Sejam $\,f\,:\, \mathbb{R} \rightarrow \mathbb{R}\;$, $\,g\,:\, \mathbb{R} \rightarrow \mathbb{R}\;$ e $\,h\,:\, \mathbb{R} \rightarrow \mathbb{R}\;$ três funções definidas por $\,f(x)\,=\,x\,+\,1\;$,$\,g(x)\,=\,x^2\,\,+x\,+\,1\;$ e $\,h(x)\,=\,1\,-\,x\;$. Determine $\,g \circ f\;$, $\;f \circ g\;$, $\;h \circ f\;$, $\;f \circ h\;$,$\;h \circ g\;\,$ e $\;\,g \circ h\,$.
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Resolução :
a) $\,(g \circ f)(x)\,=\,g \left[f(x)\right]\,=\,\left(f(x)\right)^2\,+\,f(x)\,+1\,=$ $\,=\,(x + 1)^2\,+\,(x+1)\,+\,1\,=\,(x^2\,+\,2x\,+\,1)\,+\,(x+1)\,+\,1\,=$ $\,=\,x^2\,+\,3x\,+\,3\,$ Logo $ \left\{\begin{array}{rcr} &g \circ f : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XXXXX} \\ &(g \circ f)(x)\,=\,x^2\,+\,3x\,+\,3 \\ \end{array} \right.$ b) $\,(f \circ g)(x)\,=\,f \left[g(x)\right]\,=\,g(x)\,+\,1\,=\,(x^2\,+x\,+\,1)\,+\,1\,=\,x^2\,+\,x\,+\,2$ Logo $ \left\{\begin{array}{rcr} &f \circ g : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XXXXX} \\ &(f \circ g)(x)\,=\,x^2\,+\,2x\,+\,2 \\ \end{array} \right.$ c) $\,(h \circ f)(x)\,=\,h \left[f(x)\right]\,=\,1 \,-f(x)\,=\,1\,-\,(x\,+\,1)\,=\,1\,-\,x\,-1\,=\,-x$ Logo $ \left\{\begin{array}{rcr} &h \circ f : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XXXXX} \\ &(h \circ f)(x)\,=\,-x \\ \end{array} \right.$ d) $\,(f \circ h)(x)\,=\,f \left[h(x)\right]\,=\,h(x)\,+\,1\,=\,(1\,-\,x)\,+\,1\,=\,2\,-\,x$ Logo $ \left\{\begin{array}{rcr} &f \circ h : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XXXXX} \\ &(f \circ h)(x)\,=\,2\,-x \\ \end{array} \right.$ e) $\,(h \circ g)(x)\,=\,h \left[g(x)\right]\,=\,1 \,-g(x)\,=\,1\,-\,(x^2\,+\,x\,+1)\,=$ $\,=\,1\,-\,x^2\,-x\,-1\,=\,-x^2 - x$ Logo $ \left\{\begin{array}{rcr} &h \circ g : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XXXXX} \\ &(h \circ g)(x)\,=\,-x^2\,-\,x \\ \end{array} \right.$ f) $\,(g \circ h)(x)\,=\,g \left[h(x)\right]\,=\,\left(h(x)\right)^2\,+\,h(x)\,+\,1\,=$ $\,=\,(1\,-\,x)^2 \,+\,(1\,-\,x)\,+\,1\,=\,(1\,-\,2x\,+\,x^2)\,+\,(1\,-\,x)\,+\,1\,=$ $\,=\,x^2\,-\,3x\,+\,3$ Logo $ \left\{\begin{array}{rcr} &g \circ h : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XXXXX} \\ &(g \circ h)(x)\,=\,x^2\,-\,3x\,+\,3 \\ \end{array} \right.$ É muito importante notar que $\; \left\{\begin{array}{rcr} g \circ f & \neq & f \circ g \\ h \circ f & \neq & f \circ h \\ h \circ g & \neq &g \circ h \\ \end{array} \right.$
× Seja $\,f\,:\, \mathbb{R} \rightarrow \mathbb{R}\;$ a função definida por $\,f(x)\,=\,x\,+\,1\;$. Determine $\;\,f \circ f\;\,$, $\;\;f \circ f\, \circ f\;\,$ e $\;\;f \circ f\, \circ f\, \circ f\;$.
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Resolução :
a) $\,(f \circ f)(x)\,=\,f \left[f(x)\right]\,=\, f(x)\,+\,1\,=\,(x\,+\,1)\,+\,1=\,x\,+\,2$ Portanto: $ \left\{\begin{array}{rcr} & f \circ f : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XX} \\ &(f \circ f)(x)\,=\,x\,+\,2 \\ \end{array} \right.$ b) $\,(f \circ f \circ f)(x)\,=\,(f \circ f) \left[f(x)\right]\,=\,f(x)\,+\,2\,=\,(x\,+\,1)\,+\,2\,=\,x\,+\,3$ Portanto: $ \left\{\begin{array}{rcr} &f \circ f \circ f : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XX} \\ &(f \circ f \circ f)(x)\,=\,x\,+\,3 \\ \end{array} \right.$ c) $\,(f \circ f \circ f \circ f)(x)\,=\,(f \circ f \circ f) \left[f(x)\right]\,=\,f(x)\,+\,3\,=\,(x\,+\,1)\,+\,3\,=$ $\,=\,x\,+\,4\,$ Portanto $ \left\{\begin{array}{rcr} &f \circ f \circ f \circ f : \, \mathbb{R} \rightarrow \mathbb{R}\; \phantom{XX} \\ &(f \circ f \circ f \circ f)(x)\,=\,x\,+\,4 \\ \end{array} \right.$
× Sejam $\,f\;$ e $\,g\;$ duas funções de $\,\mathbb{R} \rightarrow \mathbb{R}\,$ definidas por: $\;f(x)\,=\; \left\{\begin{array}{rcr} x\,+\,3\; \mbox{, se}& x \leqslant 3 \\ x\,-\,4\; \mbox{, se} & x \geqslant 3 \\ \end{array} \right.$
$\,g(x)\,=\,2x\,-\,7\,$,$\;\;\vee \negthickspace \negthickspace \negthickspace \negthinspace - x \,\in\, \, \mathbb{R}$
Determine $\;f \circ g\;$ e $\,g \circ f\;$.
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Resolução :
a) $\,(f \circ g)(x)\,=\,f \left[g(x)\right]\,=\,\left\{\begin{array}{rcr} g(x)\,+\,3 & \mbox{, se}\;\; g(x) \leqslant 3 \\ g(x)\,-\,4 & \mbox{, se}\;\; g(x) > 3 \\ \end{array} \right. \; \Longrightarrow$ $\,\Longrightarrow (f \circ g)(x)\,=\, \left\{\begin{array}{rcr} (2x\,-\,7)\,+\,3 & \mbox{, se}\;\; g(x) \leqslant 3 \phantom{XX} \\ (2x\,-\,7)\,-\,4 & \mbox{, se}\;\; (2x\,-\,7) > 3 \\ \end{array} \right. \; \Longrightarrow $ $\,\Longrightarrow (f \circ g)(x)\,=\, \left\{\begin{array}{rcr} 2x\,-\,4 \phantom{X} & \mbox{, se}\;\; x \leqslant 5 \\ 2x\,-\,11 \phantom{X} & \mbox{, se}\;\; x > 5 \\ \end{array} \right. \;$ b) $\,(g \circ f)(x)\,=\,g \left[f(x)\right]\,=\, \,2 \centerdot f(x) \,-\,7\,= \left\{\begin{array}{rcr} 2 \centerdot (x\,+\,3)\, - \,7 & \mbox{, se}\;\; x \leqslant 3 \\ 2 \centerdot (x\,-\,4) \,-\, 7 & \mbox{, se}\;\; x > 3 \\ \end{array} \right. \; \Longrightarrow$ $\,\Longrightarrow (g \circ f)(x)\,=\; \left\{\begin{array}{rcr} 2x\,-\,1 \; & \mbox{, se}\;\; x \leqslant 3 \\ 2x\,-\,15 & \mbox{, se}\;\; x > 3 \\ \end{array} \right. \; $ Portanto:
$\,f \circ g \; : \,\mathbb{R} \rightarrow \mathbb{R}\,$
$(f \circ g)(x)\,=\, \left\{\begin{array}{rcr} 2x\,-\,4 \; & \mbox{, se}\;\; x \leqslant 5 \\ 2x\,-\,11 & \mbox{, se}\;\; x > 5 \\ \end{array} \right. \;$
$\,g \circ f \; : \,\mathbb{R} \rightarrow \mathbb{R}\,$
$(g \circ f)(x)\,=\; \left\{\begin{array}{rcr} 2x\,-\,1 \; & \mbox{, se}\;\; x \leqslant 3 \\ 2x\,-\,15 & \mbox{, se}\;\; x > 3 \\ \end{array} \right. \; $
× Seja $\,f\,:\, \mathbb{R}_+ \rightarrow \mathbb{R}_+\;$ a função definida por $\,f(x)\,=\,x^2\;$. Determine uma função $\,g\,:\, \mathbb{R}_+ \rightarrow \mathbb{R}_+\;$ tal que a função composta $\;(f \circ g)\;$ seja uma função identidade .
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Resolução :
De $\;(f \circ g)\,=\,id\;$ decorre que:
$\,(f \circ g)(x)\,=\,id(x) \, \mbox{, } \; \vee \negthickspace \negthickspace \negthickspace \negthinspace - x \,\in\, \, \mathbb{R}_+ \, \Rightarrow $ $\Rightarrow\,f \left[g(x)\right]\,=\,x\, \mbox{, }\vee \negthickspace \negthickspace \negthickspace \negthinspace - x \,\in\, \, \mathbb{R}\,\Rightarrow $ $\Rightarrow \left[g(x)\right]^2 \,=\,x\,\mbox{, }\;\vee \negthickspace \negthickspace \negthickspace \negthinspace - x \,\in\, \, \mathbb{R}_+ \,$(pois $\,f(x)\,=\,x^2\,\mbox{, } \vee \negthickspace \negthickspace \negthickspace \negthinspace - x \,\in\, \, \mathbb{R}_+$)$\;\Rightarrow$ $\,\Rightarrow\,g(x)\,=\,+ \sqrt{x}\,$, (pois $\,g(x) \geqslant 0$). Portanto: $\,\left\{\begin{array}{rcr} \, & g\,:\, \mathbb{R}_+ \rightarrow \mathbb{R}_+\; \\ \, & g(x)\,=\,+\,\sqrt{x} \\ \end{array} \right.\,$ × (ITA - 1992) Considere as funções $\phantom{X} f\;:\;\mathbb{R^*}\,\rightarrow \,\mathbb{R}\;$,$\;\;g\;:\mathbb{R}\,\rightarrow\; \mathbb{R}\;\;$ e $\;\;h\,:\,\mathbb{R^*}\,\rightarrow\,\mathbb{R}\phantom{X}$ definidas por:
$\phantom{X}f(x)\,=\,{\large 3}^{\,{\huge x\,+\,\frac{1}{x}}}\,$,
$\phantom{X}g(x)\,=\,x^2\,$;
$\phantom{X}h(x)\,=\,{\large \frac{81}{x}}\,$
O conjunto dos valores de $\phantom{X} x \phantom{X}$ em $\phantom{X}\mathbb{R^*} \phantom{X}$ tais que $\phantom{X} (f\circ g)(x)\,=\,(h\circ f)(x) \phantom{X}$, é subconjunto de:
a)
$\,[0\,,\,3]\,$
d)
$\,[-2\,,\,2]\,$
b)
$\,[3\,,\,7]\,$
e)
nenhuma das anteriores
✓ mostrar resposta ... (ITA - 1990) Sejam as funções $\,f\,$ e $\,g\,$ dadas por:
$\;f\,:\, \mathbb{R} \rightarrow \mathbb{R} \mbox{, } f(x)\,=\,\left\{ \begin{array}{rcr} 1\, & \mbox{, se }& |\,x\,| < 1 \\ 0 \, & \mbox{, se } & |\, x \,| \geqslant 1 \\ \end{array}\right. \;$
$\;g\,:\, \mathbb{R}\,- \lbrace\,1\,\rbrace \rightarrow \mathbb{R} \mbox{, } g(x)\,=\,{\Large \frac{2x\,-\,3}{x\,-\,1}} \;$
Sobre a composta $\phantom{X}(f \circ g)(x)\,=\,f(g(x))\phantom{X}$ podemos garantir que:
a)
se $\,x\,\geqslant \, {\large \frac{3}{2}} \mbox{, } f(g(x))\,=\,0\,$
c)
se $\,{\large \frac{4}{3}}\,<\,x\,<\,2 \mbox{, } f(g(x))\,=\,1\,$
e)
n.d.a
b)
se $\,1\,<\,x\,<\, {\large \frac{3}{2}} \mbox{, } f(g(x))\,=\,1\,$
d)
se $\,1\,<\,x\,\geqslant\, {\large \frac{4}{3}} \mbox{, } f(g(x))\,=\,1\,$
✓ mostrar resposta ... (FUVEST - 2018) Sejam $\;f\,:\, \mathbb{R} \rightarrow \mathbb{R} \;$ e $\;g\,:\, \mathbb{R}^+ \rightarrow \mathbb{R} \;$ definidas por
$\phantom{XXX}f(x) = \dfrac{1}{2}5^{\large x}\phantom{X}$ e $\phantom{X}g(x) = log_{10}{\large x}\phantom{X}$, respectivamente.
O gráfico da função composta $\,g\, \circ\, f\,$ é:
✓ mostrar resposta ... (FUVEST - 2019)
Se a função $\;f\,:\, \mathbb{R}-\lbrace 2 \rbrace\; \rightarrow \mathbb{R} \;$ é definida por $\phantom{X}f(x)\,=\,\dfrac{2x\,+\,1}{x\,-\,2}\phantom{X}$ e a função $\;g\,:\, \mathbb{R}-\lbrace 2 \rbrace\; \rightarrow \mathbb{R} \;$ é definida por $\phantom{X} g(x)\,=\,f(f(x))\;$, então $\;g(x)\;$ é igual a a)
$\;\dfrac{x}{2}\;$
b)
$\;x^{\large 2}\;$
c)
$\;2x\;$
d)
$\;2x\,+\,3\;$
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