Find the point of intersection of the two lines l1:x⃗ =〈8,6,−16〉+t〈−1,−5,−1〉l1:x→=〈8,6,−16〉+t〈−1,−5,−1〉 and l2:x⃗ =〈21,1,−43〉+t〈3,1,−5〉l2:x→=〈21,1,−43〉+t〈3,1,−5〉 Intersection point:

Determine whether the lines L1:→r(t)=〈−2,−1,3〉t+〈−5,−3,−1〉 and L2:→p(s)=〈4,2,−6〉s+〈4,−1,0〉 intersect. If they do, find the point of intersection.

Determine whether the lines L1:→r(t)=〈−2,−1,3〉t+〈−5,−3,−1〉 and L2:→p(s)=〈4,2,−6〉s+〈4,−1,0〉 intersect. If they do, find the point of intersection.

Are lines L1 and L2 perpendicular: L1 (-7,1) and (5,-2) L2 (3,7) and (0,-5) a.) No,...

Are lines L1 and L2 perpendicular: L1 (-7,1) and (5,-2) L2 (3,7) and (0,-5) a.) No, the lines are not perpendicular because the product of their slope equals -1. B.) Yes , the lines are perpendicular because the product of their slopes does not equal -1. C.) No, the lines are not perpendicular because the product of their slopes does not equal -1. D.) Yes, the lines are perpendicular because the product of their slope equals -1.

(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 distance between the skew lines L1: x = 1 − t , y =...

Find the distance between the skew lines L1: x = 1 − t , y = 2 t , z = 2 + t L2:  x = -2 + s, y = 3 - s, z = -1 + 2s

Determine whether the lines L1:x=7+3t, y=7+3t, z=−1+t and L2:x=−10+4t, y=−12+5t, z=−12+4t intersect, are skew, or are...

Determine whether the lines L1:x=7+3t, y=7+3t, z=−1+t and L2:x=−10+4t, y=−12+5t, z=−12+4t intersect, are skew, or are parallel. If they intersect, determine the point of intersection; if not leave the remaining answer blanks empty.

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

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 f(x)=x^2 Find the first coordinate of the intersection point of the two tangent lines of...

Let f(x)=x^2 Find the first coordinate of the intersection point of the two tangent lines of f at 1 and at 5.

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.

At what point do the curves r1 =〈 t , 1 − t , 3 +...

At what point do the curves r1 =〈 t , 1 − t , 3 + t2 〉 and r2 = 〈 3 − s , s − 2 , s2 〉 intersect? Find the angle of intersection. Determine whether the lines L1 : r1 = 〈 5 − 12t , 3 + 9t ,1 − 3t 〉 and L2 : r2 = 〈 3 + 8s , −6s , 7 + 2s 〉are parallel, skew, or intersecting. Explain. If...