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In this section we cover how to actual write sets and specifically domains, codomains,
and ranges.
Lecture Video
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Text and details
Notating Sets: How we write domains, codomains, and ranges precisely.
An important piece of mathematical language is properly writing sets, and there are
a number of ways to do this. One such way, which we will outline below, is the
so-called ‘set-builder notation’. This is essentially building a set by listing the
properties that each member (or “element”) of the set has. Consider the following
statement: The above statement has a number of very important symbols. ( I
will describe them more formally, but then revise what the above set says
in English to try and clarify. You may need/want to read this part a few
times. If you don’t understand set notation you have a near-zero chance of
passing this - or any future mathematics - course, so take the time now as
it will be worth it in the long run. ) The braces on either end signal the
beginning and end for the set. Essentially the braces are saying ‘this is a
set/collection of things’. The variable in the first part (before the colon) is a
generic placeholder for something in the set - often called a “dummy variable”.
The colon is a delimiter that transitions from the notation for the generic
representative to the section outlining properties of elements of the set (the colon is
usually translated as “such that”). Finally, the content after the colon is a
(comma-separated) list of traits that something must have in order to be in the
set.
That may seem pretty dense and hard to understand, but it helps to translate the set
that we wrote into English. That set, if you translate it literally, says: ‘This is the set
of things (which we will call for a second), such that each of those is a drink in the
vending machine’. In a more human translation you would say that ‘this is the set of
drinks in the vending machine’.
There are a number of commonly used symbols and notations that we list next with
description.
:
This symbol is the set of all natural numbers. Specifically it is the numbers
, ie all strictly positive integers. Note that, in some courses, the natural
numbers may include zero, but not in this course (this is, weirdly, a rather
hotly debated topic among some mathematicians).
:
This symbol is the set of all integers. Specifically it is the numbers . These
are all the positive and negative whole numbers, along with zero.
:
This symbol is the set of all rational numbers. Specifically, all fractions that
have integers for their numerator and denominator.
:
This symbol is the set of all real numbers. Specifically, it includes all numbers
that do not include the imaginary unit .
:
This symbol is the set of all complex-valued numbers. Specifically it includes
all real numbers and all products of any real number with the imaginary
unit .
:
This symbol is translated as “in” or “is an element/member of”. For example,
you could see , which should be read as “ is an element of the natural
numbers.
:
This symbol is the “empty set”. Specifically it is the set with nothing in it;
which is different from “”.
Which of the following would be the best set-builder notation to describe
“the set of all positive real numbers”?
all positive real numbers.
Which of the following is the English-translation of the following: ?
The set of
everything between negative thirty and fourty five.The set of integers (strictly)
between negative thirty and fourty five.The set of complex numbers (strictly)
between negative thirty and forty five.Dear God Why? Wait no... the set of Dear
God Why?
Which of the following symbols would we use to represent “all real numbers”?
Which of the following symbols would we use to represent “all integers”?