Exercícios sobre domínio de uma função

$\,\lbrace \, x\; \mid \; x \in \mathbb{R}\;$ e $\;x \neq \frac{1}{2} \,\rbrace\,$

$\,\lbrace \, x\; \mid \; x \in \mathbb{R}\;$ e $\;x > \frac{1}{2} \,\rbrace\,$

$\,\lbrace \, x\; \mid \; x \in \mathbb{R}\;$ e $\;x \geqslant \frac{1}{2} \,\rbrace\,$

$\, \mathbb{R} _+$

$\, \mathbb{R}$

$\,[4;\,+\infty[\,$

$\,]-\infty;\,4]\,$

$\,\lbrace \, x \in \mathbb{R} \; \mid \; x \leqslant 4 \;\;\mbox{e}\;\; x \, \neq \, 0 \,\rbrace\,$

$\,\mathbb{R}\,-\,\lbrace 4 \rbrace\,$

$\,\mathbb{R}^{\large{*}}\,$

$\,\mathbb{R}\,-\,\lbrace \, \frac{1}{2}\,\rbrace\phantom{X}$

$\,\mathbb{R}\,-\,\lbrace \, \frac{-1}{2}\,\rbrace\,$

$\,\mathbb{R}\,-\,\lbrace \, \frac{-5}{3}\,\rbrace\,$

$\,\mathbb{R}\,-\,\lbrace \, \frac{5}{3}\,\rbrace\,$

$\,\mathbb{R}\,-\,\lbrace \, \frac{-3}{5}\,\rbrace\,$

A sentença verdadeira é:

$f(1)\,=\,1\,$;

o domínio de $\;f(x)\;$ é $\,\lbrace\,x\in\mathbb{R}\;\mid\;x\neq 0 \,\rbrace\,$;

o conjunto imagem de $\;f(x)\;$ é $\,\lbrace\,y\in\mathbb{R}\;\mid\;y > 0 \,\rbrace\,$;

$f(x)\,$ é decrescente para $\,0 < x < 1\,$;

$\,f(x)\,=\,\mid x\, \mid \,$, para $\,x < 0\,$ ou $\,x > 1\,$.

resposta:

a) $\,D\,=\,\lbrace\,x\,\in\,{\rm I\!R}\,|\,-2\,\leqslant\,x\,\leqslant\,3\,\rbrace\,\;$
$\,Im\,=\,\lbrace\,y\,\in\,{\rm\,I\!R}\,|\,-1\,\leqslant\,y\,\leqslant\,4\,\rbrace\,$ ou D = [-2 ; 3] e Im = [-1 ; 4]

b) $\,D\,=\,\lbrace\,x\,\in\,{\rm I\!R}\,|\,x\,\neq\,0\,\rbrace\,\;$
$\,Im\,=\,\lbrace\,y\,\in\,{\rm\,I\!R}\,|\,-2\,\lt\,y\,\lt\,0\phantom{X}{\text ou}\phantom{X}1\,\lt\,y\,\lt\,2\,\rbrace\,$ ou D = R-{0} e Im = ]-2 ; 0[ ∪ ]1 ; 2[

c) não é função.

d) $\,D\,=\,\lbrace\,x\,\in\,{\rm I\!R}\,|\,-2\,\leqslant\,x\,\leqslant\,1\,\rbrace\,\;$
$\,Im\,=\,\lbrace\,y\,\in\,{\rm\,I\!R}\,|\,0\,\leqslant\,y\,\leqslant\,4\,\rbrace\,$ ou D = [-2 ; 1] e Im = [0 ; 4]

e) não é função

f) $\,D\,=\,\lbrace\,x\,\in\,{\rm I\!R}\,|\,-2\,\lt\,x\,\lt\,2\,\rbrace\,\;$
$\,Im\,=\,\lbrace\,1; 2\,\rbrace\,$ ou D = ]-2 ; 2[ e Im = {1, 2}