DP IB Maths: AI HL

Topic Questions

4.6 Random Variables

1
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4 marks

The random variable X has mean 8 and variance 15. Given that

 straight E open parentheses a X plus b close parentheses equals 23
Var open parentheses a X plus b close parentheses equals 135 

find the two possible values of b.

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2a
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5 marks

The random variable X has mean of mu and standard deviation of sigma.  The random variable Y has mean of 3 and standard deviation of 4.  Given that

E left parenthesis 2 X plus 5 Y right parenthesis equals 25
Var left parenthesis 2 X plus 5 Y right parenthesis equals 724 

Find the value of mu and the value of sigma.

2b
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1 mark

State the assumption that has been made about the random variables X and Y.

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3a
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4 marks

Frank has a variable tariff for his electricity and gas bills. His monthly electricity bill is $E  and his monthly gas bill is $GE  and G are independent random variables with distributions straight N open parentheses 85 comma 9.4 squared close parentheses and straight N open parentheses 53 comma space 12.45 close parentheses respectively.

Find the probability that the total electricity and gas bill in a month exceeds $150.

3b
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5 marks

Frank has a part-time job tutoring college students. His monthly income from this job can be modelled as a Normal distribution with mean $504 and standard deviation $41. Frank uses this income to pay for his gas and electricity bills, he puts the remaining money into his partner’s bank account each month.

i)
Find the probability that Frank puts between $350 and $450 into his partner’s    bank account in a month.
ii)
State the assumption needed in part (b)(i) regarding his income and his bills.

 

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4a
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1 mark

Veronica, a taxi driver in London, charges her customers a fixed fee of £5 plus £1.20 per mile. The lengths of her customers’ journeys are normally distributed with mean
16.7 miles and standard deviation 4.1 miles.

Find the standard deviation of the prices of Veronica’s taxi rides.

4b
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2 marks

Find the probability that a taxi ride will cost less than £30.

4c
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3 marks

Find the probability that the total cost of two independent taxi rides is more than £60.

4d
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2 marks

On a bank holiday, Veronica doubles her prices.

Find the variance of the prices of Veronica’s taxi ride on a bank holiday.

4e
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1 mark

Find the probability that a taxi ride on a bank holiday will cost more than £60.

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5a
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3 marks

The random variable X has the distribution straight N open parentheses 5.9 comma space 2.1 squared close parentheses.

Find the probability that the sum of 50 independent observations of X exceeds 300.

5b
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1 mark

Hence find the probability that the mean of 50 independent observations of X is less than 6.

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6a
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4 marks

Dinah’s Diner is famous for its triple burger which is made up of three beef patties, two rashers of bacon and a toasted bread bun. The mass, in grams, of a beef patty follows the distribution straight N open parentheses 110 comma space 6 squared close parentheses.  The mass, in grams, of a rasher of bacon follows the distribution straight N open parentheses 30 comma space 5 squared close parentheses .  The mass, in grams, of a toasted bread bun follows the distribution straight N open parentheses 50 comma space 3 squared close parentheses.

Estimate the proportion of triple burgers at Dinah’s Diner that have a mass of more than 450 g. 

6b
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1 mark

State, with a reason, whether the probability that the total mass of two triple burgers exceeding 900 g is equal to your answer in part (a).

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7
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5 marks

Ella buys some fruit from the grocery store. The average mass of an apple at the store is 220 grams with standard deviation 15 grams. The average mass of an orange at the store is 120 grams with standard deviation 8 grams. Ella buys 5 random apples and 8 random oranges and packs them in her grocery bag which weighs 135 grams when empty.

Find the expectation and standard deviation of the total mass of the grocery bag and the 13 pieces of fruit. State any assumptions that are needed and where they are needed.

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8a
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4 marks

A football coach ends each training session with a penalty shoot-out competition. Each player takes 15 penalty shots and scores 6 points for each goal. The coach does not want anybody to get zero points so gives all players 10 points just for participating. Raquel takes part in the challenge each session and it is known that on average 65% of her shots go in the goal.

Find the mean and standard deviation for the number of points Raquel achieves in the competition. State any assumptions that are needed.

8b
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3 marks

Find the probability that Raquel scores more than 80 points in the competition.

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9a
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4 marks

Harietta has a summer job during her break from college. The random variable X represents the amount of money ($) Harietta earns each day. Each day she gets a guaranteed $50 plus an extra $10 for every extra hour she works. The number of extra hours she works each day can be modelled by the random variable H. The probability distribution of H is shown below.

 

 h

0

1

2

3

4

P left parenthesis H equals h right parenthesis

0.35

 p

0.07

 q

0.18

 

Given that the expected amount of money that Harietta earns in a day is $65.20, find the values of p and q.

9b
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2 marks

Given that Var left parenthesis X right parenthesis equals 228.96 comma find Var open parentheses H close parentheses.

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1a
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4 marks

Two independent random variables X and Y follow binomial distributions, where X tilde B left parenthesis 5 comma 0.3 right parenthesis and Y tilde B left parenthesis 11 comma 0.45 right parenthesis.

Find

(i)
P left parenthesis X equals 2 right parenthesis
(ii)
P left parenthesis Y less or equal than 6 right parenthesis.
1b
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4 marks

Calculate

(i)
E left parenthesis 2 X minus Y right parenthesis
(ii)
Var left parenthesis 3 X minus 2 Y right parenthesis.

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2a
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2 marks

A game is played with two fair spinners. Each spinner is divided into three sections numbered 1, 2 and 3. A player’s score is obtained by spinning both spinners simultaneously and adding together the numbers that they land on.

Complete the table below for the probability distribution of the game. 

 Score, X          
 P left parenthesis X equals x right parenthesis          
2b
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2 marks

Find the expected score, E left parenthesis X right parenthesis.

2c
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2 marks

Jian Wei wants to award prizes such that a player receives $3 for the score that they achieve.

Find the expected prize money for the game.

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3a
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3 marks

Dasha plays two games. When playing game A, Dasha has an equal chance of scoring 2, 3 or 5 points. When playing game B, Dasha has a 25% chance of scoring 1 or 2 and a 50% chance of scoring 5. 

For game B find the expected score.

3b
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3 marks

The scores for both games are added together.

Find the expected total.

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4
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6 marks

A random variable has straight E left parenthesis X right parenthesis equals 23 and Var left parenthesis X right parenthesis equals 1.5.

Find 

(i)
straight E left parenthesis X minus 6 right parenthesis 

(ii)
straight E left parenthesis negative 2 X plus 5 right parenthesis 

(iii)
Var left parenthesis X plus 7 right parenthesis

(iv)
Var left parenthesis 3 X minus 3 right parenthesis

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5a
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2 marks

A scientist is studying a population of komodo dragons and has found that the length of the dragons follows a normal distribution. The mean length, of a male dragon is 2.59 m with standard deviation of 0.18 m. For a female dragon the mean length is 2.28 m with standard deviation of 0.11 m.

Find the probability that the length of a female komodo dragon selected at random will be greater than 2.4 m.

5b
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4 marks

Four male komodo dragons are selected at random.

Find

(i)
the expected total length of the dragons
(ii)
the variance of the length of the dragons.
5c
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3 marks

Hence find the probability that the total length of 4 randomly selected male dragons will be greater than 11 m.

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6a
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2 marks

A cinema chain sells 3 sizes of popcorn at the food counter. When a container is filled with popcorn its mass follows a normal distribution. The mean and variance of the mass of each size of container when filled with popcorn is shown in the table below.

 

 

Mean (g)

Variance (g2)

Small

60

4

Medium

160

169

Large

250

441

 

Find the probability that a large container selected at random contains between 210 g and 270 g of popcorn.

6b
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4 marks

Raoul buys 1 small bag of popcorn and 3 medium bags.

With reference to the total amount of popcorn that Raoul has purchased, find

(i)
the mean mass
(ii)
the variance.
6c
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1 mark

Hence find the standard deviation of the total amount of popcorn that Raoul has purchased.

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7a
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2 marks

A company manufactures individual chocolates. The distribution of the mass of these chocolates can be modelled as a normal distribution with mean mass 11 g and variance 2.25 g2.

A chocolate with a mass of less than a g is too small to sell.

Given that the probability a chocolate is too small to sell is 0.05, find the value of a.

7b
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2 marks

Chocolates are sold in bags of 8.

Find the mean weight of a bag of chocolates.

7c
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2 marks

Find the variance of a bag of chocolates.

7d
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3 marks

Find the probability that the average mass of a chocolate in a bag is less than or equal to a space g.

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8a
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3 marks

Julie is eating in a sushi restaurant where the individual plates are transported through the restaurant on a conveyor belt. Julie’s two favourite dishes are ngiri and edamame beans and the number of plates of these foods that pass Julie follow Poisson distributions. On average, one ngiri plate passes Julie every 10 seconds and one plate of edamame beans passes her every 25 seconds.

Write down

(i)
how many ngiri plates pass Julie in 2 minutes
(ii)
how many plates of edamame beans pass Julie in 2 minutes.
8b
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3 marks

Hence find the probability that 15 or fewer of her favourite dishes pass Julie in a 2 minute interval.

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9a
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2 marks

Matt and Hannah both like to go for a run each morning. The distance that Matt runs each day can be modelled by a random variable M space tilde N left parenthesis 3.2 comma space 0.8 squared right parenthesis and the distance that Hannah runs can be modelled by a random variable H tilde space N left parenthesis 4.7 comma space 0.5 squared right parenthesis. All distances are measured in kilometres.

The variables H and M are independent of each other.

On a day chosen at random, find the probability that Hannah will run a distance of at least 5 km.

9b
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3 marks

For 7 randomly selected runs find the probability that the total distance run by Hannah will exceed 30 km.

9c
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5 marks

Find the probability that, on a day chosen at random, Matt runs further than Hannah.

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10a
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2 marks

A computer game has two levels. It is found that the time taken for a player to complete level 1 is normally distributed with mean 110 seconds and standard deviation 23 seconds. The time taken for a player to complete level 2 is normally distributed with a mean 196 seconds and standard deviation 27 seconds.

Find the probability that, for a randomly chosen player, the time taken to complete level 1 will be between 97 and 105 seconds.

10b
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6 marks

Find the probability that the length of time to complete level 2 for a randomly chosen player is more than twice as long as it takes to complete level 1 for another randomly chosen player.

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1a
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4 marks

Two friends, Forrest and Gumpy, are planning to run a marathon together. The distributions F tilde straight N open parentheses 253 comma space 95 close parentheses and G tilde straight N open parentheses 281 comma space 52 close parentheses are used to model the times in minutes it takes Forrest and Gumpy to complete a marathon respectively.  It can be assumed that their times are independent.

Find the probability that Forrest completes the marathon quicker than Gumpy.

1b
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2 marks

Find the probability that Gumpy is still running the marathon one hour after Forrest has completed it.

1c
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3 marks

Find the probability that their times taken to complete the marathon differ by more than 5 minutes.

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2a
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3 marks

Roger is considering buying a new pet.  He has researched the prices, in €, of rabbits, chinchillas and degus.  The information is shown in the table below.  The prices of the three types of animals are normally distributed and independent of each other. 

 

Mean

Standard Deviation

Rabbit

30

9

Chinchilla

145

20

Degu

37

6

 

Find the probability that the cost of two independently bought degus is less than €70.

2b
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3 marks

Find the probability that a randomly selected degu is more expensive than a randomly selected rabbit.

2c
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4 marks

Find the probability that a randomly selected chinchilla is more than five times as expensive as a randomly selected rabbit.

2d
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4 marks

Roger and his housemate Lucy have decided to buy one of each type of pet for their house. Roger loves rabbits so he will pay for the rabbit himself, he will pay 50% of the cost for the chinchilla and 10% of the cost for the degu.

Find the probability that, in total, Roger pays less than €100 for the three pets.

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3a
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3 marks

The random variables X tilde straight N open parentheses 50 comma space 9 squared close parentheses and Y tilde straight N open parentheses 400 comma 150 close parentheses are independent.

Find P open parentheses Y less than 7 X plus 40 close parentheses.

3b
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3 marks

There’s a 99.95% chance that the sum of a random observation of X and a random observation of Y is bigger than k.  Find the value of k.

3c
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4 marks

Find the probability that the sum of three independent observations of X is more than one third of one observation of Y.

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4
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5 marks

In a video game a player gets points for completing a level and for defeating enemies, these points are independent of each other. The amount of points a player gets for completing the level and for defeating an enemy can be modelled as L tilde straight N left parenthesis 500 comma 220 right parenthesis space and space space E tilde straight N left parenthesis 150 comma 85 right parenthesis respectively. 

In a bonus stage, the points for completing the level are tripled and there are five enemies (points for defeating enemies are not tripled), the total score is the sum of the points for completing the level and defeating the enemies.  The top 10% of scores make the leadership board. 

Estimate the minimum score that would make the leadership board.

 

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5a
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2 marks

Kate and Clint are working as a pair in an archery competition. They are both shooting arrows at a target. Kate shoots 20 arrows and Clint shoots 10. The number of times they each hit the target are added together to form the pair’s final score, denoted by the random variable S. On average, Kate has an 95% chance of hitting the target and Clint has a 50% chance of hitting the target.

Find straight E open parentheses S close parentheses. State any assumptions that are needed.

5b
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2 marks

Find Var open parentheses S close parentheses . State an additional assumption that is needed.

5c
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3 marks

Kate claims that the pair’s final score,S, follows a binomial distribution straight B open parentheses 30 comma space p close parentheses.

By using the formulae for the mean and variance of a binomial distribution, show that Kate’s claim is incorrect.

5d
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4 marks

In the competition, pairs win a prize if their final score is at least 28.

Find the probability that Kate and Clint win a prize.

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6a
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2 marks

Viktor works for the emergency services and has found from previous data that the amount of call-outs per day can be modelled using a Poisson distribution with mean 14.9. The number of call-outs are independent of the day of the week. Viktor decides to monitor the number of call-outs each day over a seven-day period.

Find the mean and the standard deviation of the total number of call-outs during a seven-day period.

6b
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3 marks

Find the probability that the mean number of daily call-outs using Viktor’s seven-day period is more than 16.

6c
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3 marks

After each call-out Viktor is required to complete three forms. 

Find the mean and standard deviation of the number of forms that Viktor is required to complete in a day due to call-outs.

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7a
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3 marks

Reuben works at a candy store and sells three types of sweets: chocolate, marshmallow and honeycomb. Reuben uses a scoop to measure a portion for each type of sweet and the price depends on the weight of each individual portion. The table below shows the mean and standard deviation of the masses of the portions for each type of sweet as well as the cost per unit weight. 

Type of sweet

Mean (grams)

Standard deviation (grams)

Price (£ per kg)

Chocolate

167

5.2

3.50

Marshmallow

79

2.9

2.80

Honeycomb

125

8.1

4.20

 

Reuben offers a product called Sugar Supreme which contains 10 portions of sweets in total. Two portions are chocolate, x portions are marshmallow and y portions are honeycomb. The mean cost of a Sugar Supreme is £3.85.

Find the values of x and y .

7b
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4 marks

Find the standard deviation of the costs of the Sugar Supreme product.

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8a
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6 marks

Danny and Mark use a biased four-sided dice to play a game. The number that the dice lands on, X, follows the probability distribution described in the table below.

 

x

0

2

6

8

P open parentheses X equals x close parentheses p p q q

 

Danny calculates his score by multiplying the number on the dice by 15 and then adding 11. Mark calculates his score by adding 5 to the number on the dice and then multiplying by 8. They each roll the dice once and calculate their scores.

Given that Mark’s expected score is 8 more than Danny’s expected score, find the values of p and q .

8b
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4 marks

After they have rolled the dice once, each player is awarded a number of points which is calculated by subtracting their opponent’s score from their own score. A player’s number of points will be negative if their opponent’s score is higher than their own.

Given that the standard deviation for the number of points a player is awarded is 51, calculate the standard deviation of X.

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