Statement-1: There are pge8 points in sp...

Statement-1: There are `pge8` points in space no four of which are in the same with exception of `q ge3` points which are in the same plane, then the number of planes each containing three points is `.^(p)C_(3)-.^(q)C_(3)`.
Statement-2: 3 non-collinear points alwasy determine unique plane.

Statement-1 is true, statement-2 is true, statement-2 is a correct explanation for statement-1

Statement-1 is true, statement-2 is true, statement-2 is not a correct explanation for statement-1

Statement-1 is true, statement-2 is false

Statement-1 is false, statement-2 is true

Text Solution

Verified by Experts

The correct Answer is:

Number of planes each containing three points
`=.^(p)C_(3)-.^(q)C_(3)+1`
`therefore`Statement-1 is false and statement-2 is always true.

Similar Questions

Explore conceptually related problems

Out of 18 points in a plane, no three are in the same line except five points which are collinear. Find the number of lines that can be formed joining the point.

There are 12 points in a plane of which 5 points are collinear, then the number of lines obtained by joining these points in pair is ""^12C_2-""^5C_2+1,

There are 10 points in a plane of which no three points are collinear and four points are concyclic. The number of different circles that can be drawn through at least three points of these points is

Consider three vectors p=i+j+k, q=2i+4j-k and r=i+j+3k . If p, q and r denotes the position vector of three non-collinear points, then the equation of the plane containing these points is

There are 2n points in a plane in which m are collinear. Number of quadrilateral formed by joining these lines

There are 12 points in a plane in which 6 are collinear. Number of different straight lines that can be drawn by joining them, is

The image of the point (-1, 3, 4) in the plane x-2y=0 is

Find the image of the point (3,8) with respect to the line x+3y=7 assuming the line to be a plane mirror.

There are n straight lines in a plane in which no two are parallel and no three pass through the same point. Their points of intersection are joined. Show that the number of fresh lines thus introduced is 1/8n(n-1)(n-2)(n-3)

The points (3, -2) (-2, 8) and (0, 4) are three points in a plane. Show that these points are collinear.

Statement-1: There are `pge8` points in space no four of which are in the same with exception of `q ge3` points which are in the same plane, then the number of planes each containing three points is `.^(p)C_(3)-.^(q)C_(3)`. Statement-2: 3 non-collinear points alwasy determine unique plane.

Text Solution

Similar Questions

Recommended Questions

Statement-1: There are `pge8` points in space no four of which are in the same with exception of `q ge3` points which are in the same plane, then the number of planes each containing three points is `.^(p)C_(3)-.^(q)C_(3)`.
Statement-2: 3 non-collinear points alwasy determine unique plane.