1.02 Venn diagrams and sets

Describe the set "not A" using words, then express it using set notation.

The keyword "not" indicates that we want to take the negation of A. In order to think about this, it might be useful to first list out the elements of A.

The set A is the set of "quadrilaterals" from the universal set S. So we haveA = \left\{\text{square, rhombus, parallelogram, trapezoid, rectangle}\right\}

The negation of A is the set of all elements of S that are not in A. We can describe this as "the set of shapes which do not have exactly four sides". In set notation, this will beA\rq = \left\{\text{triangle, hexagon, circle}\right\}

This Venn diagram represents the universal set with A\rq highlighted.

Describe the set "B or not A" using words, then express it using set notation.

We determined the set "not A" in the first part of this question. The keyword "or" indicates that we want to take the union of this with set B. This means we need to include everything that is in set B as well as everything in "not A". This time it might be useful to list out the elements of B.

The set B is the set of "words beginning with the letter t" from the universal set S. So we have B = \left\{\text{triangle, trapezoid}\right\}.

A\rq=\left\{\text{triangle, hexagon, circle}\right\} as we found in part (a).

The union of two sets will include any element that is in at least one of those sets. We can desribe the set "B or not A" as "the set of shapes that begin with the letter t or are not quadrilaterals." In set notation, this will beB \cup A\rq = \left\{\text{triangle, hexagon, circle, trapezoid}\right\}

Taking the negation of A:

and combining it with set B:

We get the Venn diagram:

Notice that the element "triangle" appears in both B and A\rq. This element is still included in the union, since appearing in both sets means that it appears in at least one of the two sets.

We only need to list it once; we do not need to write the element twice in the union even though it appears in both sets.

Identify the elements in the universal set.

The universal set contains all the possible elements that can appear in any set in the context. For a Venn diagram, this includes any element within the outer rectangle (whether or not it is inside any circles).

In this case, every number from 1 to 20 appears exactly once, so the sample space isS=\left\{1, 2, 3, \ldots, 19, 20\right\}

In any universal set, the sets A and B are subsets of the universal set. Using geometric notation, we can write A\subseteq S (A is a subset of S) and B\subseteq S (B is a subset of S).

There are many other subsets in a universal set such as A\rq and A\cup A\rq and A\cap B, to name a few.

Indicate the region which represents A \cap B\rq on the diagram, and determine the elements of this set.

B\rq is the negation of B which is the region outside of circle B.

We then want to take the intersection of that with set A.

The intersection will be the region where the shading overlaps.

We want to include everything that is inside circle A but not inside circle B:

In set notation, this isA \cap B\rq = \left\{1, 4, 16\right\}

In part (a), we found that the universal set for this Venn diagram is "all integers from 1 to 20 inclusive".

Within this universal set, we can describe set A as "the set of square numbers", and we can describe set B as "integers between 6 and 12 inclusive".

Within the universal set, we could also describe the set A \cap B\rq as "square numbers that are not between 6 and 12" The set A \cap B\rq is a subset of the universal set.

Write the set notation that represents the set \{6, \,7, \,8, \,10 , \,11, \,12\}.

We can shade the area of the Venn diagram where these numberse are found, describe the set in words, and then use set notation to describe the set.

We could also say A\rq \cap B.

How many of the students skipped breakfast because of exactly one reason?

Add the number of students that are in the "Not hungry" circle or in the "Too busy" circle but not in both.

Let N represent the set of students who skipped breakfast because they were not hungry. Let B represent the set of students who were too busy.

Use set notation to describe the region which contains all students who skipped breakfast.

Set notation means to use symbols like \cap, \cup, and \rq.

The students that skipped breakfast are contained within the two circles.

This is the union or N \cup B.

Since there isn't a number outside of the two circles, we can assume that there aren't any students who skipped breakfast for another reason.

Use set notation to describe the region which contains the students who only skipped breakfast because they were too busy.

The word "only" means excluding other options. We can rewrite this in words and then write using set notation.

Since we want the students who only said "too busy," we should not include the intersection.

We can think of this as those who are in B, but not in N.

This is the set B \cap N\rq.

This subset would have 13 students in it. While the subset B of "all students who gave too busy as a reason" would have 24 students in it.

Construct a Venn diagram that represents the given information.

There are two sets: students who study math and students who study science. We are also considering their negations: students who do not study math and students who do not study science.

The two sets will represent the two circles in the Venn diagram.

We know that 58 students study both math and science. This is the intersection of the sets, so we can put this number in the center section where the two circles overlap:

We also know that 70 students are studying math, but this includes the 58 that are studying science. So there are 70-58=12 that are studying math, but not science. These students belong in the left circle but not the right circle:

Next, we have also been told that 23 students are not studying either of these subjects. This number should be in the rectangle that represents the whole set, but not in either of the circles:

To complete the Venn diagram, we need to determine how many students are studying only science. We can use the fact that there are 100 students in total to find how many study only science. Since all four regions sum to 100, we can subtract the three that are filled in:100-23 - 12 - 58 = 7

This number goes in the right side of the circle for science only and completes the Venn diagram.

One student is chosen at random. Determine the probability of randomly selecting a student that is studying science.

To calculate probability, we can use that: \text{Probability of an event}=\dfrac{\text{Number of favorable outcomes}}{\text{Number of possible outcomes}}

There are 100 students in total, so when calculating probability this will the the number of possible outcomes. We need to find the number of favorable outcomes.

This shaded region shows all students who are studying science, the favorable outcome. The number of students in this circle is 58+7=65.

The probability of a randomly selecting a student studying science is 65\%.

Let M represent students who study Math and let S represent students who study Science.

One student is chosen at random. Determine the probability of randomly selecting a student in the set \left(M\cup S\right)\rq.

We can translate this set notation into words and then use the Venn diagram to find the number of favorable outcomes.

\left(M\cup S\right)\rq is the complement or negation of M\cup S, which is the union of the two sets.

M\cup S can be shown by shading the union and represents all students who study math or science.

\left(M\cup S\right)\rq can be shown by shading everything outside of the union and represents all students who study neither math nor science.

There are 23 students in the set \left(M\cup S\right)\rq.

The probability of a randomly selecting a student in \left(M\cup S\right)\rq who is not studying math nor science is 23\%.

Notice that:

This means that the probability of a set and its complement is 1 or 100\%. These two sets make up the universal set, so the favorable outcomes are the same as the possible outcomes.

Explain why P\left(M\right)+P\left(M\rq\right)=1.

Remember that M is the set of students who are studying math and M\rq is the set of students who are not studying math.

A student in the universal set must be in M, studying math, or in M\rq, not studying math. There are no other possibilities. For this particular case:

We can make a connection to logic notation and the idea that p \lor \sim p is always true. This is because if p is true then one of the whole statement is true and if p is false, then \sim p is true, so the whole statement is true.