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Real numbers/Several subsets/Concepts of boundedness/Exercise
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Real numbers
Examine for each of the following subsets
M
⊆
R
{\displaystyle {}M\subseteq \mathbb {R} }
the concepts upper bound, lower bound, supremum, infimum, maximum and minimum.
{
2
,
−
3
,
−
4
,
5
,
6
,
−
1
,
1
}
{\displaystyle {}\{2,-3,-4,5,6,-1,1\}}
,
{
1
2
,
−
3
7
,
−
4
9
,
5
9
,
6
13
,
−
1
3
,
1
4
}
{\displaystyle {}\left\{{\frac {1}{2}},{\frac {-3}{7}},{\frac {-4}{9}},{\frac {5}{9}},{\frac {6}{13}},{\frac {-1}{3}},{\frac {1}{4}}\right\}}
,
]
−
5
,
2
]
{\displaystyle {}]-5,2]}
,
{
1
n
∣
n
∈
N
+
}
{\displaystyle {}{\left\{{\frac {1}{n}}\mid n\in \mathbb {N} _{+}\right\}}}
,
{
1
n
∣
n
∈
N
+
}
∪
{
0
}
{\displaystyle {}{\left\{{\frac {1}{n}}\mid n\in \mathbb {N} _{+}\right\}}\cup \{0\}}
,
Q
−
{\displaystyle {}\mathbb {Q} _{-}}
,
{
x
∈
Q
∣
x
2
≤
2
}
{\displaystyle {}{\left\{x\in \mathbb {Q} \mid x^{2}\leq 2\right\}}}
,
{
x
∈
Q
∣
x
2
≤
4
}
{\displaystyle {}{\left\{x\in \mathbb {Q} \mid x^{2}\leq 4\right\}}}
,
{
x
2
∣
x
∈
Z
}
{\displaystyle {}{\left\{x^{2}\mid x\in \mathbb {Z} \right\}}}
.
Create a solution
,
,
![{\displaystyle {}]-5,2]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/e0e601e40539dd807f9c8ef93644c8cf6ba52d10)
,
,
,
,
,
,
.
