Find the Cartesian equation of plane contains the line L1: ?? = ? + ?? =...

(a) Find the distance between the skew lines l1 and l2 given with the vector equations...

(a) Find the distance between the skew lines l1 and l2 given with the vector equations l1 : r1(t) = (1+t)i+ (1+6t)j+ (2t)k; l2 : r2(s) = (1+2s)i+ (5+15s)j+ (−2+6s)k. (b) Determine if the plane given by the Cartesian equation −x + 2z = 0 and the line given by the parametric equations x = 5 + 8t, y = 2 − t, z = 10 + 4t are orthogonal, parallel, or neither.

Find the linear equation of the plane through the point (1,2,3) and contains the line represented...

Find the linear equation of the plane through the point (1,2,3) and contains the line represented by the vector equation r(t)=〈3t,5−3t,1−8t〉.  

The line l1 has the direction vector h1,0,−1i and passes through the point (0,−1,−1). The line...

The line l1 has the direction vector h1,0,−1i and passes through the point (0,−1,−1). The line l2 passes through the points (1,2,3) and (1,3,2). a. [2] What is the angle between l1 and l2 in radians? The answer should lie between 0 and π/2. b. [6] What is the distance between l1 and l2?

2. Consider the plane with a normal vector 〈−9, 18, 18〉 which contains the point (0,...

2. Consider the plane with a normal vector 〈−9, 18, 18〉 which contains the point (0, 1, −5), and the plane containing the lines l1 and l2 where l1 is parametrically defined by x = 4 − 2m, y = m + 1, and z = 1 − 2m, and l2 is parametrically defined by x = 4 + 4n, y = 2 + n, and z = n − 1. Determine whether the planes are parallel, orthogonal, or neither.

Let P be the plane given by the equation 2x + y − 3z = 2....

Let P be the plane given by the equation 2x + y − 3z = 2. The point Q(1, 2, 3) is not on the plane P, the point R is on the plane P, and the line L1 through Q and R is orthogonal to the plane P. Let W be another point (1, 1, 3). Find parametric equations of the line L2 that passes through points W and R.

Find (a) a vector-valued function, (b) parametric equations, and (c) a Cartesian equation for the line...

Find (a) a vector-valued function, (b) parametric equations, and (c) a Cartesian equation for the line that is parallel to the vector <−2, 6> and passes through the point P(−4, 5)

a) Let L be the line through (2,-1,1) and (3,2,2). Parameterize L. Find the point Q...

a) Let L be the line through (2,-1,1) and (3,2,2). Parameterize L. Find the point Q where L intersects the xy-plane. b) Find the angle that the line through (0,-1,1) and (√3,1,4) makes with a normal vector to the xy-plane. c) Find the distance from the point (3,1,-2) to the plane x-2y+z=4. d) Find a Cartesian equation for the plane containing (1,1,2), (2,1,1) and (1,2,1)

Find an equation for the plane that contains the line  v=(4,−4,−2)+t(3,−3,1) and is perpendicular to the plane...

Find an equation for the plane that contains the line  v=(4,−4,−2)+t(3,−3,1) and is perpendicular to the plane 2x+y+4z+1=0 (Use symbolic notation and fractions where needed. Please note that the solution expects you to solve for zz. You may need to scale your answer suitably. ) z = .

Find an equation of the plane. The plane that passes through (7, 0, −4) and contains...

Find an equation of the plane. The plane that passes through (7, 0, −4) and contains the line x = 4 − 3t, y = 2 + 5t, z = 5 + 4t

Find the equation for the line through the point (2,0,2), parallel to the plane x+y+z=10 and...

Find the equation for the line through the point (2,0,2), parallel to the plane x+y+z=10 and orthogonal to the line r(t)=<1+t,1-t,2t>