The function: 

$$\begin{gathered} f\left(x\right)=\left|2-3x\right|; \\ K=2 \end{gathered}$$

By trial and error we can find such values a and b, by testing different values of f(x) until we find one that is less than and one that is greater than $2$.

$$\begin{gathered} f\left(1\right)=\left|2-3\left(1\right)\right| \\ =\left|-1\right| \\ =1<2 \\ f\left(2\right)=\left|2-3\left(2\right)\right| \\ =\left|-4\right| \\ =4>2 \end{gathered}$$

Since f is continuous on $[1,2]$ and $f\left(1\right)<2<f\left(2\right)$, by the Intermediate Value Theorem there is some value $c$ for which $f\left(c\right)=2$.

Note that the Intermediate Value Theorem doesn’t tell us where c is, only that such a c exists somewhere in the interval.

We can approximate some values of c for which $f\left(c\right)=2$ by approximating the values
of x for which the graph of $f\left(x\right)=\left|2-3x\right|$ intersects the line $y=2$.

From this graph we can conclude that $f\left(c\right)=2 at c\approx 1.33$