Answer:
The system has an infinite solution at k = 6, otherwise for any value of k, it has zero solution.
Step-by-step explanation:
Consider the system of linear equations:
[tex]3x_{1} -x_{2}=2\;\;\;\;\;\;(1)\\ 9x_{1} -3x_{2}=k\;\;\;\;\;(2)[/tex]
The system of linear equations can have zero, one, or an infinite number of solutions:
simplify equation (1):
[tex]x_{2}=3x_{1} -2[/tex]
substitute in equation (2), we get
[tex]9x_{1} -3(3x_{1}-2)=k\\9x_{1} -9x_{1}+6=k\\0+6=k[/tex]
we cannot find the value of [tex]x_{1}[/tex] and [tex]x_{2}[/tex].
so, there is no solution.
Multiply the equation (1) with 3 and put k is 6,
[tex]3(3x_{1} -x_{2})=3\times2\\9x_{1} -3x_{2})=6[/tex]
it means both equations are overlapped. Then, the solution has infinite solutions.
Hence, the system has an infinite solutions at k is 6 otherwise for any value of k it has no solution.
