Answer:
Step-by-step explanation:
System of a equation has no solution when both the lines are parallel.
In other words, if the equations of a system have equal slopes there will be no solution.
1). x + 4y = 23
4y = -x + 23
[tex]y=-\frac{1}{4}x+23[/tex] ------(1)
-3x = 12y + 1
12y = 3x - 1
[tex]y=\frac{1}{4}x-\frac{1}{12}[/tex] -------(2)
Since, both the equations have different slopes, system will have at least one solution.
2). 2x + 4y = 22 -----(1)
-x = 2y - 11
-x - 2y = -11
x + 2y = 11
2x + 4y = 22 ------(2)
Since, both the equations are same, there will be infinite number of solutions.
3). 2x + y = 15 ------(1)
x = 15 - 2y
x + 2y = 15 -----(2)
Both the equations are different, therefore system of equations will have at least one solution.
4). 2x + y = 17 ------(1)
-4x = 2y - 34
-4x - 2y = -34
2x + y = 17 -----(2)
Both the equations are different, therefore, system of equations will have infinite solutions.
5). 3y = 10 - x
x + 3y = 10
2x + 6y = 20 -------(1)
2x + 6y = 7 ---------(2)
Since, both the lines are parallel (Same slopes), system will have no solution.
6). y = 13 - 2x ------(1)
4x - y = -1
-y = -4x - 1
y = 1 + 4x --------(2)
Since, both the equations are different, system of equations will have at least one solution.
