basic probability review worksheet - fall 2025
a 6 - sided die is rolled one time. find:
1. p(roll a 5)
2. p(roll a 1 or 6)
3. p(odd #)
4. p(multiple of 3)
5. p(not a 4)

a card is drawn from a standard 52 - card deck. find:
6. p(ace)
7. p(red)
8. p(diamond)
9. p(face)
10. p(2 or 3)
11. p(black or heart)
12. p(not a king)
13. p(not a face)

there are 6 red, 3 blue, and 1 white marbles in a jar. find:
14. p(blue)
15. p(red or white)
16. p(green)
17. p(non - white)
18. p(non - yellow)

a random number from 1 to 20 is drawn from a hat. find:
19. p(7)
20. p(6 or lower)
21. p(18 or higher)
22. p(multiple of 4)
23. p(9 or 11)
24. p(not a 15)
25. p(21)

Question

basic probability review worksheet - fall 2025
a 6 - sided die is rolled one time. find:
1. p(roll a 5)
2. p(roll a 1 or 6)
3. p(odd #)
4. p(multiple of 3)
5. p(not a 4)

a card is drawn from a standard 52 - card deck. find:
6. p(ace)
7. p(red)
8. p(diamond)
9. p(face)
10. p(2 or 3)
11. p(black or heart)
12. p(not a king)
13. p(not a face)

there are 6 red, 3 blue, and 1 white marbles in a jar. find:
14. p(blue)
15. p(red or white)
16. p(green)
17. p(non - white)
18. p(non - yellow)

a random number from 1 to 20 is drawn from a hat. find:
19. p(7)
20. p(6 or lower)
21. p(18 or higher)
22. p(multiple of 4)
23. p(9 or 11)
24. p(not a 15)
25. p(21)

Accepted Answer

# Explanation:
## Step1: Recall probability formula
The probability formula is $P(A)=\frac{n(A)}{n(S)}$, where $n(A)$ is the number of favorable outcomes and $n(S)$ is the total number of outcomes.
## Step2: Solve for P(7) (Question 19)
There is 1 favorable outcome (the number 7) and 20 total outcomes (numbers from 1 - 20). So $P(7)=\frac{1}{20}$.
## Step3: Solve for P(6 or lower) (Question 20)
The favorable outcomes are 1, 2, 3, 4, 5, 6. So $n(A) = 6$ and $n(S)=20$. Then $P(6	ext{ or lower})=\frac{6}{20}=\frac{3}{10}$.
## Step4: Solve for P(18 or higher) (Question 21)
The favorable outcomes are 18, 19, 20. So $n(A)=3$ and $n(S) = 20$. Then $P(18	ext{ or higher})=\frac{3}{20}$.
## Step5: Solve for P(multiple of 4) (Question 22)
The multiples of 4 from 1 - 20 are 4, 8, 12, 16, 20. So $n(A)=5$ and $n(S)=20$. Then $P(	ext{multiple of }4)=\frac{5}{20}=\frac{1}{4}$.
## Step6: Solve for P(9 or 11) (Question 23)
There are 2 favorable outcomes (9 and 11) and 20 total outcomes. So $P(9	ext{ or }11)=\frac{2}{20}=\frac{1}{10}$.
## Step7: Solve for P(not a 15) (Question 24)
The number of non - 15 outcomes is $20 - 1=19$. So $P(	ext{not a }15)=\frac{19}{20}$.
## Step8: Solve for P(21) (Question 25)
There are 0 favorable outcomes (21 is not in the range 1 - 20) and 20 total outcomes. So $P(21)=0$.

# Answer:
19. $\frac{1}{20}$
20. $\frac{3}{10}$
21. $\frac{3}{20}$
22. $\frac{1}{4}$
23. $\frac{1}{10}$
24. $\frac{19}{20}$
25. $0$

Sovi.AI - AI Math Tutor

QUESTION IMAGE

Question

Explanation:

Step1: Recall probability formula

Step2: Solve for P(7) (Question 19)

Step3: Solve for P(6 or lower) (Question 20)

Step4: Solve for P(18 or higher) (Question 21)

Step5: Solve for P(multiple of 4) (Question 22)

Step6: Solve for P(9 or 11) (Question 23)

Step7: Solve for P(not a 15) (Question 24)

Step8: Solve for P(21) (Question 25)

Answer: