We need at least 10 more requests to produce the answer.
0 / 10 have requested this problem solution
The more requests, the faster the answer.
(1 point) Find the distance of the point (2,4, -4) from the line r(t) = (1...
Find the distance of the point (3,4,-4) from the line r(t) = (1 + 3t, -1 + 2t, 5 – 3t). Answer:
please answer both
(12(8 pts) Find parametric equations of the line through the point (2, -1,3) and perpendicular to the line with parametric equations 1-t,y 4- 2t and 3+ t and perpendicular to the line with parametric equations 3+t,y 2-t and z 3+2t. (13)(8 pts) Find the unit tangent vector (T(t) for the vector function r(t) - costi+3t j+ 2sin 2t k at the point where t 0
(12(8 pts) Find parametric equations of the line through the point (2,...
HW02 9.5-9.7: Problem 5 Previous Problem Problem List Next Problem = (1 point) Consider the line L(t) Then: = (1 + 2t, 4t – 1). ? to the line is -3 – 4t, t – 2) L ? to the line is (3t – 2,4 + 6t) L ? to the line is (12t – 5, -3 – 6t) ? to the line is (4 – 4t, -8t) Note: In order to get credit for this problem all answers must...
Find the distance of a point (1, 2, 3) to the line L: x = 3 + 4t, y = -2 + 2t, z = 2t. Give your answer correct to two decimal places.
Find the equation of the line that passes through the point (2,3,4) and is perpendicular to the plane 2x-y + 3z = 4 a. x=4+2t , y=2-t, z=7-3t b. x=2+2t , y=3-t, z=4+t c. x=2-2t , y=-3+t, z=4-3t d. x=-2+4t , y=5-2t, z=-2+6t e. another solution
2. Find distance from point S(-2, 3, 4) to the line x = 3 - 2t, y = –2 + 3t, 2 = 5 - 6t Write plane equation passing through point S and par- allel to the given line. Show calculation steps clear and cleanly.
Find a parametrization of the tangent line at the point indicated. r(t) = (1 - 4, 4t, 5t), t = 2
(1 point) Starting from the point (-4,-1,0) reparametrize the curve r(t) = (-4+ 3t)i + (-1+2t)j + (0+2t)k in terms of arclength. r(t(s)) it j+ k
(1 point) Starting from the point (4,3,2)(4,3,2) reparametrize the curve r(t)=(4+3t)i+(3−3t)j+(2−2t)kr(t)=(4+3t)i+(3−3t)j+(2−2t)k in terms of arclength.
4. Find the parametric equations for a line through a point (0,1,2) that (a). parallel to the plane x + y + z = 2, and (b). perpendicular to the line T = 1+t, y = 1 –t, z = 2t (Answer: x = 3t, y=1-t, 2 = 2 - 2t)