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 always 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

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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.

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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 always determine unique plane.

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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 always determine unique plane.