Answer:
a) True
b) False
c) False
d) True
e)False
Step-by-step explanation:
a) True because Since it is non-empty and it is bounded maximum of A is an upper bound and hence contains supremum
b) False because  Suppose A to be the interval (0,1) and L= 1. Then clearly supA= 1 < 1 = L
c) False because Let A= (0,1) and B = {1} it shows that Sup A =1 = Inf B
d)True
e)False because lets Take for both A and B the interval (0,1). it is easy to see that supA ≤ supB, but no element of B is an upper bound for A.
Answer:
A) TRUE
B) FALSE
C) Â FALSE
D) TRUE
E) Â FALSE
Step-by-step explanation:
A) Â Â A finite, nonempty set always contains its supremum. This is TRUE. Do remember that a "finite" set is one with finitely elements,not a "bounded" set. There is always a maximum element, and the server as the supremum.
B) If a∠L for every element a in the set A, then sup. A∠L FALSE Let A=(0,1), the open interval Let L=1. then sup. A=L
C)  If A and B are sets with the property that a∠b for every a ∈ A and every b ∈ B, then it follows that sup A ∠inf B. FALSE. We use open intervals again. Let A= (0,1) and B =(1,2). Then sup A=inf B =1
D) If sup A= s and B=t, then sup(A+B)=s+t. The set A+B is defined as A+B= (a+b : a ∈ A and b ∈ B) TRUE
E) If sup A ≤ sup B, then there exists an elements b ∈ B that is an upper bound for A. FALSE. We can take both A and B to be the open interval (0,1). The superma are of course the same (1), and there is no element of B that is an upper bound of A.
