=4x+3 and passing through the point (4,15)

Let L1 be the line passing through the point P1=(−5, −2, −5) with direction vector →d=[2,...

Let L1 be the line passing through the point P1=(−5, −2, −5) with direction vector →d=[2, −3, −2]T, and let L2 be the line passing through the point P2=(4, −1, −5) with the same direction vector. Find the shortest distance d between these two lines, and find a point Q1 on L1 and a point Q2 on L2 so that d(Q1,Q2) = d. Use the square root symbol '√' where needed to give an exact value for your answer.

Let L1 be the line passing through the point P1(?5, ?4, 5) with direction vector d=[?1,...

Let L1 be the line passing through the point P1(?5, ?4, 5) with direction vector d=[?1, 1, 3]T, and let L2 be the line passing through the point P2(4, 1, ?4) with the same direction vector. Find the shortest distance d between these two lines, and find a point Q1 on L1 and a point Q2 on L2 so that d(Q1,Q2) = d. Use the square root symbol '?' where needed to give an exact value for your answer. d=?...

Let L1 be the line passing through the point P1(3, 5, ?5) with direction vector d=[?1,...

Let L1 be the line passing through the point P1(3, 5, ?5) with direction vector d=[?1, 2, 0]T, and let L2 be the line passing through the point P2(?3, ?4, ?3) with the same direction vector. Find the shortest distance d between these two lines, and find a point Q1 on L1 and a point Q2 on L2 so that d(Q1,Q2) = d. Use the square root symbol '?' where needed to give an exact value for your answer.

Determine the symmetric and parametric equations of the line: (A.) parallel to the z-axis passing through...

Determine the symmetric and parametric equations of the line: (A.) parallel to the z-axis passing through the point (1, 2, 1) (b.) Parallel to the line (1-2x)/3 = y/4 = (2z + 1)/4 and passing through the point (2, 1, 0) (c.) Perpendicular to the straight R defined by r: X = (2,-1, 2) + t (1, 2,-1) and passes through Point P (3, 2, 1)

Let L1 be the line passing through the point P1(?5, ?3, ?2) with direction vector d=[0,...

Let L1 be the line passing through the point P1(?5, ?3, ?2) with direction vector d=[0, ?3, ?2]T, and let L2 be the line passing through the point P2(?2, 3, ?3) with the same direction vector. Find the shortest distance d between these two lines, and find a point Q1 on L1 and a point Q2 on L2 so that d(Q1,Q2) = d. Use the square root symbol '?' where needed to give an exact value for your answer. d...

Find an equation for the plane passing through the point (4,−2,−1) that is perpendicular to the...

Find an equation for the plane passing through the point (4,−2,−1) that is perpendicular to the line L(t)=〈2t−4,4−4t,2−4t〉.