Coordinate geometry Solution


internal division –

Que. 1. Find the coordinates of the point which divides the line segment joining the points (-1, 7) and (4, 3) in the ratio 2 : 3.

(-1,7) (y – 3)
(x1,y1) (x2,y2)
m1 : m2 = 2 : 3

Que. 2. Find the coordinates of the points which trisect the line segment joining the points (4, 1 ) and (-2 – 3).

m1 : m2 = 1 : 2

Que. 3. To organize sports activities in your school, rows have been drawn with lime at a distance of 1m from each other on a rectangular field ABCD. 100 flower pots have been placed along AD at a distance of 1m from each other. Niharika runs a distance equal to 1/4 of AD in the second row and plants a green flag there. Preet runs a distance equal to 1/5 of AD in the eighth row and plants a red flag there. What is the distance between the two flags? If Rashmi has to plant a blue flag exactly halfway along the line joining these two flags, where should she plant her flag?

Que. 4. In what ratio does the point (-1,6) divide the line segment joining the points (3,10) and (6,-8)?

-1 (m1 + m2) = 6m1 – 3m2
-m1 – m2 = 6m1 – 3m2
-m1 – 6m1 = – 3m2 + m2
-7 m1 = -2 m2
7 m1 = 2 m2

6 (m1 + m2) = -8m1 + 10m2
6m1 + 6m2 = -8m1 + 10m2
6m1 + 8m1 = 10m2 – 6m2
14 m1 = 4 m2
m1 : m2 = 2 : 7
Que. 5. Find the ratio in which the line segment joining the points A ( 1 – 5 ) and B ( – 4, 5 ) is divided by the x-axis. Also find the coordinates of this division point.

(1,-5) (x,0) (-4,5)
m1 : m2 = K : 1

0 X K + 1 = 5K – 5
0 = 5K – 5
5 = 5K
K = 1
m1 : m2 = 1 : 1

Que. 6. If the points (1, 2), (4, y), (x, 6) and (3, 5), taken in that order, are the vertices of a parallelogram, then find x and y.

The diagonals of a parallelogram bisect each other, so O is the midpoint of AC.
The coordinates of point O on the AC diagonal are:

1 + x = 7
X = 7 -1
X = 6

Y + 5 = 4 X 2
Y + 5 = 8
Y = 8 – 5
Y = 3
Que. 7. Find the coordinates of point A, where AB is the diameter of a circle with centre (2, – 3 ) and coordinates of B are (1, 4).

The diameter of the circle divides it into two equal parts.

X = 3 y1 + 4 = -3 X 2
y1 + 4 = -6
y1 = -6 -4
y1 = -10
Que. 8. If A and B are ( – 2 – 2 ) and ( 2, 4 ) respectively, then find the coordinates of point P such that AP = 3/7 AB and P lies on the line segment AB.

(-2,-2) 3:4 (2,-4)

AP + BP = AB
3 + BP = 7
BP = 7 – 3
BP = 4

Que. 9. Find the coordinates of the points which divide the line segment AB joining the points A (- 2, 2) and B (2, 8) into four equal parts.

Point P divides the line segment AB. = 1 : 3
Point Q divides the line segment AB. = 2 : 2
= 1 : 1
Point R divides the line segment AB. = 3 : 1

Que. 10. Find the area of a rhombus whose vertices are (3, 0), (4, 5), (– 1, 4) and (– 2, – 1), in that order.
[Hint: Area of rhombus = 1/2 (product of its diagonals)]



