Suprema and 7: Cosider the the function 14x f: R → R, 7+ x2 and the sets Ti = f(R) = {f(x)|x € R} CR_and T2 = f(Q) = {f(q) [q € Q} c R. In this question you may use the following facts: (Q5) Vr, y E R+ (r < y) (x² < }); (Q6) V.r, y E R+ (r< y) + < : (Q7) Vĩ ¢ Q. Hint: In Parts(a)-(d) you may find some of the ideas in the solution to Tutorial 4A Question useful. In Part(e) you may wish to use proof by contradiction.

Transcribed Image Text:

2. Suprema and 7: Consider the the function 14x f: R → R, 7+ x² and the setS T1 = f(R) = {f (x) | x € R} C R and T2 = f(Q) = {f(q) |q € Q} c R. In this question you may use the following facts: (Q5) Vr, y E R+ (r < y) → (x² < } ); (Q6) V.r, y E IR+ (r < y) → ; < : (.r < y) + ; 1 (Q7) Vĩ ¢ Q. Hint: In Parts(a)-(d) you may find soune of the ideas in the solution to Tutorial 4A Question 1 useful. In Part(e) you may wish to use proof by contradiction. You may wish to use methods of calculus to assist to in understanding this question. However, calculus is not necessary to solve this question and should not be used in your written solutions. (a) Prove that v7 is an upper bound of Ti and of T2.