CBSE Class 10  Section Formula Videos
Coordinate Geometry
Coordinate Geometry, Section Formula
 Points P and Q trisect the line segment joining the points A(– 2, 0) and B(0, 8) such that P is near to A. Find the coordinates of points P and Q.
 The coordinates of the point which divides the line segment joining the points(4,3) and (8,5) in the ratio 3:1 internally is
 the foot of the perpendicular from P(3,2) to yaxis I M. coordinates of M are....
 find the points which divide the line segments joining the points (1 , 7 ) ( 6 ,  3) in the ratio of 2:3

how to solve this
 . O is the origin. B( −6, 9 ) and C ( 12, −3) are the vertices of the ∆ABC. If the point P divides OB in the ratio 1 ∶ 2 and the point Q divides OC in the ratio 1 ∶ 2. Show that PQ =1 3 BC
 find the ratio in which the line 3x+4y+9=0 divides the line segment joining the line segments joining the points (1,3)(2,7)
 The base BC of an equilateral triangle ABC lies on y‐axis. The coordinates of point C are (0,–3).The origin is the midpoint of the base. Find the coordinates of the points A and B. Also, find the coordinates of another point D such that ABCD is a rhombus.
 line intersects the yaxis and xaxis at points P and Q respectively. If (2, 5) is the mid point of PQ, then find the coordinates of P and Q. So, x1=0.
 Find the coordinates of the points of trisection of the line segment joining (4,1) and (2,3).