Find general equation of the plane containing the following two lines: x = 2t - 4...
Q3 (8 points) Find general equation of the plane containing the following two lines: 2 C = 2t - 4 LL: = 2t +1 y = - +3 5 +2 and L2:y 2 2 5t - 1
K to browse... Q3 (8 points) Find general equation of the plane containing the following two lines: = 2t - 4 ci : y 2t +1 = -t+3 5t+2 and L2: y z 5 - 1
In problems 7-8, find out whether there exists a plane containing the two given lines. If there is such a plane, find its equation. Ll: x=2-t, y=3+2+, z = 4+t L2: =l+, y = 5 – 2s, z = 5+ 8. Lị: x=1+t, y = 2 – t, z = -3+ 2t L2: 2 + 2y +2=4, 2-y + 22 = -3
ILI UU Q3 (8 points) Find general equation of the plane containing the following two lines C: y =24+1 t +3 5+2 and = 24 L : y = -2 25t-1 + Drag and drop your files or Click to browse Q4 (8 points) (a) Find parametric equations of the line passing through the point A(S. -2,9) and perpendicular to the plane 32 - y - 63 + 2 = 0. (b) Find two planes that intersect along the line...
Find the equation of the plane that contains both the line with the equation x = 3 + 2t,y = t , z 8-t, and the line with the equation x = 5 + t,y = 4-t,z = 6
Find the equation of the plane that contains both the line with the equation x = 3 + 2t,y = t , z 8-t, and the line with the equation x = 5 + t,y = 4-t,z = 6
Find an equation for the plane containing the two (parallel) lines v, = (0, 1, -3) + +(2, 5, -1) and v, = (3,-1,0) + t(2, 5, -1).
Consider the line Li: = 5t, y=2t - 3, z= t-5. Find the general equation of the plane, II, perpendicular to the line L, and passing through the point (2,3,4).
3. (14 points) Given the lines: 21:2(t) = -3t – 1, y(t) = 2t +4, z(t) =t+4 12: x(u) = 5 - 3u, y(u) = u +1, (u) = u +2 1. Determine whether li and ly are parallel, skew or intersect. If the lines intersect, find the point of intersection of li and 12. 2. If the lines intersect or are parallel, give an equation for the plane which contains both lines. If the lines are skew, find a...
Find the plane determined by the intersecting lines. L1 x= -1 +41 y=2+t z= 1 - 4 L2 x = 1 - 4s y= 1 + 25 z=2-2s The equation of the plane is (Type an equation.)
1) Show that two lines are skew x+1 y+2 z+3 4:x=y=z and L: +7=5 2) Find the general equation of the plane containing the point P (1,2,3 ) and L, . 3) Find the point Q-the point of intersection the plane found in 2) and the line L. 4) Find the distance from the point (1,-1,2) to the line Lą.