Level:
Project ID:
9000025810
Accepted:
1
Clonable:
0
Easy:
0
In the following list identify a true statement on the function
\(f\).
\[
f(x) = \frac{(x - 2)(3 - x)}
{(2x - 1)(3x - 1)}
\]
\(f(x)\geq 0 \iff x\in \left (\frac{1}
{3}; \frac{1}
{2}\right )\cup [ 2;3] \)
\(f(x)\geq 0 \iff x\in \left [ \frac{1}
{3}; \frac{1}
{2}\right ] \cup [ 2;3] \)
\(f(x)\geq 0 \iff x\in \left (-\infty ; \frac{1}
{3}\right )\cup \left [ \frac{1}
{2};2\right ] \cup [ 3;\infty )\)
\(f(x)\geq 0 \iff x\in \left (\frac{1}
{3}; \frac{1}
{2}\right )\cup (2;3)\)