Answer:
The equation is overspecified.
Step-by-step explanation:
An equation is solvable if it satisfies the following conditions:
1. The number of equations equals the number of unknowns.
2. There is a unique solution for each unknown term.
A degree of freedom analysis solves the issue. The degree of freedom is given as follows:
F = M-N-R
where F is the net result,
M = number of unknown variables
N = number of equations
R = number of known variables
For an equation to be solvable, the net result, F should be zero (0)
Sometimes a set of equations can have more solutions for the unknowns. In this case, the equations are independent and overspecified.
In this case, the equation has infinite number of solutions.
