Probability Distribution (Discrete Random Variable)
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22 slides
May 11, 2021
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About This Presentation
Learning Competencies:
- to find the possible values of a random variable.
illustrates a probability distribution for a discrete random variable and its properties.
- to compute probabilities corresponding to a given random variable.
There are some exercises for you to answer.
Slide Content
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher IStatistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Probability Distribution of a
Random Variable
Statistics and Probability
PRINCESS P. DIPASUPIL
Special Science Teacher I
•PRINCESS P. DIPASUPIL
•Special Science Teacher IStatistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Probability Distribution of a
Random Variable
Statistics and Probability
PRINCESS P. DIPASUPIL
Special Science Teacher I
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
PROBABILITY
DISTRIBUTION
the set of all possible
values of the random variable
X, together with their
corresponding associated
probabilities.
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
PROBABILITY
DISTRIBUTION
the set of all possible
values of the random variable
X, together with their
corresponding associated
probabilities.
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
PROBABILITY
DISTRIBUTION
(??????�����
??????�????????????����??????)
????????????�
??????(??????)
16 6/25
17 14/25
18 5/25
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
PROBABILITY
DISTRIBUTION
(??????�����
??????�????????????����??????)
????????????�
??????(??????)
16 6/25
17 14/25
18 5/25
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
PROBABILITY
DISTRIBUTION
If X is a discrete random
variable, the probability
distribution is called a probability
mass function or pmf.
The pmfmay be expressed in
tabularor graphicalform.
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
PROBABILITY
DISTRIBUTION
If X is a discrete random
variable, the probability
distribution is called a probability
mass function or pmf.
The pmfmay be expressed in
tabularor graphicalform.
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Properties of a Probability Distribution
I. 0≤????????????≤1
2. Σ????????????=1
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Properties of a Probability Distribution
I. 0≤????????????≤1
2. Σ????????????=1
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x12345
P(x)0.100.200.250.400.05
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x12345
P(x)0.100.200.250.400.05
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x12345
P(x)0.050.250.330.250.08
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x12345
P(x)0.050.250.330.250.08
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x1234
P(x)0.20.10.40.3
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x1234
P(x)0.20.10.40.3
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x1234
P(x)0.20.10.40.3
Determine??????1+??????2:
0.2+0.1=0.3
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
x1234
P(x)0.20.10.40.3
Determine??????1+??????2:
0.2+0.1=0.3
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
Determine??????3−??????1:
0.4−0.2=0.2
x1234
P(x)0.20.10.40.3
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
Determine??????3−??????1:
0.4−0.2=0.2
x1234
P(x)0.20.10.40.3
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
Determine
P(4)+P(2).
x1234
P(x)0.20.10.40.3
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
discrete probability distribution or not?
Determine
P(4)+P(2).
x1234
P(x)0.20.10.40.3
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
The spinner below is divided into
12 sections. Let X be the score
where the arrow will stop
(numbered as 1, 2, 3, 4, 5).
Find the probability that the
arrow will stop at 1, 2, 3, 4, and 5.
Construct the discrete
probability distribution of the
random variable X and its
corresponding histogram.
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
The spinner below is divided into
12 sections. Let X be the score
where the arrow will stop
(numbered as 1, 2, 3, 4, 5).
Find the probability that the
arrow will stop at 1, 2, 3, 4, and 5.
Construct the discrete
probability distribution of the
random variable X and its
corresponding histogram.
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Suppose three cell phones are tested at random. We
want to find out the number of defective cell phones
that occur. Thus, to each outcome in the sample space
we shall assign a value. These are 0, 1, 2, or 3. If there is
no defective cell phone, we assign the number 0; if
there is one defective cell phone, we assign the number
1; if there are two defective cell phones, we assign the
number 2; and 3, if there are three defective cell
phones. The number of defective cell phones is a
random variable. The possible values of this random
variable are 0,1,2, and 3.
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Suppose three cell phones are tested at random. We
want to find out the number of defective cell phones
that occur. Thus, to each outcome in the sample space
we shall assign a value. These are 0, 1, 2, or 3. If there is
no defective cell phone, we assign the number 0; if
there is one defective cell phone, we assign the number
1; if there are two defective cell phones, we assign the
number 2; and 3, if there are three defective cell
phones. The number of defective cell phones is a
random variable. The possible values of this random
variable are 0,1,2, and 3.
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Let D= defective CP
N= non-defective CP
X= (the random variable)
number of defective cell
phones
Possible
Outcomes
Value of the
Random Variable X
(number of defective cell
phones)
DDD 3
DDN 2
DND 2
DNN 1
NNN 0
NND 1
NDN 1
NDD 2
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Let D= defective CP
N= non-defective CP
X= (the random variable)
number of defective cell
phones
Possible
Outcomes
Value of the
Random Variable X
(number of defective cell
phones)
DDD 3
DDN 2
DND 2
DNN 1
NNN 0
NND 1
NDN 1
NDD 2
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number of
defective cell
phones
??????(??????)
3
1
8
2
3
8
1
3
8
0
1
8
Possible
Outcomes
Value of the
Random Variable
X
(number of
defective cell
phones)
DDD 3
DDN 2
DND 2
DNN 1
NNN 0
NND 1
NDN 1
NDD 2
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number of
defective cell
phones
??????(??????)
3
1
8
2
3
8
1
3
8
0
1
8
Possible
Outcomes
Value of the
Random Variable
X
(number of
defective cell
phones)
DDD 3
DDN 2
DND 2
DNN 1
NNN 0
NND 1
NDN 1
NDD 2
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number
of
defective
cell
phones
??????(??????)
3
1
8
2
3
8
1
3
8
0
1
8
8
8
7
8
6
8
5
8
4
8
3
8
2
8
1
8
0 1 2 3
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number
of
defective
cell
phones
??????(??????)
3
1
8
2
3
8
1
3
8
0
1
8
8
8
7
8
6
8
5
8
4
8
3
8
2
8
1
8
0 1 2 3
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Two balls are drawn in
succession without
replacement from an urn
containing 5 red balls and 6
blue balls. Let Z be the
random variable
representing the number of
blue balls. Find the values of
the random variable Z.
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Two balls are drawn in
succession without
replacement from an urn
containing 5 red balls and 6
blue balls. Let Z be the
random variable
representing the number of
blue balls. Find the values of
the random variable Z.
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Possible
Outcomes
Value of the
Random
Variable Z
(number of
blue balls)
�
number
ofblue
balls
??????(??????)
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
Possible
Outcomes
Value of the
Random
Variable Z
(number of
blue balls)
�
number
ofblue
balls
??????(??????)
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
�
number
ofblue
balls
??????(??????)
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
�
number
ofblue
balls
??????(??????)
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
A shipment of five boxes of mussels (tahong)
contains two that are slightly spoiled. If a retailer
receives three of these boxes of mussels at
random, list the elements of the sample space
using the letters S and F for spoiled and fresh
mussels, respectively. To each sample point, assign a
value x of the random variable X representing the
number of boxes of mussels purchased by the
retailer which are slightly spoiled.
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
A shipment of five boxes of mussels (tahong)
contains two that are slightly spoiled. If a retailer
receives three of these boxes of mussels at
random, list the elements of the sample space
using the letters S and F for spoiled and fresh
mussels, respectively. To each sample point, assign a
value x of the random variable X representing the
number of boxes of mussels purchased by the
retailer which are slightly spoiled.
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number of boxes of
mussels which are
slightly spoiled
??????(??????)
Possible
Outcomes
Value of the
Random Variable
X
(number of boxes
of mussels which
are slightly
spoiled)
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number of boxes of
mussels which are
slightly spoiled
??????(??????)
Possible
Outcomes
Value of the
Random Variable
X
(number of boxes
of mussels which
are slightly
spoiled)
Statistics and Probability
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number of
boxes of
mussels which
are slightly
spoiled
??????(??????)
•PRINCESS P. DIPASUPIL
•Special Science Teacher I
??????
number of
boxes of
mussels which
are slightly
spoiled
??????(??????)
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