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12.03 Theoretical probability

Worksheet
Theoretical probability
1

Yuri has 5 blue marbles, 1 red marble, 1 yellow marble and 1 black marble in a bag. Yuri picks a marble from the bag without looking. Find the probability that Yuri picks a blue marble.

2

A bag contains 21 red marbles and 26 blue marbles. Find the probability of drawing a red marble.

3

A bag contains 49 marbles. 24 of them are red and the rest are of them are blue. Find the probability of drawing a blue marble.

4

A spinner has ten sectors of the same size:

  • 5 of the sectors show a star.

  • 2 of the sectors show an apple.

  • 3 of the sectors show an elephant.

Find the probability of spinning an elephant.

5

A letter is chosen at random from the word COCOONS.

a

Which letter is most likely to be chosen?

b

Find the probability that the chosen letter is a "C".

6

The numbers from 2 to 10 are written on separate cards. One card is chosen at random. Find the probability that the number is:

a

A multiple of 2.

b

A prime number.

c

A number less than 6.

7

A two-digit number is formed only using the digits 3 and/or 2.

a

List all the possible two-digit numbers.

b

Find the probability that the number formed is odd.

c

Find the probability that the number formed is more than 30.

8

A three-digit number is formed only using the digits 2, 7, and/or 8. Some of the possible three-digit numbers are listed below:

222, \quad 227, \quad 228, \quad 272, \quad 277, \quad 278, \quad 282, \quad 287, \quad 288, \\ 722, \quad 727, \quad 728, \quad 772, \quad 777, \quad 778, \quad 782, \quad 787, \quad 788
a

List the remaining possible three-digit numbers.

b

Find the probability that the number formed is odd.

c

Find the probability that the number formed is palandromic (the same forwards as backwards).

9

A full set of scrabble tiles is shown in the diagram below. The last two letters are the two "blank" tiles:

AAAAAAAAAB
BCCDDDDEEE
EEEEEEEEEF
FGGGHHIIII
IIIIIJKLLL
LMMNNNNNNO
OOOOOOOPPQ
RRRRRRSSSS
TTTTTTUUUU
VVWWXYYZ

One letter tile is drawn at random:

a

Find the probability that it is a "G" or an "R".

b

Find the probability of drawing a vowel.

10

Luigi and Danielle enter a raffle where 80 tickets are on sale. Luigi buys 1 ticket and Danielle buys 5 tickets.

a

Find the probability that Luigi wins if all the tickets were sold.

b

Find the probability that Danielle wins if all the tickets were sold.

c

Find the probability that Danielle wins if only 70 tickets were sold.

11

Consider the following dice:

Four-sided die

Six-sided die

Eight-sided die

Ten-sided die

Twelve-sided die

Twenty-sided die

State the die that would give the highest probability of rolling the following:

a

16

b

1

c

9

12

Emma rolls two four-sided dice and multiplies the two numbers she rolls together.

a

Find the probability that the number formed is even.

b

Find the probability that the number formed is larger than 6.

13

Neil takes the following cards and shuffles them up. He draws one card, shows it to you, and keeps it. You then draw one card from the remaining seven cards, and you win if the number on your card is higher than Neil's.

Find your chance of winning if Neil draws the following cards:

a
b
14

A fair die is rolled and then a coin is tossed.

a

What is the probability of getting an even number and a head?

b

What is the probability of getting an even number, a head, or both?

Multiple trials
15

A bag contains 28 red marbles, 27 blue marbles, and 26 black marbles.

a

Find the probability of drawing a blue marble.

b

A single trial is drawing a marble from the bag, writing down the colour, and putting it back. If this trial is repeated 400 times, how many blue marbles should you expect?

Round your answer to the nearest whole number.

16

A die is rolled 358 times.

a

If it lands on a six 12 times, what is the probability that the next roll will land on a six?

b

Does the outcome of the next roll depend on the outcome of previous rolls?

17

This spinner is spun 12 times. Find the number of times we would expect to spin:

a

An apple.

b

A ball.

18

If the probability of an event is \dfrac{2}{3}, how many times would you expect the event to occur in 18 trials?

19

A six-sided die is rolled 24 times. How many times should we expect to roll a 1?

20

An eight-sided die is rolled 24 times. How many times should we expect to roll a 7?

Round your answer to the nearest whole number.

21

A twenty-sided die is rolled 100 times. How many times should we expect to roll a 14 or more?

Round your answer to the nearest whole number.

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Outcomes

VCMSP267

Assign probabilities to the outcomes of events and determine probabilities for events

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