# Solving n linear equation

I am trying to solve n linear equations with n variables. I used cramer's rule but in cases it failed when determinant is equal to zero. How to approach this problem ?

I am using c language.

Also my linear equation is of form:

for `n = 3`:

``````- x + y + z = a
x - y + z = b
x + y - z = c
``````

for `n = 2`:

``````- x + y = a
x - y = b
``````

I am unable to proceed further.

-

when solving with cramer, if the determinant is zero you have two cases:

• at least one variable has a non zero - determinant: there is no solution
• the determinant for all variables is zero: then you have an infinite number of solutions.

in the last case, you can find an answer in terms of one of the variables.

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If the determinant is equal to zero, then the system is degenerate, meaning that there are either no solutions or an infinite number of solutions. Consider your second example:

``````-x+y=a
x-y=b
``````

We can rewrite this as

``````x-y=-a
x-y=b
``````

So either `b=-a`, in which case any pair `(x,x-b)` is a solution, or else `b!=-a` in which case there are no solutions.

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In `Ax = b`, when the determinant of `A` is equal to zero there is no unique solution. In particular, if `b` is 0 there are infinitely many solutions. It's also possible that no solution exists.
• returning the `x` that minimizes the difference between `Ax` and `b`
The fact that `b!=0` does not guarantee that no solution exists. E.g., in the second example from the OP, there are infinite solutions provided that `a=-b`. –  mrip Oct 6 at 21:47