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AP Statistics
Unit 4: Probability, Random Variables, and Probability Distributions
4.7 Introduction to Random Variables and Probability Distributions
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What is a random variable?
Outcome of a random phenomenon
Match the type of random variable with its example:
Discrete ↔️ Number of coin flips
Continuous ↔️ Height of a person
A discrete random variable can take on a finite or countably infinite number of
values
A discrete random variable has a finite or countably infinite number of
values
What does a probability distribution describe?
Likelihood of random variable values
What does a probability mass function (PMF) assign probabilities to?
Possible values of a discrete variable
What is a random variable?
Numerical outcome of random phenomenon
What is the key difference between discrete and continuous random variables?
Type of values they take
What does a discrete probability distribution list?
Probabilities for each possible value
What is the purpose of a probability mass function (PMF)?
Assign probabilities to discrete values
Match the property with the uniform distribution
U
(
0
,
1
)
U(0, 1)
U
(
0
,
1
)
:
Density Function ↔️
f
(
x
)
=
f(x) =
f
(
x
)
=
1
1
1
Range ↔️
0
≤
x
≤
1
0 \leq x \leq 1
0
≤
x
≤
1
Total Area Under Curve ↔️ 1
A CDF is applicable for both discrete and continuous random
variables
A continuous
random variable
can take on any value within a given range
True
What type of values can a continuous random variable take?
Real numbers within a range
For continuous random variables, the total area under the probability density function
equals
1
True
Steps to create a PMF for the number of heads in two coin flips:
1️⃣ Identify possible values (0, 1, 2)
2️⃣ Calculate the probability of each value
3️⃣ Summarize probabilities in a table
A discrete random variable can take a finite or countable number of
values
A probability distribution describes the likelihood of different
values
A continuous probability distribution uses a probability density function to represent probabilities over a
range
In a PMF, all probabilities must be between 0 and 1 and
sum
up to 1.
True
What does a cumulative distribution function (CDF) give?
Probability of
X
≤
x
X \leq x
X
≤
x
Match the probability distribution with its property:
Binomial ↔️ Fixed number of independent trials
Uniform ↔️ Equally likely outcomes within a range
Normal ↔️ Bell-shaped curve defined by mean and standard deviation
Steps to distinguish between discrete and continuous random variables:
1️⃣ Determine the number of possible values
2️⃣ Identify the type of values (whole or real numbers)
3️⃣ Check if values are countable
Match the type of probability distribution with its description:
Discrete ↔️ Lists probabilities for each value
Continuous ↔️ Uses a probability density function
What must the probabilities in a PMF sum up to?
1
A continuous
random variable
can take any value within a given range.
True
In a discrete probability distribution, the sum of all probabilities equals 1.
True
The total area under a probability density function (PDF)
equals
1.
True
A probability density function (PDF) defines the likelihood of a continuous random variable falling within a given
range
A CDF is always non-decreasing and ranges from 0 to
1
.
True
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