Substituting this coordinates in the equation of plane
Hence the point of intersection will be given by substituting t=-95/18 in these points
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Find the point, P, at which the line intersects the plane. x= -6 - 3t, y...
Please I need help asap Find the point, P, at which the line intersects the plane. x= - 10-9t, y = - 3 + 5t, z=9-2t; 5x - 2y + 8z = 7 The point, P, at which the line intersects the plane is (7. (Simplify your answer. Type an ordered triple.)
X 14.1.43 Find the point (if it exists) at which the following plane and curve intersect. z = 9; r(t) = (t, 4t, 3 + 3t), for -20 <t<oo Select the correct choice below and, if necessary, fill in the answer box to complete your answer. O A. The point at which the plane and line intersect is (Simplify your answer. Type an ordered triple.) OB. The curve and the plane do not intersect.
Find the point at which the line intersects the given plane. x = y – 2 = 4z; 4x – y + 2z = 12 (x, y, z) = ( (x, y, z) = D
Problem 1. (1 point) The line x = [3t – 6,4,6 – 5t] intersects the plane 2x + y + z = 0 at the point when t = Note: You can earn partial credit on this problem.
intersects the plane Q3: Find the point where the line x x = + 2t , y = -2t, z = 1+t through P (1,1,-1). Q(2,0.2) and S (0,2,1) ?
Find the point at which the line with the parametric equations x-1-1, y=1+1, z intersects the plane with the equation X-y +3.2-4.
4. Let point P(2,1,12) and Q be points on the curve r(t)=(5- 3t, 4t – 3,12t). Find the coordinates of point Q such that the arc length of curve r from P to Q is 4 units. Write your final answer as an ordered triple.
4. Let point P(2,1,12) and Q be points on the curve r(t)=(5- 3t, 4t – 3,12t). Find the coordinates of point Q such that the arc length of curve r from P to Q is 4 units. Write your final answer as an ordered triple.
(1 point) Consider the line L(t) = (2+ 3t, 6-t). Then L intersects: 1. The X-axis at the point (2,6) when t = 0 2. The y-axis at the point (2,6) when t = 0 3. The parabola y = x2 at the points and when t = and
(1 point) The plane x y + 2z = 8 intersects the paraboloid z = x2 + y in an ellipse. Find the points on this ellipse that are nearest to and farthest from the origin. Point farthest away occurs at ). Point nearest occurs at (1 point) The plane x y + 2z = 8 intersects the paraboloid z = x2 + y in an ellipse. Find the points on this ellipse that are nearest to and farthest from...