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'''[[Eugène Rouché|Rouché]]–[[Alfredo Capelli|Capelli]] theorem''' is the theorem in [[linear algebra]] that allows computing the number of solutions in a [[system of linear equations]] given the ranks of its [[augmented matrix]] and [[coefficient matrix]]. The theorem is known as '''[[Leopold Kronecker|Kronecker]]–Capelli theorem''' in Russia, '''Rouché–Capelli theorem''' in Italy, '''Rouché–Fontené theorem''' in France and '''Rouché–[[Ferdinand Georg Frobenius|Frobenius]]''' theorem in Spain and many countries in Latin America.
 
== Formal statement ==
A system of linear equations with n variables has a solution [[if and only if]] the [[Rank (linear algebra)|rank]] of its [[coefficient matrix]] ''A'' is equal to the rank of its [[augmented matrix]]&nbsp;[''A''|''b'']. If there are solutions, they form an [[affine subspace]] of <math>\mathbb{R}^n</math> of dimension ''n''&nbsp;&minus;&nbsp;rank(''A''). In particular:
* if ''n''&nbsp;=&nbsp;rank(''A''), the solution is unique,
* otherwise there are infinite number of solutions.
 
==References==
* {{cite book | author=A. Carpinteri | title=Structural mechanics | page=74 | publisher=Taylor and Francis | isbn=0-419-19160-7 | year=1997 }}
 
{{DEFAULTSORT:Rouche-Capelli theorem}}
[[Category:Theorems in linear algebra]]
[[Category:Matrix theory]]
 
 
{{Linear-algebra-stub}}
 
[[cs:Soustava lineárních rovnic#Frobeniova věta]]

Revision as of 09:44, 8 November 2013

RouchéCapelli theorem is the theorem in linear algebra that allows computing the number of solutions in a system of linear equations given the ranks of its augmented matrix and coefficient matrix. The theorem is known as Kronecker–Capelli theorem in Russia, Rouché–Capelli theorem in Italy, Rouché–Fontené theorem in France and Rouché–Frobenius theorem in Spain and many countries in Latin America.

Formal statement

A system of linear equations with n variables has a solution if and only if the rank of its coefficient matrix A is equal to the rank of its augmented matrix [A|b]. If there are solutions, they form an affine subspace of n of dimension n − rank(A). In particular:

  • if n = rank(A), the solution is unique,
  • otherwise there are infinite number of solutions.

References

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Template:Linear-algebra-stub

cs:Soustava lineárních rovnic#Frobeniova věta