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Question
Show graphically that each of the following given systems of equations is inconsistent,i.e., has no solution:
x−2y=6,3x−6y=0
Show graphically that each of the following given systems of equations is inconsistent,i.e., has no solution:
x−2y=6,3x−6y=0
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Solution
We have, x−2y=6 and 3x−6y=0
Now x-2y=6
= x= 6+2y
When y=-2 then, x=2
When y=-3 then, x=0
Thus, we have the following table giving points on the line x-2y=6
X
2
0
Y
-2
-3
Now , 3x - 6y = 0
=x = 2y
When y = 0, then y = 0
When y=-1 , then x = 2
Thus, we have the following table giving points on the line 3x - 6 y = 0
X
0
2
Y
0
1
Graph of the equation x-2y=6 and 3x-6y=0
Clearly, two lines are parallel to each other. So, the two lines have no common point.
Hence the given system has no solutions.
We have, x−2y=6 and 3x−6y=0
Now x-2y=6
= x= 6+2y
When y=-2 then, x=2
When y=-3 then, x=0
Thus, we have the following table giving points on the line x-2y=6
| X | 2 | 0 |
| Y | -2 | -3 |
Now , 3x - 6y = 0
=x = 2y
When y = 0, then y = 0
When y=-1 , then x = 2
Thus, we have the following table giving points on the line 3x - 6 y = 0
| X | 0 | 2 |
| Y | 0 | 1 |
Graph of the equation x-2y=6 and 3x-6y=0
Clearly, two lines are parallel to each other. So, the two lines have no common point.
Hence the given system has no solutions.
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