2) Let I⊂R be a non-empty compact interval, and f:I→R a continuous function with f(I)⊂I (i) Show that f has a fixed point, i.e., there exists c∈I with f(c)=c. (ii) Notice how the statement in (i) really rests upon five assumptions: I is closed, bounded, and an interval; f:I→R is continuous; and f(I)⊂I. Demonstrate by means of (five, simple) examples that the conclusion in (i) may fail, i.e., f may not have a fixed point, if any one of these five assumptions is omitted.