Probability Review

Compound Events

Theoretical/Experimental

Probability

Exclusive/Inclusive

Mixed Probability

100

This type of event consists of two or more events.

compound event

100

This kind of probability always has the total number of possible outcomes in the denominator.

Theoretical

100

Ike has 12 shirts. He has 5 blue shirts, 2 green shirts, 4 white shirts, and 1 red shirt.
P(blue shirt) =

5/12

100

In a deck of cards, it's the relationship between the two events "Drawing a red" and "Drawing a spade"

Mutually exclusive

100

Calculating the likelihood of an event occurring based on the properties of shapes, such as length, area, or volume.

Hint: Geometry Question

Geometric Probability

200

The knowledge of one event does not affect the probability of the other. A and B are this.

Independent Events?

200

Probability based on experimental data or observations.

What is experimental probability?

200

The sample space when you flip two coins.

HH, HT, TH, TT

200

In a deck of cards, it's the relationship between the two events "drawing a queen" and "drawing a diamond."

Mutually Inclusive

200

Tyler flipped a coin 30 times. Her results are: Heads: 17 Tails: 13

The experimental probability of flipping tails?

13/30

300

The knowledge of one event does affect the probability of the other. A and B are this.

Dependent Events

300

You attempt 15 free throws in a basketball game. You miss 6 and make 9. The experimental probability of making a free throw.

P(free throw) = 9/15 = 3/5

300

There are 12 marbles in a bag. 7 are red and 5 are blue. P(blue, then red) without replacement =

3/12 x 7/11 = 35/132

300

When two events don't share any outcomes.

Mutually Exclusive

300

You have 8 marbles. 3 are red, 4 green, 1 yellow. There is no replacement.

P(red, then yellow).

3/8 x 1/7 = 3/56

400

The events "The day of the week is Thursday" and "It's raining outside" have this relationship.

Independent

400

A spinner has 9 sections of all different colors. The odds that the spinner does not land on red.

8/9

400

Nolan is eating a pack of skittles. This pack has 2 green, 3 red, 6 purple, 3 yellow, and 1 orange skittle. However, Nolan does not like purple skittles.

P(not purple) =

9/15 = 3/5

400

The enrollment at Southburg High School is 1400. Suppose 550 students take French, 700 take algebra, and 400 take both French and algebra.

The probability that a student selected randomly takes French or algebra.

17/28

400

You have a set of 16 cards numbered 1-16. You select a card and put it back into the set. Then you select another card.

P(even, then 6).

1/32

500

You select a card out of a bucket that contains 26 cards lettered A-Z without looking. Without replacing the first card, you select a second. The probability of choosing L and then K.

1/650

500

Crash rolls a 10 dice ten times. The probability of rolling a 4, three times in a row

1/1000

500

Holden is playing with a deck of cards. The odds of drawing any type of this are 13/52.

Suits

500

It's the type of diagram with circles to represent the probability of compound events.

Venn Diagrams

500

You have a set of 16 cards numbered 1-16. You select a card and put it back into the set. Then you select another card.

P(Even|Prime) = 1/6. P(Even) = 1/2. The two events must have this relationship.

Dependent.