# What does “unary minus” mean for Matrices

When we're talking about matrices or a matrix, what does "unary minus" stand for as an arithmetic operator?

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The matrix A with all the elements negated.

That way, A + (-A) == 0.

Edit: here's the source from JAMA:

``````/**  Unary minus
@return    -A
*/
public Matrix uminus () {
Matrix X = new Matrix(m,n);
double[][] C = X.getArray();
for (int i = 0; i < m; i++) {
for (int j = 0; j < n; j++) {
C[i][j] = -A[i][j];
}
}
return X;
}
``````

Edit 2: if A is

``````1 2
3 4
``````

then unary minus of A is

``````-1 -2
-3 -4
``````
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Let's say we have a matrix such that: A= | 1 2 | | 3 4 | Is -A = | -1 -2 | | -3 -4 | ? –  ahmet alp balkan Oct 21 '09 at 18:01
Yes, since A + (-A) == 0. –  Grandpa Oct 21 '09 at 18:27
But (| 1 2 |\n| 3 4 |))+ |-1 -2 |\n|-3 -4 |) is not 0 ? (\n=newline) –  ahmet alp balkan Oct 21 '09 at 18:33
Maybe I'm getting confused by your formatting, but I think it is... –  Grandpa Oct 21 '09 at 18:43
the point is that 0 = | 0 0| \n | 0 0| –  Brian Postow Oct 22 '09 at 19:43

If M is your matrix, -M is the new matrix where unary minus has been applied

(-M)[i, j] = - (M [i, j])

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"unary minus" for a matrix is an element by element negation as others has said.

More generally, in computer science, a "unary operator" is one that operates on a single operand. Other common examples from C include the '++' or '=*' unary operators.

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