In what ratio does the line x-y-2=0 divides the line segment joining (3,-1), and (8,9)?
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Question:
In what ratio does the line x-y-2=0 divide the line segment joining the points A (3, -1) and B (8, 9)?
Answer:
Let the ratio be k:1.
And, point of intersection be (X,Y).
Now,
X = (m₁x₂ + m₂x₁) /( m₁ + m₂)
X = (k*8 + 1*3) / (k+1)
X = (8k + 3) /( k + 1)
And,
Y = (m₁y₂ + m₂y₁) /( m₁ + m₂)
Y = ( k* 9 - 1*1) / (k+1)
Y = (9k-1)/(k+1)
Now,
Since, the point (X,Y) also lies on x - y - 2 = 0.
So, it will satisfy the given equation,
x - y - 2 = 0.
(8k+3)/(k+1) - (9k-1)/(k+1) - 2 = 0
⇒ (8k + 3 - 9k - 1)/ (k+1) = 2
⇒ -k +4 = 2k + 2
⇒ 4 = 2k+ k + 2
⇒2 = 3k
⇒ 2/3 = k
or, k = 2 / 3
Now,
Ratio = k : 1 = (2 / 3) : 1 = 2 : 3
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