The pair of equations x - 2 y = -5 and 3x - 6y = 15 represent graphically
1 point
Parallel lines
Intersecting lines
Coinciding lines
None of these
Answers
Answer:
Coinciding lines
Step-by-step explanation: x-2y= -5 and 3x-6y=15
x-2y+5= 0 and 3x-6y-15= 0
in general form ax+by+c = 0
a1 =1 , b1 =-2 , c1 = 5
a2 = 3, b2 = -6, c2 = -15
now,
a1/a2 = 1/3, b1/b2 = -2/-6 = 1/3, c1/c2 = 5/-15 = -1/3
therefore, a1/a2 = b1/b2 is not equal to c1/c2
Hence, they are coinciding lines
You can check and draw the graph on your own.
Answer:
Parallel lines
Note:
★ If we consider two lines whose equations are ax + by + c = 0 and a'x + b'y + c' = 0 ;
Then ;
• They are intersecting if a/a' ≠ b/b'
• They are coincident if a/a' = b/b' = c/c'
• They are parallel if a/a' = b/b' = c/c'
Solution:
Here,
The given equations of lines are ;
x - 2y = -5
3x - 6y = 15
The given system of lines can be rewritten as ;
x - 2y + 5 = 0
3x - 6y - 15 = 0
Clearly,
a = 1
a' = 3
b = -2
b' = -6
c = 5
c' = -15
Thus,
a/a' = 1/3
b/b' = -2/-6 = 1/3
c/c' = 5/-15 = -1/3
Clearly,
a/a' = b/b' ≠ c/c'
Hence,
The given lines are parallel .