What will be the coordinates of the point which divides the line segment joining the points A (- 2 2?

The coordinates of the points which divide the line segment joining A (- 2, 2) and B (2, 8) into four equal parts is (- 1, 7/2), (0, 5), and (1, 13/2).

How do you find the coordinates of a point that divides a line segment?

Now using the formula C(x, y) = { (m × x2 + n × x1) / (m + n ) , (m × y2 + n × y1) / (m + n ) } as C is dividing internally. Hence, the coordinates are (4, 2). Problem 2: If a point P(k, 7) divides the line segment joining A(8, 9) and B(1, 2) in a ratio m : n then find values of m and n.

In what ratio does the points p 2/5 divide the line segment joining a 8 2 and B 9?

The ratio is 5 : 2.

In what ratio is the line segment joining the points 2 3 and 5 6?

Let the line joining points A (2, −3) and B (5, 6) be divided by point P (x, 0) in the ratio k : 1. Thus, the required ratio is 1: 2.

What are the coordinates of the point that divides the line joining 5’2 and 9 6?

Find the coordinates of the point which divides the line segment joining the points A(5,-2) and B(9,6) in the ratio 3:1. Let the required point be P(x,y). Then. Hence, the required points is (8,4).

In what ratio does the Y axis divides the line segment joining the points P (- 4 2 and Q 8 3?

Hence, the required ratio is 1/2 : 1, which is same as 1:2.

What are coordinates points?

The coordinates of a point are a pair of numbers that define its exact location on a two-dimensional plane. Recall that the coordinate plane has two axes at right angles to each other, called the x and y axis. The coordinates of a given point represent how far along each axis the point is located.

What are the coordinates of the point of division?

The section formula tells us the coordinates of the point which divides a given line segment into two parts such that their lengths are in the ratio m : n m:n m:n. The midpoint of a line segment is the point that divides a line segment in two equal halves.

In what ratio does the point P 2 5 Divide the?

Hence, the point P divides AB in the ratio 5 : 2.

In what ratio does the point 5 4 divides the line segment?

Hence the ratio m:n is 3:5.

What is the ratio of the line joining 2 3?

Hence, the joining the points (2, 3) and (4, 5) is divided by the line passing through the points(6, 8) and (-3, – 2) in the ratio 5: 97 externally.

What ratio is the line segment joining the points 2 3 and 2 divided by the Y axis?

Let y axis divide the line segment joining the point (-2,-3) and (3,7) in m:n. The coordinates of the point of division​ is (0,y). The coordinates of the point of division​ is (0,y). The required ratio is 2:3.