Two lines interesect
(A) at a point (B) in a line (C ) at an infinite number of points (D) at two points

Two line segments may intersect at two points

If Z in C, then the minimum value of |Z| + |Z-1| is attained at: (a) exactly one point (b) exactly two point (c) Infinite numbers of point (d) none of these

Two point forms of a line

State which of the following statements are true (T) and which false (F): Point has a size because we can see it as a thick dot on paper. By lines in geometry, we mean only straight lines. Two lines in a place always intersect in a point. Any plane through a vertical line is vertical. Any plane through a horizontal line is horizontal. There cannot be a horizontal line is a vertical plane. All lines in a horizontal plane are horizontal. Two lines in a plane always intersect in a point. If two lines intersect at a point P , then P is called the point of concurrence of the two lines. If two lines intersect at a point p , then p is called the point of intersection of the two lines. If A , B , C a n d D are collinear points D , P a n d Q are collinear, then points A , B , C , D , P a n d Q and always collinear. Two different lines can be drawn passing through two given points. Through a given point only one line can be drawn. Four points are collinear if any three of them lie on the same line. The maximum number of points of intersection of three lines in three. The minimum matching of the statements of column A and Column B .

The objective function Z=x_(1)+x_(2) subject to x_(1)+x_(2) =0 has maximum value of the feasible region (a) at only one point (b) at only two points (c) at every point of the segment joining two points (d) at every point of the line joining two points

If the two intersecting lines intersect the hyperbola and neither of them is a tangent to it, then the number of intersecting points are 1 (b) 2 (c) 3 (d) 4

The equation x-2=0 on number line is represented by a line (b) a point infinitely many lines (d) two lines

Two straight lines intersect at a point o.Points A_(1),A_(2)...,A_(n) are taken on one line and points B,B_(2),...,B_(n), on the other.If the point O is not to be used,then the number of triant O is that can be drawn using these points as vertices,is

Give the correct matching of the statements of column A and Column B .Point are collinear Line is completely known Two lines in a plane Relations between points and lines in a plane collinear points A plane extends Indefinite number of lines Point,line and plane are