4.9 Combining Random Variables

Cards (42)

Match the type of random variable with its definition:
Discrete ↔️ Finite or countably infinite values
Continuous ↔️ Any value within a range
A continuous random variable can take on any value within a given range of real numbers.
Subtracting random variables involves finding the difference between their outcomes.
When subtracting discrete random variables, the new variable is the difference
What is a random variable categorized as if it can take on a finite number of distinct values?
Discrete
What are the two main types of random variables?
Discrete and continuous
Match the random variable operation with its outcome for discrete and continuous variables:
Addition (Discrete) ↔️ Sum of possible values
Addition (Continuous) ↔️ Range of possible sums
What is involved when combining random variables?
Finding the difference
Match the type of operation with its result for random variables:
Subtraction of Discrete Variables ↔️ New discrete variable
Subtraction of Continuous Variables ↔️ New continuous variable
The process of subtracting random variables depends on whether the variables are discrete or continuous. 
True
Match the property of expected values with its formula:
Expected Value of Constant Multiple ↔️ $E(aX) =$ $a \cdot E(X)$
Expected Value of Difference ↔️ $E(X - Y) =$ $E(X) - E(Y)$
Expected Value of Sum ↔️ $E(X + Y) =$ $E(X) +$ $E(Y)$
If Var(X) = 9 and Var(Y) = 16, the standard deviation of X + Y is 5.
Continuous random variables can take on any value within a given range.
When subtracting discrete random variables, the new variable is the difference of the individual variables. 
True
What is a random variable?
Numerical outcome of random phenomenon
The height of a person is an example of a discrete random variable.
False
What happens to the possible values when adding discrete random variables?
They are summed
What is the new random variable called when subtracting discrete random variables?
The difference of outcomes
What values can Z = X - Y take if X is the number of heads from flipping a coin three times and Y is the number of tails from flipping it twice?
-2, -1, 0, 1, 2, 3
The number of correct answers on a quiz is an example of a discrete random variable.
True
Discrete random variables are countable. 
True
If X and Y are discrete random variables, what type is Z = X + Y?
Discrete
For discrete random variables, subtracting them results in a new discrete random variable. 
True
What is the expected value of a random variable called?
Mean
What does the expected value of a random variable represent?
The average value
A random variable assigns a numerical outcome to each possible result of a random experiment. 
True
Match the type of random variable with the operation of addition:
Discrete Random Variables ↔️ Sum of possible values
Continuous Random Variables ↔️ Range of all sums
The expected value of a constant multiple of X is equal to the constant multiplied by E(X).
Random variables are categorized as either discrete or continuous.
What type of values can a discrete random variable take?
Whole numbers, integers
When adding continuous random variables, the new variable represents the sum of the individual random variables' ranges. 
True
The probabilities of outcomes for subtracting discrete random variables are calculated based on the independence or dependence
The process of subtracting random variables depends on whether they are discrete or continuous
The height of a person is an example of a continuous
The number of cars passing a tollbooth in an hour is an example of a discrete
The sum of two continuous random variables is always a continuous random variable. 
True
For continuous random variables, subtracting them results in a new continuous random variable with values being the differences
In the example provided, subtracting Y from X results in a new variable Z with possible values ranging from -2 to 3.
The expected value of the sum of two random variables is equal to the sum of their individual expected values.
When combining independent random variables, the standard deviation of the sum is the square root of the sum of the individual variances. 
True