Keyword | CPC | PCC | Volume | Score | Length of keyword |
---|---|---|---|---|---|

transitive property geometry proofs | 1.88 | 0.5 | 3769 | 75 | 35 |

transitive | 1.66 | 0.5 | 3873 | 97 | 10 |

property | 0.63 | 0.8 | 6859 | 84 | 8 |

geometry | 0.25 | 0.4 | 7025 | 87 | 8 |

proofs | 1.83 | 0.3 | 5409 | 54 | 6 |

Keyword | CPC | PCC | Volume | Score |
---|---|---|---|---|

transitive property geometry proofs | 1.12 | 0.2 | 5250 | 85 |

A transitive property in mathematics is a relation that extends over things in a particular way. For example, “is greater than.” If X is greater than Y, and Y is greater than Z, then X is greater than Z.

The Transitive Property illustrates how logic and deductive reasoning are used in mathematics. The Transitive Property shows how to draw conclusions from the information available.

The transitive property of equality is that, if M equals N, and N equals P, then M also equals P. The transitive property of inequality states that if M is greater than N and N is greater than P, then M is also greater than P. The transitive property of inequality also holds true for less than, greater than or equal to, and less than or equal to.