Six straight lines are in a plane such that no two are parallel & no three are concurrent. The number of parts in which these lines divide the plane will be

If n lines are drawn in a plane such that no two of them are parallel and no three of them are concurrent, such that these lines divide the plane in 67 parts, then find number of different points at which these lines will cut.

If n lines are drawn in a plane such that no two of them are parallel and no three of them are concurrent, such that these lines divide the plane in 67 parts, then ffind number of different points at which these lines will cut.

There are n straight lines in a plane, no two of which are parallel, and no three pass through the same point . Their points of intersection are joined . Then the number of fresh lines thus obtained is :

There are n straight lines in a plane such that n_(1) of them are parallel in onne direction, n_(2) are parallel in different direction and so on, n_(k) are parallel in another direction such that n_(1)+n_(2)+ . .+n_(k)=n . Also, no three of the given lines meet at a point. prove that the total number of points of intersection is (1)/(2){n^(2)-sum_(r=1)^(k)n_(r)^(2)} .

A straight line which passes through two points on a circle is

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

A hollow cone is cut by a plane parallel to its base and the upper portion is removed. If the curved surface area of the remainder is 8/9 th the curved surface area of the whole cone, find the ratio of line segment into which the cone's altitude is divided by the plane.

A parallelogram is cut by two sets of m lines parallel to the sides. The number of parallelograms thus formed is

m parallel lines in a plane are intersected by a family of n parallel lines. The total number of parallelograms so formed is :

The straight lines , l_1,l_2 and l_3 are parallel and lie in the same plane . A total number of m points are taken on l : n points on l_2 k points on l_3 The maximum number of triangle formed with vertices at these points is :