Exercícios sobre união de conjuntos

a) $\,\{1\}\,\notin \mathbb{A}\,$
b) $\,\{1\}\,\subset \mathbb{A}\,$
c) $\,\{1\}\,\cap\,\{2\}\,\not\subset \, \mathbb{A}\,$
d) $\,2\,\in \mathbb{A}\,$
e) $\,\{1\}\,\cup\,\{2\}\,\in \, \mathbb{A}\,$

resposta:

Resolução:
Como $\;X\cap A = \varnothing\;\;$ e $\;\;X \cup A = S\;$, então $X = \overline{A} = S - A = \sideset{}{_S^A}\complement \;\Rightarrow$
$\Rightarrow\;X = \lbrace 1;3;5\rbrace$

Resposta:

$\;X = \lbrace 1;3;5\rbrace$
×

a. $A\;\cup\;B$

b. $\;A\;\cup\;C$

c. $\;B\;\cup\;C$

d. $\;A\;\cap\;B$

e. $\;A\;\cap\;C$

f. $\;B\;\cap\;C$

g. $\;(A\;\cup\;B)\;\cap\;C$

h. $\;A\;\cup\;(B\;\cap\;C)$

i. $\;A\;\cup\;B\;\cup\;C$

j. $\;A\;\cap\;B\;\cap\;C$

k. ${\large \sideset{}{_S^{(A \cup B)}}\complement }$

l. ${\large\sideset{}{_S^A}\complement\; \cup \; \sideset{}{_S^B}\complement}$

m. ${\large \sideset{}{_A^{(A \cap B)}}\complement}$

n. ${\large \sideset{}{_B^{(A \cap B)}}\complement}$

$\;A \subset \mathbb{N}$

$\;A \subset \mathbb{R}_+$

$\;A \cup \mathbb{Z}_+ \;=\; \mathbb{Z}_+$

$\;A \cap \mathbb{Z}_- \;=\;A$

$\;A \cap \mathbb{N}\;=\;2$

n(A) = 2 e n(B) = 4

n(A) = 4 e n(B) = 2

n(A) = 3 e n(B) = 3

n(A) = 4 e n(B) = 4

n(A) = 1 e n(B) = 5

$\,A\,=\,\varnothing$

$\,A\,\supset\,B$

$\,A\,\subset\,B$

$\,A\,\supset\,B\;$ ou $\;B\,\supset\,A$

$\,A\,\subset\,B\;$ e $\;B\,\subset\,A$

$\,X \,\subset\, Y$

$\,X \,=\,Y$

$\,X\,\cap\,Y\,=\,Y$

$\,X \,=\,\varnothing $

$\,Y\,\subset\,X$

a) $\,\varnothing$	b) $\,\lbrace\,1,3\,\rbrace$
c) $\,\lbrace\,1, 3, 4\,\rbrace$	d) $\,\lbrace 1, 2, 3, 5\,\rbrace$
e) $\,\lbrace 1, 2, 3, 4, 5\,\rbrace$

a)	{a, b, c, e}	b)	{a, c, e}	c)	A
d)	{b, d, e}	e)	{a, b, c, d}