The determinant function calculates online the determinant of vectors or the determinant of a matrix.
determinant(matrix)
determinant(`[[3;1;0];[3;2;1];[4;1;7]]`), returns 22
The determinant calculator allows to find determinants online. The calculator can calculate determinant of two vectors , determinant of three vectors or determinant of matrix .
In an orthonormal coordinate system (O,`vec(i)`,`vec(j)`) , the vector `vec(u)` has coordinates (x,y) (`vec(i)`,`vec(j)`), the vector `vec(v)` has coordinates (x',y'). The determinant of `vec(u)` et `vec(v)` is equal to the number xx'-yy'.
The calculator can calculate determinants giving exact results : to calculate the determinant of (3,`1/2`) and (`4/5`,2), enter determinant(`[[3;1/2];[4/5;2]]`), after calculation, the result is returned.
The calculator allows for symbolic calculations, it is possible to use letters : to calculate a determinant of two vectors as follows : (a,b) et (3a,2), enter determinant(`[[a;b];[3a;2]]`), after calculation, the result is returned.
Note: When the determinant of two vectors is zero, the two vectors are collinear.
In an orthonormal coordinate system (O,`vec(i)`,`vec(j)`,`vec(k)`), the vector `vec(u)` has coordinates (x,y,z) , the vector `vec(v)` has coordinates (x',y',z'), the vector `vec(k)` has coordinates (x'',y'',z''). The determinant of `vec(u)`, `vec(v)`, `vec(k)` is equal to the number xy'z''+x'y''z+x''yz'-xy''z'-x'yz''-x''y'z.
To calculate a determinant of three vectors, use the following syntax : determinant(`[[3;1;0];[3;2;1];[4;0;7]]`).
The determinant calculator can be used on square matrices of order n, it is also able to do symbolic calculations. To calculate a matrix determinant, use the following syntax : determinant(`[[3;1;0];[3;2;1];[4;1;2]]`).