S is a set of points in the plane. How many distinct triangles can be drawn that have three of the points in S as vertices?
(1) The number of distinct points in S is 5.
(2) No three of the points in S are collinear.

Statement (1) alone is sufficient, but statement (2) alone is not sufficient.

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Statement (2) alone is sufficient, but statement (1) alone is not sufficient.

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Both statements together are sufficient, but neither statement alone is sufficient.

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Each statement alone is sufficient.

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Statements (1) and (2) together are not sufficient.

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Solution

The correct option is C Both statements together are sufficient, but neither statement alone is sufficient.
Given that the number of points in S is 5, the number of triangles can be 0 (if the points are collinear) and the number of triangles can be greater than 0 (if the points are not all collinear); NOT sufficient.
Given that no three points of S are collinear, the number of triangles can be 1 (if S consists of 3 points) and the number of triangles can be 4 (if S consists of 4 points); NOT sufficient.
Taking (1) and (2) together, the number of distinct triangles must be $\begin{pmatrix} 5\\ 3 \end{pmatrix}= \frac{5!}{3!\left ( 5-3 \right )!}= 10$ which is the number of combinations of 5 points taken 3 at a time.
The correct answer is C; both statements together are sufficient.

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