ผลต่างระหว่างรุ่นของ "Probstat/week8 practice 1"

รุ่นแก้ไขปัจจุบันเมื่อ 03:26, 7 ตุลาคม 2557

This is part of probstat

This exercise considers continuous random variables.

Probability

1. Let random variable $X$ is a continuous random variable which is a real number chosen uniformly from the range (10,50). Let $f(x)$ denote its probability distribution function.

1.1 Describe $f(x)$ .
1.2 What is $P\{X>20\}$ .
1.3 What is $P\{X>20|X<40\}$ . (Note that this is a conditional probability.)

2. Let random variable $X$ is a continuous random variable which is a real number chosen uniformly from the range (a,b). Let $f(x)$ denote its probability distribution function.

2.1 Describe $f(x)$ .
2.2 Find the value of $c$ such that $P\{X>c\}=1/2$ .

Definition: A cumulative distribution function (or cdf in short) for a continuous random variable $X$ whose probability distribution function is $f(x)$ is defined to be

$F(a)=P\{X\leq a\}=P\{X<a\}=\int _{-\infty }^{a}f(x)dx.$

3. Let random variable $X$ is a continuous random variable whose probability distribution function $f(x)$ is given by

$f(x)=\left\{{\begin{array}{ll}cx\ \ \ \ &{\mbox{if}}\ 0\leq x\leq 20,\\0&{\mbox{otherwise.}}\end{array}}\right.$

3.1 Find the value of c.
3.2 Plot pdf of X.
3.3 Let $F(x)$ be $X$ 's cumulative distribution function. Find $F(x)$ .
3.4 Plot $F(x)$

4. (FCP. Example 1a.) Suppose that X is a continuous random variable whose pdf is given by

f(x)=\left\{{\begin{array}{ll}C(9x-3x^{2})\ \ \ &0<x<3\\0&{\mbox{otherwise.}}\end{array}}\right.

4.1 Find $C$ .
4.2 Find $P\{X>1\}$ .

5. (FCP. Example 1b.) The time (in hours) that a computer functions before breaking down is a continuous random variable $X$ with probability density function given by

f(x)=\left\{{\begin{array}{ll}\lambda e^{-x/100}\ \ \ &x\geq 0\\0&x<0\end{array}}\right.

5.1 Find the value of $\lambda$
5.2 What is the probability that a computer will function between 50 and 100 hours before breaking down?
5.3 What is the probability that it will function less than 100 hours?

Hint: Note that

$\int e^{-x}dx=-e^{-x}+C$

6. A random variable $X$ has pdf defined by

f(x)=\left\{{\begin{array}{ll}C/x^{2}\ \ \ &x>20\\0&{\mbox{otherwise.}}\end{array}}\right.

6.1 Find $C$ .
6.2 Find its cdf $F(x)$ and plot it.
6.3 What is $P\{X>30\}$ ?

Expectation

Definition: If $X$ is a continuous random variable whose probability distribution function (pdf) is $f(x)$ , we define the expected value of $X$ to be

$\mathrm {E} [X]=\int _{-\infty }^{\infty }xf(x)dx$

1. Find $\mathrm {E} [X]$ for continuous random variable $X$ defined in question 1 in the previous section.

2. Find $\mathrm {E} [X]$ for continuous random variable $X$ defined in question 2 in the previous section.

3. Find $\mathrm {E} [X]$ for continuous random variable $X$ defined in question 3 in the previous section.

4. Find $\mathrm {E} [X]$ for continuous random variable $X$ defined in question 4 in the previous section.

5. Find $\mathrm {E} [X]$ for continuous random variable $X$ defined in question 5 in the previous section.

Hint: Note that

$\int xe^{-x}dx=-e^{-x}(x+1)+C$

6. Find $\mathrm {E} [X]$ for continuous random variable $X$ defined in question 6 in the previous section.

7. Find $\mathrm {E} [X^{2}]$ and Var( $X$ ) for continuous random variable $X$ defined in question 1 in the previous section.

8. Find $\mathrm {E} [X^{2}]$ and Var( $X$ ) for continuous random variable $X$ defined in question 2 in the previous section.

9. Find $\mathrm {E} [X^{2}]$ and Var( $X$ ) for continuous random variable $X$ defined in question 3 in the previous section.

@@ แถว 4: / แถว 4: @@
 == Probability ==
-=== Uniform distribution ===
 . Let random variable <math>X</math> is a continuous random variable which is a real number chosen uniformly from the range (10,50).  Let <math>f(x)</math> denote its probability distribution function.
@@ แถว 11: / แถว 10: @@
 * 1.3 What is <math>P\{ X > 20 | X < 40 \}</math>.  (Note that this is a conditional probability.)
-'''Definition:''' The ''cumulative distribution function'' (cdf) for a continuous random variable <math>X</math>whose probability distribution function is <math>f(x)</math> is defined to be
+. Let random variable <math>X</math> is a continuous random variable which is a real number chosen uniformly from the range (a,b).  Let <math>f(x)</math> denote its probability distribution function.
+* 2.1 Describe <math>f(x)</math>.
+* 2.2 Find the value of <math>c</math> such that <math>P\{ X > c \} = 1/2</math>.
+'''Definition:''' A '''cumulative distribution function''' (or '''cdf''' in short) for a continuous random variable <math>X</math>whose probability distribution function is <math>f(x)</math> is defined to be
 <center>
@@ แถว 17: / แถว 21: @@
 </center>
 . Let random variable <math>X</math> is a continuous random variable whose  probability distribution function <math>f(x)</math> is given by
 <center>
@@ แถว 25: / แถว 29: @@
 </center>
-* 2.1 Find the value of ''c''.
+* 3.1 Find the value of ''c''.
-* 2.2 Plot pdf of ''X''.
+* 3.2 Plot pdf of ''X''.
+* 3.3 Let <math>F(x)</math> be <math>X</math>'s cumulative distribution function.  Find <math>F(x)</math>.
+* 3.4 Plot <math>F(x)</math>
+. (FCP. Example 1a.) Suppose that ''X'' is a continuous random variable whose pdf is given by
+<center><math>f(x) = \left\{\begin{array}{ll}C(9x - 3x^2) \ \ \  & 0 < x < 3 \\ 0 & \mbox{otherwise.}\end{array}\right.</math></center>
+* 4.1 Find <math>C</math>.
+* 4.2 Find <math>P\{ X > 1 \}</math>.
+. (FCP. Example 1b.)  The time (in hours) that a computer functions before breaking down is a continuous random variable <math>X</math> with probability density function given by
+<center><math>f(x) = \left\{\begin{array}{ll}\lambda e^{-x/100} \ \ \  & x\geq 0\\ 0 & x < 0\end{array}\right.</math></center>
+* 5.1 Find the value of <math>\lambda</math>
+* 5.2 What is the probability that a computer will function between 50 and 100 hours before breaking down?
+* 5.3 What is the probability that it will function less than 100 hours?
+'''Hint:''' Note that
+<center>
+<math>\int e^{-x} dx = -e^{-x} + C</math>
+</center>
+. A random variable <math>X</math> has pdf defined by
+<center><math>f(x) = \left\{\begin{array}{ll}C/x^2 \ \ \  & x > 20 \\ 0 & \mbox{otherwise.}\end{array}\right.</math></center>
+* 6.1 Find <math>C</math>.
+* 6.2 Find its cdf <math>F(x)</math> and plot it.
+* 6.3 What is <math>P\{ X > 30 \}</math>?
 == Expectation ==
@@ แถว 34: / แถว 69: @@
 <math>\mathrm{E}[X] = \int_{-\infty}^{\infty} xf(x)dx</math>
 </center>
+. Find <math>\mathrm{E}[X]</math> for continuous random variable <math>X</math> defined in question 1 in the previous section.
+. Find <math>\mathrm{E}[X]</math> for continuous random variable <math>X</math> defined in question 2 in the previous section.
+. Find <math>\mathrm{E}[X]</math> for continuous random variable <math>X</math> defined in question 3 in the previous section.
+. Find <math>\mathrm{E}[X]</math> for continuous random variable <math>X</math> defined in question 4 in the previous section.
+. Find <math>\mathrm{E}[X]</math> for continuous random variable <math>X</math> defined in question 5 in the previous section.
+'''Hint:''' Note that
+<center>
+<math>\int x e^{-x} dx = -e^{-x}(x+1) + C</math>
+</center>
+. Find <math>\mathrm{E}[X]</math> for continuous random variable <math>X</math> defined in question 6 in the previous section.
+. Find <math>\mathrm{E}[X^2]</math> and Var(<math>X</math>) for continuous random variable <math>X</math> defined in question 1 in the previous section.
+. Find <math>\mathrm{E}[X^2]</math> and Var(<math>X</math>) for continuous random variable <math>X</math> defined in question 2 in the previous section.
+. Find <math>\mathrm{E}[X^2]</math> and Var(<math>X</math>) for continuous random variable <math>X</math> defined in question 3 in the previous section.

ผลต่างระหว่างรุ่นของ "Probstat/week8 practice 1"

รุ่นแก้ไขปัจจุบันเมื่อ 03:26, 7 ตุลาคม 2557

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