Write a detailed computation of the homology of lens spaces based on the exposition in the book. Include all definitions, write down the theorems you use and give details of all computations. Make sure you understand everything you write yourself!
Finish with applying this to all lens spaces (up to homeomorphism) of dimension 3 which are quotients by the cyclic group of order 5.
Deadline: Thursday April 12 (but you may deliver directly to me as soon as you are done.)