Find the equation of line passing through the points A(-1,3) and B(0,2). Hence show that the points A,B and C (1,-1) are collinear.
Answers
Answer:-
Given:
A line passes through A( - 1 , 3) & B(0 , 2).
We have to find the equation of the line passing through them & Prove that A , B , C(1 , 1) are collinear.
We know that,
Slope of a line passing through the co - ordinates (x₁, y₁) and (x₂ , y₂) is :
m = (y₂ - y₁)/(x₂ - x₁)
Let,
- x₁ = - 1
- x₂ = 0
- y₁ = 3
- y₂ = 2
Hence,
→ m = (2 - 3)/( 0 - ( - 1))
→ m = - 1/1
→ m = - 1
Now,
Equation of a line ⟹ y - y₁ = m (x - x₁)
Putting the values we get,
→ y - 3 = - 1(x - ( - 1))
→ y - 3 = - x - 1
→ y + x = - 1 + 3
→ x + y = 2
Hence, the equation of the line is x + y = 2.
Now,
we have to prove that,
A , B , C are collinear.
- If three points are collinear then the area of the triangle formed by them will be zero.
- Three points are collinear if the slope of line passing through the line segment are equal.
i.e.,
Slope of AB should be equal to Slope of BC.
We have;
Slope of AB = - 1.
→ - 1 = ( 1 - 2)/(1 - 0)
→ - 1 = - 1/1
→ - 1 = - 1
Hence, A , B , C are collinear points.
Answer:
Question:-
☞ Find the equation of line passing through the points A(-1,3) and B(0,2). Hence show that the points A,B and C (1,-1) are collinear.
To Find:-
To show that the points A,B and C (1,-1) are collinear.
Solution:-
Solpe of the line AB = m =
=> 2 – 3 = -1 = -1
0 - 1 ( -1 ) 1
Using the slope point from , the equation of line AB is given by
➭ y - y1 = m( x - X1 )
➭ i.e. y - 3 = -1 [ x - ( -1 ) ]
➭ i.e. y - 3 = -1 ( x + 1 )
➭ i.e. y - 3 = - x - 1
➭ i.e. x + y = 2
Now, slope of line
BC = 1 - 2 = -1 = -1
1 - 0 1
Since, slope of line AB = slope of line BC , Point A,B and C are collinear.
☞ Hence verified.
hope this helps you ❣️