Equation of a Plane Passing through Three Points
Trending Questions
Q. A variable plane passes through a fixed point (3, 2, 1) and meets x, y and z axes at A, B and C respectively. A plane is drawn parallel to yz−plane through A, a second plane is drawn parallel zx−plane through B and a third plane is drawn parallel to xy−plane through C. Then the locus of the point of intersection of these three planes, is :
- x3+y2+z1=1
- x+y+z=6
- 1x+1y+1z=116
- 3x+2y+1z=1
Q. Find the direction ratio of the plane passing through the points
R(2, 5, – 3), S(– 2, – 3, 5) and T(5, 3, – 3).
R(2, 5, – 3), S(– 2, – 3, 5) and T(5, 3, – 3).
- (2, 3, 4)
- (3, 3, 4)
- (1, 2, 5)
- (4, 8, -3)
Q. Find the direction ratio of the plane passing through the points
R(2, 5, – 3), S(– 2, – 3, 5) and T(5, 3, – 3).
R(2, 5, – 3), S(– 2, – 3, 5) and T(5, 3, – 3).
- (2, 3, 4)
- (3, 3, 4)
- (1, 2, 5)
- (4, 8, -3)