The system was designed so that they would be consistent.
A system of linear equations is consistent if there is only one solution for the system. Thus, if you see that the drawn lines intersect, you can say that the system is consistent, and the point of intersection is the only solution for the system. A system of linear equations is inconsistent if it does not have any solution. Thus, if you see that the drawn lines are parallel, you can say that the system is inconsistent, and there is not any solution for the system.
When its matrix is non-singular.
Consistent.
A system of linear equations that has at least one solution is called consistent.
In mathematics a system is said to be consistent if it does not contain proofs for statement P and the negation of P. It is, however, possible to have one consistent system where P is true and another consistent system where ~P is true.
The system was designed so that they would be consistent.
It is
consistent dependent
A system of linear equations is consistent if there is only one solution for the system. Thus, if you see that the drawn lines intersect, you can say that the system is consistent, and the point of intersection is the only solution for the system. A system of linear equations is inconsistent if it does not have any solution. Thus, if you see that the drawn lines are parallel, you can say that the system is inconsistent, and there is not any solution for the system.
When its matrix is non-singular.
Consistent.
It is well-defined, consistent and more practical.
A system of linear equations that has at least one solution is called consistent.
How did the values identified in John Locke's Social Contract Theory become consistent with the criminal justice system?
does it stay the same or not? Actually, a system is inconsistent if you can derive two (or more) statements within the system which are contradictory. Otherwise it is consistent. For example, Eucliadean geometry requires that given a line and a point not on that line, you can have one and only one line through the point which is parallel to the original line. However, you can have a consistent system of geometry if you assume that there is no such parallel line. This is known as the projective plane. You can assume that there will be an infinite number of parallel lines through a point not on the line. And again you can have a consistent system. Consistency or inconsistency has nothing whatsoever to do with time.
A consistent system.