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Determine the points of discontinuity of the function f and the nature of discontinuity at each of those points:
f ={-x², when x ≤ 0.
4-5x , when 0<x≤1
3x-4x², when 1<x≤2
-12x + 2x , when x>2}
Also check whether the function f is derivable at x = 1
Evaluate:
Lim↓ n→∞ [ n/1+n² + n/4+ n² +n/9+ n² +...... +n/2n²]
Show that (1/n²+ n+1)↓n∈N
is a Cauchy sequence.
Let
(a↓n)↓n∈ N be any sequence. Show that Lim a↓n =L where n approaches ∞ iff for every ε >0 there exists
some N ∈ N such that n ≥ N implies a↓n ∈ N↓ε (L)
The product of two divergent sequences is divergent. True or false? Justify.
Give an example of a divergent sequence which has two convergent subsequences.
Justify your claim.
Give an example for each of the following:
A bijection from N↓odd to Z.
Give an example for each of the following: _
A set S with S° = S.
Give an example for each of the following:
A set having no limit point.
Give an example for each of the following:
A set in R whose all points except the one are its limit points.
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