Through a point in a plane, number of lines that can be drawn is________

Statement-1: variable line drawn through a fixed point cuts the coordinate axes at A and B.The locus of mid-point of AB is a circle. because Statement 2: Through 3 non-collinear points in a plane,only one circle can be drawn.

There are 15 points in a plane,no three of which are in a st.line,except 6, all of which are in a st.line.The number of st.lines which can be drawn by joining them is

There are 10 points in a plane out of which 5 are collinear. The number of triangles that can be drawn will be

There are n points in a plane, No three being collinear except m of them which are collinear. The number of triangles that can be drawn with their vertices at three of the given points is

State True or False: The number of lines that can be drawn through a point is a variable.

There are 10 points in a plane out of which 5 are collinear. The number of straight lines than can be drawn by joining these points will be

If 1 is any given line and P is any point not lying on it,then the number of parallel lines that can be drawn through P,parallel to I would be

What is the maximum number of straight lines that can be drawn with any four points in a plane such that each line contains at least two of these points ?