3x + y 4 = 0
and 6x – 2y+ 4 =0
on comparing with ax + by + c = 0, we get
a1=3, b1=1and c1=4 a2=6, b2=−2and a2=6, b2=−2 c2=4here a1a2=36=12b1b2=and c1c2=44=11∴ a1a2≠b1b2 So, the given pair of linear equations are intersecting at one point, therefore these lines have unique solution.
Hence, given pair of linear equations is consistent
We have, 3x + y + 4 = 0
⇒ y =-4 - 3x
When x = 0, then y = - 4
When x = - 1, then y = - 1
When x = - 2, then y = 2
X0−1−2Y−4−12PointsBCA and 6x – 2y + 4 = 0
⇒ 2y = 6x + 4
⇒ y = 3x + 2
When x = 0, then y = 2
When x = - 1, then y = - 1
When x = 1, then y = 5
X−1−1−2Y−1−12PointsCQP Plotting the points B (0, - 4) A (-2, 2) we get the straight tine AB. Plotting the points Q (Q, 2) and P (1, 5), we get the straight line PQ. The lines AB and PQ PQ intersect at C (-1, -1)