Question

Find the conditions that the straight lines y = m₁x + c₁, y = m₂x + c₂ and y = m₃x + c₃ may meet in a point.

Answer 1

Given:

The given lines can be written as follows: 

m₁x – y + c₁ = 0 … (1) 

m₂x – y + c₂ = 0 … (2) 

m₃x – y + c₃ = 0 … (3) 

To  find: 

Conditions that the straight lines y = m₁x + c₁, y = m₂x + c₂ and y = m₃x + c₃ may meet in a point. 

Concept Used: 

Determinant of equation is zero. 

Explanation: 

It is given that the three lines are concurrent.

⇒ m₁(-c₃ + c₂) + 1(m₂c₃-m₃c₂) + c₁(-m₂ + m₃) = 0 

⇒ m₁(c₂-c₃) + m₂(c₃-c₁) + m₃(c₁-c₂) = 0 

Hence, the required condition is m₁(c₂-c₃) + m₂(c₃-c₁) + m₃(c₁-c₂) = 0