[" 25.Let there be "9" fixed points on t...

[" 25.Let there be "9" fixed points on the circumference of "],[" a circle.Each of these points is joined to every one "],[" of the remaining "8" points by a straight line and the "],[" points are so positioned on the circumference that "],[" atmost "2" straight lines meet in any interior point of "],[" the circle.The number of such interior intersection "],[" points is "],[[" (A) "126," (B) "351],[" (C) "756," (D) none of these "]]

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Let there be 9 fixed points on the circumference of a circle.Each of these points is joined to every one of the remaining 8 points by a straight line and the points are so positioned on the circumference that at most 2 straight lines meet in any interior point of the circle.The number of such interior cintersection points is:

The set of all the points on the circumference of a circle.

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A straight line passing through a point on a circle is

AB is a diameter of a circle and C is any point on the circumference of the circle, then :

AB is a diameter of a circle and 'C' is any point on the circumference of the circle .Then

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