Sample midterm 1 questions-
1. Prove that 1 + √(1+ √2) is irrational.
2. Consider the following series defined for n ∈ N:
∑8n/(n!)2, ∑(-1)n/√(n2 + n).
For each series, determine whether they converge or diverge. If you make use of any of the theorems for determining series properties, you should state which one you use.
3. (a) Let S and T be non-empty bounded subsets of R. Prove that sup S ∪ T = max{sup S, sup T} and sup S ∩ T ≤ min{sup S, sup T}.
(b) Extend part (a) to the cases where S and T are not bounded.
(c) Give an example where sup S ∩ T < min{sup S, sup T}.
4. Suppose that (sn) is a convergent sequence and (tn) is a sequence that diverges to ∞. Prove that limn→∞ sn + tn = ∞.
5. (a) Let (sn) and (tn) be two sequences defined for n ∈ N. Prove that lim sup sn + lim sup tn ≥ lim sup sn + tn.
(b) Construct an example where (lim sup sn) · (lim sup tn) ≠ lim sup(sntn).
6. Let (an) and (bn) are sequences defined for n ∈ N. Suppose that an → a and bn → b as n → ∞ for some a, b ∈ R. If an ≤ bn for all n, show that a ≤ b.