Consider the lines in space whose parametric equations are as follows line #1 x=2+3t, y=3-t, z=2t...

Find the line determined by the intersecting lines. L1: x=-1+3t y=2+t z=1-2t L2: x=1-4s y=1+2s z=2-2s

Find the line determined by the intersecting lines. L1: x=-1+3t y=2+t z=1-2t L2: x=1-4s y=1+2s z=2-2s

Consider the line L with parametric equations x = 5t − 2, y = −t +...

Consider the line L with parametric equations x = 5t − 2, y = −t + 4, z= 2t + 5. Consider the plane P given by the equation x+3y−z=6. (a) Explain why the line L is parallel to P b) Find the distance from L to P .

Consider the parametric curve defined by x = 3t − t^3 , y = 3t^2 ....

Consider the parametric curve defined by x = 3t − t^3 , y = 3t^2 . (a) Find dy/dx in terms of t. (b) Write the equations of the horizontal tangent lines to the curve (c) Write the equations of the vertical tangent lines to the curve. (d) Using the results in (a), (b) and (c), sketch the curve for −2 ≤ t ≤ 2.

Find parametric equations of the line that passes through (1, 2, 3) and is parallel to...

Find parametric equations of the line that passes through (1, 2, 3) and is parallel to the plane 2 x − y + z = 3 and is perpendicular to the line with parametric equations: x=5-t, y=3+2t , z=4-t

Find parametric equations of the line that passes through (1, 2, 3) and is parallel to...

Find parametric equations of the line that passes through (1, 2, 3) and is parallel to the plane 2 x − y + z = 3 and is perpendicular to the line with parametric equations: x=5-t, y=3+2t, z=4-t

Consider plane P: 4x -y + 2z = 8, line: <x, y, z> = <1+t, -1+2t,...

Consider plane P: 4x -y + 2z = 8, line: <x, y, z> = <1+t, -1+2t, 3t>, and point Q(2,-1,3) b) Find the perpendicular distance between point Q and plane P

Consider curve C with parametric equations x=t^2, y=t^3−3t So the graph of C contains (one,two, three...

Consider curve C with parametric equations x=t^2, y=t^3−3t So the graph of C contains (one,two, three or none?) horizontal asymptote(s) and (one, two,three or none?) vertical asymptote(s) in the interval −0.5 ≤ t ≤ 2.

Find parametric equations for the line through (1, 1, 6) that is perpendicular to the plane...

Find parametric equations for the line through (1, 1, 6) that is perpendicular to the plane x − y + 3z = 8. (Use the parameter t.) (x(t), y(t), z(t)) = 1+t, 1-t, 6+3t Correct: Your answer is correct. (b) In what points does this line intersect the coordinate planes? xy-plane (x, y, z) = yz-plane (x, y, z) = xz-plane (x, y, z) =

Show that the two lines with equations (x, y, z) = (-1, 3, -4) + t(1,...

Show that the two lines with equations (x, y, z) = (-1, 3, -4) + t(1, -1, 2) and (x, y, z) = (5, -3, 2) + s(-2, 2, 2) are perpendicular. Determine how the two lines interact. Find the point of intersection of the line (x, y, z) = (1, -2, 1) + t(4, -3, -2) and the plane x – 2y + 3z = -8.

For the following equation x=2t^2,y=3t^2,z=4t^2;1 less or equal to t less or equal to 3 i)...

For the following equation x=2t^2,y=3t^2,z=4t^2;1 less or equal to t less or equal to 3 i) Write the positive vector tangent of the curve with parametric equations above. ii) Find the length function s(t) for the curve. iii) Write the position vector of s and verify by differentiation that this position vector in terms of s is a unit tangent to the curve.