The vector equation of a plane is given as r = (1 + 38 + 4t)...

6) please show steps and explanation. a)Suppose r(t) = < cos(3t), sin(3t),4t >. Find the equation...

6) please show steps and explanation. a)Suppose r(t) = < cos(3t), sin(3t),4t >. Find the equation of the tangent line to r(t) at the point (-1, 0, 4pi). b) Find a vector orthogonal to the plane through the points P (1, 1, 1), Q(2, 0, 3), and R(1, 1, 2) and the area of the triangle PQR.

Given that the acceleration vector is a ( t ) = (−9 cos( 3t ) )...

Given that the acceleration vector is a ( t ) = (−9 cos( 3t ) ) i + ( −9 sin( 3t ) ) j + ( −5 t ) k, the initial velocity is v ( 0 ) = i + k, and the initial position vector is r ( 0 ) = i +j + k, compute: the velocity vector and position vector.

(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.

Given that the acceleration vector is a(t)=(-9 cos(3t))i+(-9 sin(3t))j+(-5t)k, the initial velocity is v(0)=i+k, and the...

Given that the acceleration vector is a(t)=(-9 cos(3t))i+(-9 sin(3t))j+(-5t)k, the initial velocity is v(0)=i+k, and the initial position vector is r(0)=i+j+k, compute: A. The velocity vector v(t) B. The position vector r(t)

6. Given vector function r(t) = t2 − 2t, 1 + 3t, 1 3 t 3...

6. Given vector function r(t) = t2 − 2t, 1 + 3t, 1 3 t 3 + 1 2 t 2 i (a) Find r 0 (t) (b) Find the unit tangent vector to the space curve of r(t) at t = 3. (c) Find the vector equation of the tangent line to the curve at t = 3

Find the distance from the point (1, 2, 3) to the (a) XY plane         (b) Y...

Find the distance from the point (1, 2, 3) to the (a) XY plane         (b) Y axis Find a unit vector that is perpendicular to both i + j   and   i - k   Find the equation of the plane that contains the point   (1, 2, -1) with normal vector i – j.

8. Find r(t) given the following information. r''(t)= 8 i + 12t k, r'(0)=6 j ,...

8. Find r(t) given the following information. r''(t)= 8 i + 12t k, r'(0)=6 j , r(0)= -4 i

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〉.  

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

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉...

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉 Find the second derivative r″(t)=〈r″(t)=〈 Find the curvature at t=1t=1 κ(1)=κ(1)= 2. (1 point) Find the distance from the point (-1, -5, 3) to the plane −4x+4y+0z=−3.