A student creates the following diagram of their favourite animals:
How many of the animals have four legs?
How many of the animals have four legs and stripes?
How many of the animals have four legs or stripes, but not both?
Rosey wants to decide which movie to watch from a streaming website. A Venn diagram of her options sorts movies into three categories based on their genre:
How many of the movies are horror films?
How many of the movies fit into only one genre?
How many of the movies are an action film combined with at least one other genre?
Danielle makes a Venn diagram about the possible dance partners in her dance class:
How many students are there in Danielle's class, not including Danielle?
Danielle thinks her partner is suitable if they are both good dancers and he is the right height. How many suitable partners are there in the class?
Danielle is told that her partner will be randomly assigned. What is the probability that her partner will be suitable?
David makes a Venn diagram about the possible pets he could get from the local shelter. He is told that his new pet will be selected at random.
What is the probability that his new pet will be a dog that isn't fluffy?
What is the probability that his new pet won't be fluffy?
What is the probability that his new pet will be fluffy?
Bill is struggling to decide what movie to watch. He decides to pick one at random from his collection. A Venn diagram of his collection sorts the movies into three categories:
Comedic films, romantic films, and runtime over 2 hours.
How many movies are there in Bill's collection?
Bill wants to watch a comedy. What is the probability he will select a comedy?
Bill is after a romantic comedy that goes for less than 2 hours. What is the probability that he will select a suitable film?
Bill is after a comedy film that goes for longer than 2 hours. What is the probability that he will select a suitable film?
The results from a recent survey showed that 56 people speak Spanish or French. Of these, 36 speak Spanish, and 18 speak both Spanish and French. Find the number of people surveyed who speak French.
A student is making a Venn diagram from the information gathered from her classmates. 18 people play cricket, 15 play softball and 6 play both softball and cricket.
How many people only play softball?
Construct a Venn diagram that represents the given information.
A teacher is making a Venn diagram about a recent catch-up test for those that missed or did poorly on the original test. In the class of 30 students, 27 did the original test and 10 did the catch-up test.
Given that everyone in the class did at least one test, find how many students did both tests.
Construct a Venn diagram that represents the given information.
Miss Merryweather recorded the hair colour and hair type of her students in the following graph:
Complete the following two-way table from the information in the graph:
Red | Brown | Blonde | Black | |
---|---|---|---|---|
Straight | ||||
Curly |
180 tennis players were asked whether they would support tennis players wearing wireless headsets to receive on court coaching. The results are shown in the table:
Find the missing value in the table.
Support | Do not support | |
---|---|---|
Males | 36 | |
Females | 76 | 18 |
38 students were asked whether or not they were allergic to nuts and dairy. Data is recorded in the following two-way table:
Allergic to Nuts | Not Allergic to Nuts | |
---|---|---|
Allergic to Dairy | 7 | 6 |
Not Allergic to Dairy | 10 | 15 |
How many students are allergic to nuts?
How many students are allergic to nuts or dairy, or both?
How many students are allergic to at most one of the two things?
A healthy living initiative asked people to describe how often they go to the gym. The table below summarizes the result:
How many people were surveyed?
If one person is chosen at random, what is the probability that they are a female who frequently attends the gym?
If one person is chosen at random, what is the probability that they attend the gym rarely?
Male | Female | |
---|---|---|
Frequently | 23 | 37 |
Rarely | 39 | 11 |
A group of tourists were asked whether they spoke Mandarin or Spanish. The result is summarized in the table below:
Complete the table.
How many people speak both languages?
If one person is chosen at random, what is the probability that they speak neither language?
If one person is chosen at random, what is the probability that they speak only one of the languages?
Spanish | Not Spanish | Total | |
---|---|---|---|
Mandarin | 51 | 16 | |
Not Mandarin | 13 | 20 |
In a study, some people were asked whether they were vegetarian or not. 27 responders said they were vegetarian, of which 8 were children. 18 children said they were not vegetarian, and 21 adults said they are not vegetarians.
Complete the table.
Calculate the proportion of responders that are vegetarian.
Calculate the proportion of adults that are vegetarian.
Not vegetarian | Vegetarian | |
---|---|---|
Children | ||
Adults |
In a study, some people were asked whether they lie. A partially completed two-way table of the results is shown below:
Complete the table.
Of those in the study, one is chosen at random. Find the probability that they said they never lie.
Lie | Don't Lie | Total | |
---|---|---|---|
Children | 15 | 35 | |
Adults | 10 | ||
Total | 60 |
The following table describes the departures of trains out of a train station for the months of March and April:
Month | Departed on time | Delayed |
---|---|---|
\text{March} | 109 | 27 |
\text{April} | 108 | 50 |
How many trains departed during March and April?
Find the percentage of the trains in April that were delayed, to one decimal place.
Find the percentage of the total number of trains during the two months that were trains that departed on time in March, to one decimal place.
Find the exact probability that a train selected at random in April would have departed on time.
Find the exact probability that a train selected at random from the 2 months was delayed.
A student makes a Venn diagram of students who are late to school, and students who catch the bus to school.
Using the Venn diagram, complete the following table:
Late | Not late | |
---|---|---|
Caught bus | ||
Didn't catch bus |
60 residents of a city were asked "Do you support the construction of the new train station?". The residents questioned were also classified as living in the North, South or in the inner city.
Using the Venn diagram, complete the following table:
North | South | Inner | |
---|---|---|---|
Yes | |||
No |
Students in Xanthe's class were asked if they owned a dog and asked if they owned a snake. The following two-way table shows the results of the survey:
Owns a dog | Doesn't own a dog | |
---|---|---|
Owns a snake | 2 | 3 |
Doesn't own a snake | 13 | 11 |
Construct a Venn diagram that represents the information provided in the two-way table.
A vet has 25 pets visit their practice in a day. The pets are categorised based on whether they have been vaccinated and whether they have been microchipped.
Using the Venn diagram, complete the following table:
Microchipped | Not Microchipped | |
---|---|---|
Vaccinated | ||
Not vaccinated |
In Australia, 100 random people were surveyed regarding their carbon footprint and where they lived. The people were categorised as living in either an urban or regional location, and as having a high or low carbon emission.
Construct a Venn diagram that represents the information provided in the two-way table.
Urban | Regional | Total | |
---|---|---|---|
High emission | 37 | 13 | 50 |
Low emission | 24 | 26 | 50 |
Total | 61 | 39 | 100 |
Vanessa wants to sort a list of 11 numbers based on whether they contain a 3, and whether they are even. The list of terms is shown below:
1, \, 2, \, 3, \, 5, \, 8, \, 13, \, 21, \, 34, \, 55, \, 89, \, 144
If a term from the list is chosen at random, find the probability that it:
Is an even number that doesn't contain a 3.
Contains a 3 or is an odd number.
Is either odd or contains a 3, but not both.
In a particular class, 5 people play both football and tennis, 13 people in total play tennis, and 11 in total play football.
How many people only play football?
How many people play only one sport?
If a random student is chosen from the group, what is the probability that the student only plays tennis?
In a study, a number of people were asked whether they were musicians or not. 29 responders said they were a musician, of which 8 were children. 19 children said they were not musicians, and 12 adults said they are not musicians.
How many people were in the study?
What proportion of responders are musicians?
What proportion of adults are musicians?
A group of 132 students are to choose to study either Mandarin or Spanish (or both). 67 students choose Mandarin and 72 students choose Spanish.
How many students choose both languages?
If a student is picked at random, what is the probability that the student chose Spanish only?
If a student is picked at random, what is the probability that the student has not chosen Mandarin?
A student is making a Venn diagram about politicians in the last two elections. Looking at a group of 24 politicians, 14 ran in the first election and 19 ran in the second election.
Given that every politician examined was in at least one election, how many politicians ran in both elections?
If a politician is randomly chosen in the second election, what is the probability they were also in the first election?
A jeweller has sorted 25 gems based on two categories:
Based on the colour - emerald
Based on the cut - rectangular
If a gem is selected at random, what is the probability that it is:
An emerald or rectangular?
Not emerald or rectangular?
Both emerald and rectangular or neither?
These 25 gems have three different cuts - triangular, rectangular and octagonal. There are three colours of gems - amethysts (purple), emeralds (green) and rubies (red).
How many are triangular or emeralds, but not both?
How many are neither amethysts nor rectangular?
A small magazine asked people from different states to send in a vote on whether they supported Daylight Saving Time, the results are shown in the following figure:
What proportion of people voted "YES"?
What proportion of "NO" votes are from NSW?
Considering just the voters from NSW and ACT, what proportion of the votes are NSW "YES" votes?
In a group of 190 primary and senior students, 88 are primary students. The students fell into three categories of travel to school - by bus, car, or walking. 109 students get to school by bus, of which 52 are primary students. 50 students get to school by car, of which 20 are primary students
How many senior students catch the bus to school?
How many senior students are there in total?
How many senior students walk to school?
The employees of Koala Airlines were discussing where they should hold their end of year party. Of all of the employees:
How many people in total work at Koala Airlines?
If the restaurant isn't available, what proportion of the employees still have another option?