Problem 1:

The hyperbolic line consists of positive real numbers with the hyperbolic distance defined as the absolute value of . Show the composition of isometries of the hyperbolic line is an isometry of the hyperbolic line.

Problem 2:

The hyperbolic line consists of positive real numbers with the hyperbolic distance defined as the absolute value of . Suppose f is an isometry of the hyperbolic line. Can you give a formula for f ?

Subject | Mathematics |

Due By (Pacific Time) | 07/27/2015 11:00 pm |

Tutor | Rating |
---|---|

pallavi Chat Now! |
out of 1971 reviews More.. |

amosmm Chat Now! |
out of 766 reviews More.. |

PhyzKyd Chat Now! |
out of 1164 reviews More.. |

rajdeep77 Chat Now! |
out of 721 reviews More.. |

sctys Chat Now! |
out of 1600 reviews More.. |

sharadgreen Chat Now! |
out of 770 reviews More.. |

topnotcher Chat Now! |
out of 766 reviews More.. |

XXXIAO Chat Now! |
out of 680 reviews More.. |