Answer:
So such system with fewer equations than unknowns can never have a unique solution.
Explanation:
Linear equations are equations which contain variable with degree 1.
The variables can be 1 or 2 or any other number
say there are n varaibles
Then to solve this we must have n independent equations.
If number of equations are less than number of variables we can have parametric solutions only with infinite points lying on it.
There is no chance for this to have a unique solution.
For unique solutions, there must be equal number of equations with the variables and the determinant formed by the coefficients should not be 0.
So such system with fewer equations than unknowns can never have a unique solution.