Cover all of the material in the subsection on Induced homomorphisms except Proposition 1.14, Example 1.15 ad Corollary 1.16. In particular, for a continuous map φ: X -> Y, define the induced homomorphism φ*: π1(X) -> π1(Y). Show that this is well defined and satisfies the two properties on the bottom of p.34. State and prove Proposition 1.17. Show that if φt is a base-point preserving homotopy then (φ0)*=(φ1)* (bottom of pg. 36). (Do NOT talk about the notion of homotopy equivalence for spaces with basepoints.) State and prove Proposition 1.18 on p. 37 (if φ is a homotopy equivalence then φ* is an isomorphism).