Show that f(x) = $\frac{1}{1 + x^{2}}$ decreases in the interval [0, ∞) and increases in the interval (−∞, 0].

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Solution

$Here, f (x) = \frac{1}{1 + x^{2}} Case 1 : Let x_{1}, x_{2} \in (0, \infty) such that x_{1} < x_{2} . Then, x_{1} < x_{2} \Rightarrow {x_{1}}^{2} < {x_{2}}^{2} \Rightarrow 1 + {x_{1}}^{2} < 1 + {x_{2}}^{2} \Rightarrow \frac{1}{1 + {x_{1}}^{2}} > \frac{1}{1 + {x_{2}}^{2}} \Rightarrow f (x_{1}) > f (x_{2}) \forall x_{1}, x_{2} \in (0, \infty) So, f (x) is decreasing on (0, \infty) . Case 2 : Let x_{1}, x_{2} \in (- \infty, 0] such that x_{1} < x_{2} . Then, x_{1} < x_{2} \Rightarrow {x_{1}}^{2} > {x_{2}}^{2} \Rightarrow 1 + {x_{1}}^{2} > 1 + {x_{2}}^{2} \Rightarrow \frac{1}{1 + {x_{1}}^{2}} < \frac{1}{1 + {x_{2}}^{2}} \Rightarrow f (x_{1}) < f (x_{2}) \Rightarrow f (x_{1}) < f (x_{2}), \forall x_{1}, x_{2} \in (- \infty, 0] So, f (x) is increasing on (- \infty, 0] .$

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