Hypothesis Testing (Discrete Distributions) (Edexcel International A Level Maths: Statistics 2)

Exam Questions

4 hours36 questions
1a
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4 marks

A random variable has distribution B left parenthesis n comma p right parenthesis.  Anna uses a single observation of the random variable to carry out a hypothesis test.

Write down the conditions that must be met in order to model a random variable using the binomial distribution.

1b
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2 marks

Explain how the parameters n and p are used in the context of a hypothesis test.

1c
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1 mark

Anna is carrying out a two-tailed hypothesis test. Explain how what is being tested for in a two-tailed test differs from what is being tested for in a one-tailed test.

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2a
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3 marks

For the random variable X space tilde space B left parenthesis 20 comma 0.3 right parenthesis calculate

(i)
P left parenthesis X less or equal than 2 right parenthesis
(ii)
P left parenthesis X less or equal than 3 right parenthesis
2b
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2 marks

A hypothesis test is to be carried out using an observation of the random variable X to test the hypotheses:

H subscript 0 ∶ p equals 0.3 space space space space space space space space space space space H subscript 1 ∶ p less than 0.3

Before carrying out the test, a significance level of 5% is chosen. The critical region is defined as space X less or equal than 2.

(i)
Explain why the critical region is defined asspace X less or equal than 2.
(ii)
State the actual significance level for the test.

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3
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5 marks

A mathematics teacher makes silly mistakes at the average rate of 20 per day and she teaches 5 lessons, each of equal length, per day.

(i)
State a suitable sampling distribution for the number of silly mistakes the mathematics teacher makes within one lesson.
(ii)
Find the probability that the mathematics teacher makes less than 2 silly mistakes during the lesson.
(iii)
After a few weeks, the teacher believes the average number of mistakes made in a day has changed. Write down suitable null and alternative hypotheses that could be used to test for a change in the number of silly mistakes she makes per day.

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4a
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3 marks

Alina is running for student council president at her school.  She claims she has the support of 60% of students in the school.  A rival candidate, John, wants to test at the 10% level of significance whether Alina is overestimating her support.

In mathematical terms, the experiment John conducts uses an observation of the random variable space X space tilde space B left parenthesis 100 comma p right parenthesis to test the hypotheses:

H subscript 0 ∶ p equals 0.6 space space space space space space space space space space space space H subscript 1 ∶ p less than 0.6

(i)
State how many people are in John’s sample and explain what the parameter p means in the context of this question. Explain why
(ii)
John has chosen this alternative hypothesis for his test.
4b
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4 marks

Assuming Alina’s claim is true, John calculates the following cumulative probabilities:

x 51 52 53 54 55
P left parenthesis X less or equal than x right parenthesis 0.04230 0.06379 0.09298 0.13109 0.17890

In John’s survey, 55 people say that they will support Alina.

(i)
Calculate P left parenthesis X equals 55 right parenthesis.
(ii)
State whether John should compare the value of P left parenthesis X less or equal than 55 right parenthesis or P left parenthesis X equals 55 right parenthesis with his significance level of 10%.
(iii)
In the context of this question, write a conclusion for John’s test.
4c
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2 marks

Write down the critical value and the critical region for John’s test.

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5a
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3 marks

A hypothesis test at the 6% significance level is carried out on a coin using the following hypotheses:

H subscript 0 ∶ p equals 1 half space space space space space space space H subscript 1 colon p not equal to 1 half

(i)
Give an example of what the parameter, p, could represent.

 

(ii)
In the context of your answer from part (i), explain what is meant by p not equal to 1 half.
(iii)
This is a two-tailed test. Explain what should be done with the 6% significance level.
5b
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2 marks

A single observation x is to be taken from a binomial distribution space X space tilde space B left parenthesis 100 comma p right parenthesis to test the hypotheses for the coin. One tail of the critical region is found to be X less or equal than 6.

(i)
Using your knowledge of the binomial distribution B left parenthesis 100 comma 0.5 right parenthesis, write down the other tail of the critical region.
(ii)
Write down the set of values for x which would lead to the acceptance of the null hypothesis.

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6
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4 marks

In a school where all the teachers drink coffee in the staffroom, a headteacher wants to see if using a new brand of coffee in the staffroom improves teachers’ report writing punctuality.  Previously, 75% of teachers in her school would meet the deadline for writing reports.  After the new brand of coffee is introduced the headteacher takes a random sample of 15 teachers, and conducts an experiment to test whether the proportion of teachers meeting the deadline on the next set of reports has improved.  The test is conducted at the 5% significance level, using the following hypotheses:

H subscript 0 ∶ p equals 0.75 space space space space space space space space H subscript 1 ∶ p greater than 0.75

(i)
Write down a suitable distribution for the random variable X, the number of teachers in the headteacher’s sample who meet the deadline.
(ii)
Calculate the probability that all the teachers in the sample would meet the deadline if the null hypothesis were true.
(iii)
By first calculating the probability that exactly 14 of the teachers would meet the deadline if the null hypothesis were true, find the critical value for the test.

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7a
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4 marks

A study of ladybirds in the UK found that 65% of all ladybirds are found to be of the seven-spot species.  Alex believes that more than 65% of the ladybirds in his garden are of the seven-spot species.  He conducts a hypothesis test at the 5% significance level by collecting a sample of 25 ladybirds from his garden and counting the number of them that are seven-spot ladybirds.

(i)
Alex uses the random variable space X space tilde space B left parenthesis n comma p right parenthesis to represent the number of seven-spot ladybirds in his sample.  Explain what  and  represent in the context of Alex’ experiment.
(ii)
State an assumption Alex has made in order to use the distribution in part (a)(i).
(iii)
State suitable null and alternative hypotheses that Alex could use to test his belief that more than 65% of the ladybirds in his garden are seven-spot ladybirds.
7b
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3 marks

Alex finds that 21 out of the 25 ladybirds in his sample are seven-spot ladybirds.

(i)
The probability of Alex’s observed value or that of a more extreme value is 0.03205. Write this in the form P left parenthesis X greater or equal than a right parenthesis equals space b.
(ii)
Alex has not yet calculated the critical value for his hypothesis test.  Explain why he does not need to do this to come to a conclusion for his test.

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8a
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3 marks

The probability of a student in a primary school library returning his or her books on time had been found to be 0.35. Joanna, the school librarian, has started a new incentive scheme and believes that more students are now returning their books on time because of it.  She conducts a hypothesis test using the null hypothesis H subscript 0 colon p equals 0.35 to test her belief.

(i)
State a suitable alternative hypothesis to test Joanna’s belief that more students are now returning their books on time.
(ii)
Write down the conditions under which Joanna could use a binomial probability distribution to model this problem.
8b
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2 marks

Joanna takes a random sample of 30 students who have checked out books and finds that under the new incentive scheme 15 of them return their books on time.  She calculates the following probabilities for the random variable X space tilde space B left parenthesis 30 comma 0.35 right parenthesis:

P left parenthesis X equals 14 right parenthesis space equals space 0.06112 space
P left parenthesis X equals 15 right parenthesis equals space 0.03511 space space
P left parenthesis X greater or equal than 16 right parenthesis equals space 0.03008 space

Write down the values of P left parenthesis X greater or equal than 15 right parenthesis and P left parenthesis X greater or equal than 14 right parenthesis.

8c
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3 marks

Write a conclusion for the hypothesis test, in context, if Joanna had chosen a significance level of:

(i)
5 percent sign
(ii)
10 percent sign.

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9a
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3 marks

The number of leaves on the grass in Danny’s garden on October 1st every year has a Poisson distribution with mean 280. 

Given that Danny’s garden is 56 square metres,

(i)
write down the distribution for the number of leaves per square metre in Danny’s garden on October 1st,
(ii)
find the probability that in a randomly chosen square metre of Danny’s garden, there are less than 3 leaves.
9b
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2 marks

Danny’s neighbour has cut down a tree and Danny believes this will decrease the number of leaves in his garden this year.  He is devising a hypothesis test to test his theory at the 10% significance level.  On October 1st he will choose a square metre of his garden at random and count the number of leaves.

Write down suitable null and alternative hypotheses Danny can use for his test.

9c
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2 marks

Use your answer to part (a)(ii) to determine if finding 2 leaves will lead Danny to accept or reject his null hypothesis. Justify your answer.

9d
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3 marks

Determine the critical region for this hypothesis test and hence, write down the maximum number of leaves that will lead Danny to reject his null hypothesis.

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1a
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3 marks

A single observation is taken from a discrete random variable space X tilde B left parenthesis 15 comma 0.4 right parenthesis to test H subscript 0 colon p equals 0.4 against H subscript 1 colon p less than 0.4

Using a 5% level of significance, find the critical region for this test.

1b
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2 marks

The actual value for the observation was 4.

State a conclusion to the hypothesis test for this value, giving a reason for your answer.

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2a
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4 marks

Harry is using the random variable space X tilde B left parenthesis 40 comma 0.15 right parenthesis to test the hypotheses:

H subscript 0 colon p equals 0.15
H subscript 1 colon p not equal to 0.15

Harry states that the critical regions are space X less or equal than 2 and space X greater or equal than 11

(i)
Calculate the probability of incorrectly rejecting the null hypothesis.
(ii)
State, with a reason, the conclusion of Harry’s test given that a value of space x equals 10 is observed for the test statistic.
2b
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4 marks

Sally is using the random variable Y tilde B left parenthesis 35 comma 0.03 right parenthesis to test the hypotheses:

H subscript 0 colon p equals 0.03
H subscript 1 colon p greater than 0.03

Sally observes the value space y equals 3.

(i)
Find the relevant probability that Sally should calculate to test her hypothesis using the observed value.
(ii)
State, with a reason, the conclusion of Sally’s test at the 5% significance level.

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3a
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2 marks

Charlie, the owner of a chocolate shop, claims that more than 60% of people can tell the difference between two brands of chocolate. Charlie takes a random sample of 15 customers and asks them to taste both brands of chocolate.  He records that 12 of them could successfully tell the difference between the two brands of chocolate.

State suitable null and alternative hypotheses to test Charlie’s claim.

3b
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4 marks

Test, at the 10% level of significance, whether Charlie’s claim is justified.

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4a
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1 mark

Nationally it is reported that four out of five people are right-handed.  Edward, an education researcher, takes a random sample of 30 children under the age of 18 years old and records the number of them, X, who write with their right hand.

Assuming that the national proportion applies to the sample, write down a suitable distribution for X.

4b
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2 marks

Edward believes that the proportion of right-handed children differs from the national proportion for all people.  To test his belief, he uses his sample of 30 children.

State suitable null and alternative hypotheses to test Edward’s belief.

4c
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3 marks

Given that P left parenthesis X less or equal than 19 right parenthesis equals 0.02561625 and P left parenthesis X less or equal than 20 right parenthesis equals 0.06108714, find the critical values for a two-tailed test at the 10% significance level for Edward’s belief.  You should state the probability of rejection for each tail, which should be less than 0.05 for each.

4d
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2 marks

Find the actual level of significance for a test based on your critical values.

4e
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1 mark

Out of the 30 children in the sample, Edward recorded that 20 of them write with their right hand.

Comment on Edward’s belief based on this observation.

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5a
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2 marks

The existing treatment for a disease is known to be effective in 85% of cases.  Dr Sabir develops a new treatment which she claims is more effective than the existing one.  To test her claim she uses the new treatment on a sample of 60 patients with the disease and uses a binomial distribution to model the number of them who are cured.

Explain two assumptions that Dr Sabir has made when using a binomial distribution to model the number of patients cured by the new treatment.

5b
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5 marks

Dr Sabir notes that her treatment was effective for 57 out of the 60 patients used in the sample.

Test, at the 1% level of significance, the validity of Dr Sabir’s claim that her treatment is more effective than the existing one. State your hypotheses clearly.

5c
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1 mark

State the conclusion you would have reached if a 5% level of significance had been used for this test.

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6
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5 marks

The owner of a website claims that his website receives an average of 60 hits per hour.  An interested purchaser believes the website receives on average less than 60 hits per hour.  The owner chooses a 10 minute period and observes that the website receives 6 hits.  Assuming that the number of hits the website receives follows a Poisson Distribution,

(i)
state null and alternative hypotheses to test the purchaser’s claim,
(ii)
find the critical region for a hypothesis test at the 5% significance level,
(iii)
test at the 5% significance level whether the purchaser’s claim is justified.

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7a
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4 marks

A “double yolker” is an egg which contains two yolks.  It is known that the probability of a chicken laying a double yolker is 0.1%.  A chicken farmer, Paolo, claims that double yolkers are rarer than the stated 0.1%.  To test his claim, Paolo records that his chickens lay 1217 eggs in a month and he uses these as his sample.  He discovers that none of these eggs are double yolkers.

Test, at the 5% level of significance, whether there is evidence to support Paolo’s claim that double yolkers are rarer than 0.1%. State your hypotheses clearly.

7b
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4 marks

Paolo decides to take a larger sample so extends his test to six months.  During this time, a sample of 7300 eggs is formed and two of them are double yolkers.

Use a suitable approximation to show that there is evidence, at the 5% level of significance, to support Paolo’s claim that double yolkers are rarer than 0.1%.

7c
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1 mark

Paolo concludes that the probability of a double yolker is definitely less than 0.1%. Give a reason to explain whether Paolo’s conclusion is justified.

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8a
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1 mark

It is known that 45% of male dragons eat more than 20 sheep within a day.  Bill, a dragon breeder, suspects that the proportion of female dragons that eat more than 20 sheep within a day is different to males.

State suitable null and alternative hypotheses for a two-tailed test for Bill’s suspicion.

8b
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3 marks

To test his suspicion, Bill observes a random sample of 15 female dragons during a full day and counts how many sheep they eat.  He finds that 11 out of the 15 female dragons ate more than 20 sheep within the day.

Test, at the 5% level, whether there is evidence to support Bill’s suspicion.

8c
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2 marks

Determine the outcome of the test, at the 5% level, if Bill had used a one-tailed test to check whether the proportion of females eating more than 20 sheep within a day is greater than the proportion of males.

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9a
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2 marks

A high school principal claims that lost phones are handed in to the school office at an average rate of 1.3 phones per day.  The school secretary believes that the rate is higher than this, so she conducts a hypothesis test at the 10% significance level over a 5-day period and finds that 10 phones are handed in to the school office during that time.

State suitable null and alternative hypotheses for the secretary’s test.

9b
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4 marks

Test, at the 10% level of significance, whether there is evidence to support the secretary’s belief.

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1a
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5 marks

Historical records show that England wins 45% of Ashes test cricket series.  Rory believes that in the recent past that proportion has decreased.  To test this, he looks at their results in the last 17 series.

Using a 5% level of significance identify the critical region to enable Rory to test his claim.

1b
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2 marks

England have won five series in the last 17. Use your answer in part (a) to state, with a reason, whether this sample supports Rory’s claim.

1c
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1 mark

State an assumption made when using a binomial model.

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2
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6 marks

It is known that there is a 0.35% chance of picking up a virus when downloading a file from a particular website.  After a security update, a security analyst believes that the chances of picking up a virus have been reduced.  In a sample of 1542 files downloaded from the website, 1 virus is detected.  The analyst wishes to use a hypothesis test with its significance level  appropriately chosen to allow her to report with as much certainty as possible that her belief is correct.

Consider tests at the 1%, 5% and 10% significance levels, and explain which of those significance levels the analyst should use for the test in her report.

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3a
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4 marks

At a school it is known that 80% of students obtain 3 or more A* to C grades in their A levels.  The principal claims that another local school has a different proportion of A* to C grades at A level.

Last year the other school had 45 out of 50 students achieve 3 or more A* to C grades at A level.

Test the principal’s claim at the 5% significance level stating suitable null and alternative hypotheses.

3b
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2 marks

Suggest an alternative hypothesis test that would lead to a different conclusion.

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4a
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4 marks

In a particular Pokémon game, it is possible to create offspring through breeding.  Sometimes when two Pokémon are bred together, their offspring possess a hidden ability.

One Pokémon fan website, A, claims that the probability of producing offspring with a hidden ability is 0.4.  Another website, B, claims the probability is higher.

Maya conducts an experiment and finds that 28 out of 50 of her Pokémon’s offspring possess a hidden ability.

Use Maya’s sample to test the claim of website A against website B at the 5% significance level, stating your null and alternative hypotheses clearly.

4b
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4 marks

Website B claims that the probability is 0.45.

Using a two-tailed hypothesis test, test the claim at the 5% significance level and make a statement about which website is more likely to be correct.

4c
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3 marks

The critical regions of a two-tailed hypothesis test to test B’s claim are X less or equal than 16 and X greater or equal than 29.  Find the actual level of significance.

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5a
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2 marks

A walk-in vaccination centre can model the number of people arriving every 5 minutes by the random variable X with distribution Po(0.6).

State two assumptions required for the Poisson model to be valid.

5b
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4 marks

The centre launches a new advertising campaign and conducts a hypothesis test to see if it has increased the number of people arriving for a vaccine. They choose a half hour period at random and find that 7 people arrive for a vaccine during this time.

Clearly stating your hypotheses, test at the 10% significance level whether the number of arrivals has increased.

5c
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2 marks

Find the probability of incorrectly rejecting the null hypothesis.

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6a
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3 marks

A single observation is taken from a discrete random variable X tilde B left parenthesis 25 comma p right parenthesis to test the hypotheses

H subscript 0 colon p equals a over 10        H subscript 1 colon p not equal to a over 10

where  is a positive integer to be found.

Given that at the 10% significance level one of the critical regions is X less or equal than 5, find the value of a.

6b
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2 marks

Find the other critical region for the test at the 10% significance level.

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7a
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3 marks

Anna likes to make crocheted fish for her friends.  Anna models the number of faults in her crocheted fish as having a Poisson distribution with a mean of 45 faults per square metre of material.  After taking a course she believes that this rate has decreased, and she decides to test her belief at the 10% significance level by counting the number of errors in a randomly chosen crocheted fish.

One of Anna’s crocheted fish uses 1000 cm2 of crocheted material.

Find the probability that Anna might incorrectly conclude that her rate of faults has decreased.

7b
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2 marks

Given that Anna finds 2 faults in the randomly chosen crocheted fish, carry out the hypothesis test.

7c
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3 marks

It is subsequently discovered that following her course Anna’s fault rate has actually become 25 faults per square metre. Find the probability that the hypothesis test outlined above would have resulted in Anna reaching an incorrect conclusion.

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8a
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1 mark

Chloe’s sister likes to play a game in which she hides a coin in one of her hands and asks Chloe to guess which hand it is in.  Chloe claims that she can predict which hand the coin is hidden in more often than not.  Her sister thinks Chloe is just guessing so she decides to conduct a hypothesis test to test Chloe’s claim.

State suitable null and alternative hypotheses for Chloe’s sister’s test.

8b
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3 marks

They play the game 100 times, and Chloe guesses correctly 60 times.

Using a suitable approximation, test at the 5% significance level whether or not Chloe’s claim is justified.

8c
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2 marks

Justify the use of your approximation in part (b).

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9
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6 marks

A college rugby team usually experiences injuries at a rate of 4 per week.  During a 12 week period they are forced to play at a different training ground whilst their regular ground is undergoing maintenance.  During this time the team experiences 65 injuries.

Using a suitable approximation, test at the 5% significance level whether or not there is evidence that the average rate of injuries per week is different at the temporary training ground.  Clearly state your sampling distribution and any assumptions you have made.

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1
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4 marks

A single observation, x, is taken from a discrete random variable space X tilde B left parenthesis 25 comma p right parenthesis to test H subscript 0 ∶ p equals 0.2 against  H subscript 1 ∶ p not equal to 0.2

For the purposes of this test, the critical regions are specified as being X less or equal than 1 and X greater or equal than 9.

Calculate the probability of incorrectly rejecting the null hypothesis when conducting this test.

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2a
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3 marks

The probability of a wild Asian elephant living past 40 years old is 45 percent sign

Rosie, a zoologist, obtains data on 25 elephants in captivity and records their ages at death. She suspects that the proportion of Asian elephants that live past 40 years old is smaller for those in captivity than those in the wild.

Using a 1% level of significance, find the critical value of a one-tailed hypothesis test to enable Rosie to test her suspicion. Clearly state your hypotheses.

2b
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3 marks

Rosie finds that only one elephant, out of the 25 in captivity, lived past 40 years old. 

(i)
Write down the conclusion of the hypothesis test based on this information.
(ii)
Calculate the actual probability that this observed result has led to the incorrect conclusion.

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3a
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3 marks

Roger’s bunnies are well trained and almost always leave their droppings in a designated area, however, Roger occasionally finds that they have left their droppings in his garden too. 

Given that over a six-hour period the probability there are no droppings found in the garden is 4.53999 cross times 10 to the power of negative 5 end exponent correct to 6 significant figures, find the mean number of droppings left per hour in Roger’s garden.

3b
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3 marks

Roger’s bunnies’ new treat craze is popcorn and Roger believes that the bunnies leave less droppings in the garden after he has given them this treat. Roger decides to test his theory by giving his bunnies the popcorn and then seeing how many droppings are left in the garden over a three-hour period.   

Given that the probability that Roger incorrectly rejects the null hypothesis is 0.0404277 correct to 6 significant figures, find the critical region for Roger’s hypothesis test.

3c
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2 marks

Roger finds that two droppings were left in his garden during the three-hour period. Stating your hypotheses clearly, write down the conclusion of Roger’s hypothesis test.

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4a
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4 marks

Historic company data shows that the proportion of customers ordering a large vegetable box from Lakebridge Organics is 0.4.

Last week a random sample of 12 customers’ orders was taken and it was found that 10 of them had ordered a large vegetable box.

Test, at the 5% significance level, whether this suggests that the proportion of customers ordering large vegetable boxes has increased. State your hypotheses clearly.

4b
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6 marks

Historic company data shows that the proportion of customers ordering a medium vegetable box is also 0.4.  Lucinda, a delivery driver, suspects that the proportion of current customers ordering medium boxes is different from 0.4.  She takes a random sample of 40 customers’ orders.

(i)
Stating your hypotheses clearly, identify the critical regions for a hypothesis test at the 5% significance level.
(ii)
State the actual level of significance of the test.
(iii)
Of the 40 orders, 21 of them were for medium vegetable boxes. State whether this supports Lucinda’s suspicion at the 5% level of significance.

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5a
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1 mark

A football team, Dinamo Galacticos, are trying to decide on a colour for their new kit.  They are told by a local sports commentator that the proportion of games won by teams wearing red is 0.5.

The manager takes a random sample of 20 games where one team wears red and finds that n of them are won by the team in red.  Assuming that the proportion of games won by teams in red really is 0.5, then the probability that n or fewer games out of 20 would be won is equal to 0.1316 correct to 4 decimal places.

Find the value of n.

5b
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3 marks

The manager decides to increase her random sample to include 50 games.  She suspects that the actual proportion of games won by teams in red is lower than 0.5.

(i)
Using a 5% level of significance, find the critical region for a one-tailed hypothesis test. State your hypotheses clearly.
(ii)
Using a 10% level of significance, find the largest number of games that could be won by teams wearing red without the test suggesting that the manager’s suspicions are unfounded.
5c
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4 marks

The sports commentator later says that he may have gotten mixed up, and that he thinks it is actually teams wearing green that win 50% of their games.

Given that teams wearing green have won 14 games from the last 40 in which they played, test at the 5% significance level whether the commentator’s new claim is justified. You must clearly state your null and alternative hypotheses.

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6a
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3 marks

A catering company’s past records show that the proportion of their customers who are vegetarian has previously been 0.2.  The company decides to take a random sample of 30 current customers to test whether that figure 0.2 is still valid for their current customer base.

Let X denote the number of vegetarians in the sample. Find the critical region for a two-tailed test using a 10% significance level, stating the actual probability in each tail.

6b
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2 marks

The number of vegetarian customers in the sample is 11.  One of the company’s employees used the same sample to suggest that this shows that the proportion of vegetarian customers has not just changed but has in fact increased.

Use this test statistic to test, at the 5% level of significance, whether the proportion of vegetarian customers has increased. State your hypotheses clearly.

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7a
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3 marks

A random variable has distribution X tilde B left parenthesis 20 comma p right parenthesis.

In order to test the hypotheses

H subscript 0 ∶ p equals 0.45      H subscript 1 ∶ p not equal to 0.45

a random observation of X is taken and found to be 5.

Carry out a hypothesis test at the 10% significance level.

7b
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3 marks

Another random variable has distribution Y tilde B left parenthesis m comma p right parenthesis.

A random observation of Y is taken and found to be 1. Using the same hypotheses as above, find the maximum value of m for which H subscript 0 would not be rejected at the 10% significance level.

7c
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3 marks

Another random observation of Y is taken and found to be y. For the same hypotheses as above, this provides evidence to reject H subscript 0 at the 5% significance level. 

Using your answer to part (b) as the value for m, find the possible values of y.

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8a
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5 marks

A newspaper article claims that 60% of animal species have become extinct since 1970.  Iggy, a taxonomic biologist, has been studying animal extinction statistics and believes that the proportion is different to the newspaper’s claim.

Iggy collects a random sample of 500 species that were recorded as being in existence in 1970 and records the number that are now extinct.  He uses multiple sources to verify the species’ taxonomic status and finds that the number of extinct species could be as low as 319 or as high as 329.

Iggy wants to use his findings to test his belief, but he also wants to make sure that the test will support his belief for all possible values of the number of extinct species. Using a suitable approximation, find the smallest possible integer percentage value he could use for a significance level to make sure that the test supports his belief

8b
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5 marks

Iggy repeats this process with a different random sample of 1000 species for which the taxonomic status is more certain, and in this second sample he finds the total number of extinct species to be 650.

Show that the evidence from this second sample offers better support for Iggy’s hypothesis than the evidence from his first sample.

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9a
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5 marks

It is thought that 2% of all giant huntsman spiders have a leg span of over 30 cm when fully grown.  Residents in a village in Laos believe that in their village the proportion of these spiders with a leg span of over 30 cm is different to 2%.  To test their theory, they gather a sample of 500 fully grown giant huntsman spiders, measure their leg spans and then release them back into the wild.

Using an approximating distribution, find the critical region for the residents’ hypothesis test using a 10% significance level. Clearly state your sampling distribution and hypotheses

9b
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1 mark

Using the approximating distribution, estimate the probability that the residents will incorrectly conclude that the proportion of spiders in their village, with a leg span of over 30 cm, is not 2%.

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