# Chebychev–Grübler–Kutzbach criterion

## Description

The Chebychev–Grübler–Kutzbach criterion determines the degree of freedom of a kinematic chain, that is, a coupling of rigid bodies by means of mechanical constraints.These devices are also called linkages.The Kutzbach criterion is also called the mobility formula, because it computes the number of parameters that define the configuration of a linkage from the number of links and joints and the degree of freedom at each joint. The mobility formula counts the number of parameters that define the positions of a set of rigid bodies and then reduces this number by the constraints that are imposed by joints connecting these bodies. Joints that connect bodies in this system remove degrees of freedom and reduce mobility. Specifically, hinges and sliders each impose five constraints and therefore remove five degrees of freedom. The mobility of a system formed from n moving links and j joints each with freedom fi, i=1, ..., j, is given by Chebychev–Grübler–Kutzbach criterion formula.

Related formulas## Variables

M | The mobility of a linkage system (dimensionless) |

N | N=n+1 is the number of moving bodies plus the fixed body (dimensionless) |

j | The final number of joints (dimensionless) |

i | Number of joints (1,2,3....j) (dimensionless) |

f_{i} | The number of joints' freedom (dimensionless) |