Find the equation of a straight line through the point of intersection of the lines 8x + 3y = 18.
4r + 5y =9 and bisecting the line segment joining the points (5, 4) and (-7,6). MP
Answers
Solution :
Step 1.
( Finding the point of intersection of the given lines )
The given lines are
- 8x + 3y = 18 .....(1)
- 4x + 5y = 9 .....(2)
Multiplying (2) no. equation by 2 and subtracting from (1) no. equation, we get
8x + 3y - 8x - 10y = 18 - 18
⇒ - 7y = 0
⇒ y = 0
Putting y = 0 in (1) no. equation, we get
8x + 0 = 18
⇒ 8x = 18
⇒ x = 9/4
Thus, (9/4, 0) is the point of intersection.
Step 2.
( Finding the mid-point of the line segment joining the points (5, 4) and (- 7, 6) )
The two points are (5, 4) and (- 7, 6)
Thus, the middle point is
((5 - 7)/2, (4 + 6)/2)
i.e., (- 2/2, 10/2)
i.e., (- 1, 5)
Step 3.
( Finding the required line joining the points mentioned )
We have to find the straight line joining the points (9/4, 0) and (- 1, 5)
∴ the required line is
(x - 9/4)/(9/4 + 1) = (y - 0)/(0 - 5)
⇒ (4x - 9)/(9 + 4) = - y/5
⇒ (4x - 9)/13 = - y/5
⇒ 5 (4x - 9) + 13y = 0
⇒ 20x - 45 + 13y = 0
⇒ 20x + 13y = 45 (Ans.)