We know that P is the set of odd numbers between 2 and 16. This means that the smallest number in the set will be 3, and the largest will be 15.

So we can write P as P = \left\{3, 5, 7, 9, 11, 13, 15\right\}

Since P \cap Q we know that this is the intersection of P and Q. That is, P \cap Q contains all of the elements that belong to both P and Q.

We can see that the odd elements of Q are 1, 3, 5, 13, and 21.

Of these, 3, 5, and 13 lie between 2 and 16 and are therefore also elements of P.

So we have thatP \cap Q = \left\{3, 5, 13\right\}

The keyword "not" indicates that we want to take the complement 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 "shapes with four sides" from the sample space S. So we haveA = \left\{\text{square, rhombus, parallelogram, trapezoid, rectangle}\right\}

The complement 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 four sides". In set notation, this will beA' = \left\{\text{triangle, hexagon, circle}\right\}

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 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 sample space S. So we haveB = \left\{\text{triangle, trapezoid}\right\}

The union of two sets will include any element that is in at least one of those sets. So we can describe the set "B or not A as "the set of shapes which do not have four sides or start with the letter t". In set notation, this will beB \cup A' = \left\{\text{triangle, hexagon, circle, trapezoid}\right\}

Notice that the element "triangle" appears in both B and A'. 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, however - we don't need to write the element twice in the union even though it appears in both sets.

The sample space 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 is\left\{1, 2, 3, \ldots, 19, 20\right\}

B' is the complement of B, i.e. the region outside of circle B. We then want to take the intersection of that with set A.

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

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

In the previous part we found that the sample space for this Venn diagram is "all integers from 1 to 20 inclusive".

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

So within the sample space, we could also describe the set A \cap B' as "square numbers that are not between 6 and 12".