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प्रश्न
Show graphically that each one of the following systems of equations is inconsistent (i.e. has no solution) :
2y − x = 9
6y − 3x = 21
उत्तर
The given equations are
2y - x = 9 ...(i)
6y - 3x = 21 ....(ii)
Putting x = 0 in equation (i) we get
`=> 2y - 0 = 9`
`=> y = 9/2`
x = 0, y = 9/2
Putting y= 0 in equation (i) weget
`=> 2 xx -x = 9`
`=> x = -9`
`=> x = -9, y = 0`
Use the following table to draw the graph.
| x | 0 | -9 |
| y | 9/2 | 0 |
Draw the graph by plotting the two points A(0, 9/2), B(-9,0) from table
6y - 3x = 21 ...(ii)
Putting x = 0 in equation (ii) we get
`=> 6y - 3 xx 0 = 21`
`=> y = 7/2`
=> x = 0, y = 7/2
Putting y = 0 in equation (ii) we get
`=> 6 xx 0 - 3x = 21`
=> x = -7
`:. x = -7, y= 0`
Use the following table to draw the graph.
| x | 0 | -7 |
| y | 7/2 | 0 |
Draw the graph by plotting the two points C(0, 7/2), D(-7,0) from table.
Here two lines are parallel and so don’t have common points
Hence the given system of equations has no solution.
