Difference between revisions of "Aufgaben:Exercise 2.1Z: Different Signal Courses"
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| − | {{quiz-Header|Buchseite= | + | {{quiz-Header|Buchseite=Theory_of_Stochastic_Signals/From_Random_Experiment_to_Random_Variable |
}} | }} | ||
| − | [[File:P_ID59__Sto_Z_2_1.png|right|frame|Discrete value or continuous value?]] | + | [[File:P_ID59__Sto_Z_2_1.png|right|frame|Discrete-value or continuous-value?]] |
| − | On the right are shown five signals. The first three signals $\rm (A)$, $\rm (B)$ and $\rm (C)$ are periodic and thus also deterministic, the two lower signals have stochastic character. The current value of these signals $x(t)$ is taken as a random | + | On the right are shown five signals. The first three signals $\rm (A)$, $\rm (B)$ and $\rm (C)$ are periodic and thus also deterministic, the two lower signals have stochastic character. The current value of these signals $x(t)$ is taken as a random variable in each case. |
Shown in detail are: | Shown in detail are: | ||
| − | $\rm (A)$: | + | $\rm (A)$: A triangular-shaped periodic signal, |
$\rm (B)$: the signal $\rm (A)$ after one-way rectification, | $\rm (B)$: the signal $\rm (A)$ after one-way rectification, | ||
| Line 16: | Line 16: | ||
$\rm (D)$: a rectangular random signal, | $\rm (D)$: a rectangular random signal, | ||
| − | $\rm (E)$: the random signal $\rm (D)$ according to AMI coding; <br> here the "zero" is preserved, while each "one" is alternately encoded with | + | $\rm (E)$: the random signal $\rm (D)$ according to AMI coding; <br> here the "zero" is preserved, while each "one" is alternately encoded with $+2\hspace{0.03cm}\rm V$ and $-2\hspace{0.03cm} \rm V$. |
| Line 34: | Line 34: | ||
<quiz display=simple> | <quiz display=simple> | ||
| − | {For which signals does the current value describe a discrete random variable? <br>Consider also the respective number of steps $M$. | + | {For which signals does the current value describe a discrete random variable? <br>Consider also the respective number of steps ⇒ $M$. |
|type="[]"} | |type="[]"} | ||
- Signal $\rm (A)$, | - Signal $\rm (A)$, | ||
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| − | {For which signals is the current value (exclusively) a continuous random variable? | + | {For which signals is the current value (exclusively) a continuous random variable? |
|type="[]"} | |type="[]"} | ||
| − | + | + | + Signal $\rm (A)$, |
- signal $\rm (B)$, | - signal $\rm (B)$, | ||
- signal $\rm (C)$, | - signal $\rm (C)$, | ||
| Line 63: | Line 63: | ||
{For the signal $\rm (D)$ the relative frequency $h_0$ is determined empirically over $100\hspace{0.03cm}000$ binary symbols. <br>Name a lower bound for the probability that the determined value lies between $0.49$ and $0.51$ ? | {For the signal $\rm (D)$ the relative frequency $h_0$ is determined empirically over $100\hspace{0.03cm}000$ binary symbols. <br>Name a lower bound for the probability that the determined value lies between $0.49$ and $0.51$ ? | ||
|type="{}"} | |type="{}"} | ||
| − | ${\rm Min\big[\ Pr(0.49}≤h_0≤0.51)\ \big] \ = \ $ { | + | ${\rm Min\big[\ Pr(0.49}≤h_0≤0.51)\ \big] \ = \ $ { 97.5 3% } $\%$ |
| − | {How many symbols $(N_\min)$ would you need to use for this investigation to ensure <br>that the probability for the event "The frequency so determined is between $0.499$ and $0.501$" is greater than $99\%$ ? | + | {How many symbols $(N_\min)$ would you need to use for this investigation to ensure <br>that the probability for the event "The frequency so determined is between $0.499$ and $0.501$" is greater than $99\%$ ? |
|type="{}"} | |type="{}"} | ||
$N_\min \ = \ $ { 2.5 3% } $\ \cdot 10^9$ | $N_\min \ = \ $ { 2.5 3% } $\ \cdot 10^9$ | ||
| Line 76: | Line 76: | ||
===Solution=== | ===Solution=== | ||
{{ML-Kopf}} | {{ML-Kopf}} | ||
| − | '''(1)''' | + | '''(1)''' Correct are <u>suggested solutions 3, 4, and 5</u>: |
| − | * | + | *The random variables $\rm (C)$ and $\rm (D)$ are binary $(M= 2)$, |
| − | * | + | *while the random variable $\rm (E)$ is trivalent $(M= 3)$. |
| − | '''(2)''' | + | '''(2)''' The <u>proposed solution 1</u> alone is correct: |
| − | * | + | *The random variable $\rm (A)$ is continuous in value and can take all values between $\pm 2 \hspace{0.03cm} \rm V$ with equal probability. |
| − | * | + | *All other random variables are discrete in value. |
| − | '''(3)''' | + | '''(3)''' The <u>proposed solution 2</u> alone is correct: |
| − | * | + | *Only the random variable $\rm (B)$ has a discrete part at $0\hspace{0.03cm}\rm V$, and |
| − | * | + | *also has a continuous component (between $0\hspace{0.03cm} \rm V$ and $+2\hspace{0.03cm}\rm V)$. |
| − | '''(4)''' | + | '''(4)''' According to Bernoulli's law of large numbers: |
:$$\rm Pr\left(|\it h_{\rm 0} - \it p_{\rm 0}|\ge\it\varepsilon\right)\le\frac{\rm 1}{\rm 4\cdot \it N\cdot\it\varepsilon^{\rm 2}} = {\it p}_{\rm \hspace{0.01cm}Bernouilli}.$$ | :$$\rm Pr\left(|\it h_{\rm 0} - \it p_{\rm 0}|\ge\it\varepsilon\right)\le\frac{\rm 1}{\rm 4\cdot \it N\cdot\it\varepsilon^{\rm 2}} = {\it p}_{\rm \hspace{0.01cm}Bernouilli}.$$ | ||
| − | * | + | *Thus, the probability that the relative frequency $h_0$ deviates from the probability $p_0 = 0.5$ by more than $0.01$ can be calculated as $\varepsilon = 0.01$: |
:$${\it p}_{\rm \hspace{0.01cm}Bernoulli} = \rm\frac{1}{4\cdot 100000\cdot 0.01^2}=\rm 2.5\% \hspace{0.5cm}\Rightarrow \hspace{0.5cm} | :$${\it p}_{\rm \hspace{0.01cm}Bernoulli} = \rm\frac{1}{4\cdot 100000\cdot 0.01^2}=\rm 2.5\% \hspace{0.5cm}\Rightarrow \hspace{0.5cm} | ||
| − | {\rm Min}\big[({\rm Pr}(0.49 \le h_0 \le 0.51)\big] \hspace{0.15cm}\underline{= | + | {\rm Min}\big[({\rm Pr}(0.49 \le h_0 \le 0.51)\big] \hspace{0.15cm}\underline{= 97.5\%}.$$ |
| − | '''(5)''' | + | '''(5)''' With $p_{\rm Bernoulli} = 1 - 0.99 = 0.01$ and $\varepsilon = 0.001$ holds again by the law of large numbers: |
| − | :$${\it p}_{\rm \hspace{0.01cm}Bernoulli}\le\frac{\rm 1}{\rm 4\cdot | + | :$${\it p}_{\rm \hspace{0.01cm}Bernoulli}\le\frac{\rm 1}{\rm 4\cdot \it N\cdot\it \varepsilon^{\rm 2}}.$$ |
| − | * | + | *Solved for $N$, one gets: |
| − | :$$N\ge\frac{\rm 1}{\rm 4\cdot\it p_{\rm \hspace{0.01cm}Bernoulli}\cdot | + | :$$N\ge\frac{\rm 1}{\rm 4\cdot\it p_{\rm \hspace{0.01cm}Bernoulli}\cdot\varepsilon^{\rm 2}}=\rm \frac{1}{4\cdot 0.01\cdot 0.001^{2}}=\rm 0.25\cdot 10^8 |
\hspace{0.5cm}\Rightarrow \hspace{0.5cm} | \hspace{0.5cm}\Rightarrow \hspace{0.5cm} | ||
{\it N}_{\rm min} \hspace{0.15cm}\underline{= 2.5\cdot 10^9}.$$ | {\it N}_{\rm min} \hspace{0.15cm}\underline{= 2.5\cdot 10^9}.$$ | ||
Latest revision as of 14:02, 3 December 2021
Discrete-value or continuous-value?
On the right are shown five signals. The first three signals $\rm (A)$, $\rm (B)$ and $\rm (C)$ are periodic and thus also deterministic, the two lower signals have stochastic character. The current value of these signals $x(t)$ is taken as a random variable in each case.
Shown in detail are:
$\rm (A)$: A triangular-shaped periodic signal,
$\rm (B)$: the signal $\rm (A)$ after one-way rectification,
$\rm (C)$: a rectangular periodic signal,
$\rm (D)$: a rectangular random signal,
$\rm (E)$: the random signal $\rm (D)$ according to AMI coding;
here the "zero" is preserved, while each "one" is alternately encoded with $+2\hspace{0.03cm}\rm V$ and $-2\hspace{0.03cm} \rm V$.
Hints:
- The exercise belongs to the chapter From Random Experiment to Random Variable.
Questions
Solution
(1) Correct are suggested solutions 3, 4, and 5:
- The random variables $\rm (C)$ and $\rm (D)$ are binary $(M= 2)$,
- while the random variable $\rm (E)$ is trivalent $(M= 3)$.
(2) The proposed solution 1 alone is correct:
- The random variable $\rm (A)$ is continuous in value and can take all values between $\pm 2 \hspace{0.03cm} \rm V$ with equal probability.
- All other random variables are discrete in value.
(3) The proposed solution 2 alone is correct:
- Only the random variable $\rm (B)$ has a discrete part at $0\hspace{0.03cm}\rm V$, and
- also has a continuous component (between $0\hspace{0.03cm} \rm V$ and $+2\hspace{0.03cm}\rm V)$.
(4) According to Bernoulli's law of large numbers:
- $$\rm Pr\left(|\it h_{\rm 0} - \it p_{\rm 0}|\ge\it\varepsilon\right)\le\frac{\rm 1}{\rm 4\cdot \it N\cdot\it\varepsilon^{\rm 2}} = {\it p}_{\rm \hspace{0.01cm}Bernouilli}.$$
- Thus, the probability that the relative frequency $h_0$ deviates from the probability $p_0 = 0.5$ by more than $0.01$ can be calculated as $\varepsilon = 0.01$:
- $${\it p}_{\rm \hspace{0.01cm}Bernoulli} = \rm\frac{1}{4\cdot 100000\cdot 0.01^2}=\rm 2.5\% \hspace{0.5cm}\Rightarrow \hspace{0.5cm} {\rm Min}\big[({\rm Pr}(0.49 \le h_0 \le 0.51)\big] \hspace{0.15cm}\underline{= 97.5\%}.$$
(5) With $p_{\rm Bernoulli} = 1 - 0.99 = 0.01$ and $\varepsilon = 0.001$ holds again by the law of large numbers:
- $${\it p}_{\rm \hspace{0.01cm}Bernoulli}\le\frac{\rm 1}{\rm 4\cdot \it N\cdot\it \varepsilon^{\rm 2}}.$$
- Solved for $N$, one gets:
- $$N\ge\frac{\rm 1}{\rm 4\cdot\it p_{\rm \hspace{0.01cm}Bernoulli}\cdot\varepsilon^{\rm 2}}=\rm \frac{1}{4\cdot 0.01\cdot 0.001^{2}}=\rm 0.25\cdot 10^8 \hspace{0.5cm}\Rightarrow \hspace{0.5cm} {\it N}_{\rm min} \hspace{0.15cm}\underline{= 2.5\cdot 10^9}.$$
