Question

The values of $x$ for which the logarithmic function $f\left(x\right)={\log }_{|-x^2+2x-4|}\left(x\right(3-x\left)\right)$ is defined, is

• A. $(0,3)$
• B. $(0,3)-\left\{1\right\}$
• C. $R^{+}-\left\{1\right\}$
• D. $(-\infty ,0)\cup (3,\infty )$

Answer 1

The correct option is A $(0,3)$

$\left(1\right):x(3-x)>0\Rightarrow x(x-3)<0\Rightarrow x\in (0,3)$
$\left(2\right):|x^2-2x+4|>0\Rightarrow x\in R\left(3\right):|x^2-2x+4|\ne 1$
$\Rightarrow |(x-1{)}^2+3|\ne 1$
The minimum value of $(x-1{)}^2+3$ is $3.$
Hence, $|(x-1{)}^2+3|\ne 1\forall x\in R$

$\left(1\right)\cap \left(2\right)\cap \left(3\right)\therefore x\in (0,3)$