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slash
(/) right division and feed back
Description
Right division: X=A/B is the solution of X*B=A.
The slash (right division) and backslash (left division) operators are linked by the following equation:
B/A=(A'\B')'.
In the case where A is square, the
solution X can be computed either from LU
factorization or from a linear least squares solver. If the
condition number of A is smaller than
1/(10*%eps) (i.e. if A is
well conditioned), the LU factorization with row pivoting is
used. If not (i.e. if A is poorly
conditioned), then X is the minimum-norm
solution which minimizes ||A*X-B|| using
a complete orthogonal factorization of A
(i.e. X is the solution of a linear least
squares problem).
A./B is the element-wise right division, i.e.
the matrix with entries A(i,j)/B(i,j).
If B is scalar (1x1 matrix) this
operation is the same as A./B*ones(A). Same
convention if A is a scalar.
 | Remark that 123./B is interpreted as
(123.)/B. In this cases dot is part of the
number not of the operator. |
System feed back. S = G/.K evaluates
S = G*(eye() + K*G)^(-1) this operator avoid
simplification problem.
| Remark that G/.5 is interpreted as
G/(.5). In such cases dot is part of the
number, not of the operator. |
Comment // comments a line i.e. lines which
begin by // are ignored by the interpreter.
It is the same with /* which start to comment a
block of code and with */ which end to comment this block.
Examples
a=[3.,-24.,30.]; B=[ 9. -36. 30. -36. 192. -180. 30. -180. 180. ]; x=a/B x*B-a // close to zero a=4 / 2; // Should be 2 a=2 ./ [2,4]; // 1. 0.5 // Comments are good. They help to understand code /* Even long, that is to say on many lines, comments are useful */
See also
History
| Version | Description |
| 5.4.1 | The threshold level for conditioning in slash increased. |
| Report an issue | ||
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