Let two three-stage message sources $X$ and $Y$ be given, whose output signals can only assume the values $-1$, $0$ and $+1$ respectively. The signal sources are statistically independent of each other.
A simple circuit now forms the sum signal $S = X + Y$.
At the signal source $X$, the values $-1$, $0$ and $+1$ occur with equal probability.
For source $Y$, the signal value $0$ is twice as likely as the other two values $-1$ and $+1$, respectively.
Solve the subtasks (3) and (4) according to the classical definition.
Nevertheless, consider the different occurrence frequencies of the signal $Y$.
The topic of this section is illustrated with examples in the (German language) learning video Klassische Definition der Wahrscheinlichkeit $\Rightarrow$ "Classical definition of probability".
(2) $S$ can take a total of $\underline {I =5}$ values, namely $0$, $\pm 1$ and $\pm 2$.
(3) Since $Y$ is not equally distributed, one cannot (actually) apply the "Classical Definition of Probability" here.
However, if we divide $Y$ into four ranges according to the graph, assigning two of the ranges to the event $Y = 0$, we can still proceed according to the classical definition.