Lesson 1

Inputs and Outputs

Let’s make some rules.

1.1: Dividing by 0

Study the statements carefully. 

  • \(12 \div 3 = 4\) because \(12=4 \boldcdot 3\)
  • \(6 \div 0 = x\) because \(6=x \boldcdot 0\)

What value can be used in place of \(x\) to create true statements? Explain your reasoning.

1.2: Guess My Rule

Try to figure out what's happening in the “black box.”

Note: You must hit enter or return before you click GO. 



If you have a rule, you can apply it several times in a row and look for patterns. For example, if your rule was "add 1" and you started with the number 5, then by applying that rule over and over again you would get 6, then 7, then 8, etc., forming an obvious pattern.

Try this for the rules in this activity. That is, start with the number 5 and apply each of the rules a few times. Do you notice any patterns? What if you start with a different starting number?

1.3: Making Tables

For each input-output rule, fill in the table with the outputs that go with a given input. Add two more input-output pairs to the table.

  1. Input-output rule diagram. Input, fraction 3 over 4, right arrow, rule is, add 1 then multiply by 4, right arrow, ouput 7.
    input output
    \(\frac34\) 7
    2.35
    42
  2. Input-output rule diagram. Input, fraction 3 over 4, right arrow, rule is, name the digit in the tenths place, right arrow, output, 7.
    input output
    \(\frac34\) 7
    2.35
    42
  3. Input-output rule diagram. Input, fraction 3 over 4, right arrow, rule is, write 7, right arrow, output 7.
    input output
    \(\frac34\) 7
    2.35
    42

    Pause here until your teacher directs you to the last rule.

  4. Function rule diagram.
    input output
    \(\frac37\) \(\frac73\)
    1
    0

 

Summary

Generic function rule diagram.

An input-output rule is a rule that takes an allowable input and uses it to determine an output. For example, the following diagram represents the rule that takes any number as an input, then adds 1, multiplies by 4, and gives the resulting number as an output.

Input-output rule diagram. Input, fraction 3 over 4, right arrow, rule is, add 1 then multiply by 4, right arrow, ouput 7.

In some cases, not all inputs are allowable, and the rule must specify which inputs will work. For example, this rule is fine when the input is 2:

An input-output rule diagram. Input, 2, right arrow, rule is, divide 6 by 3 more than the input, right arrow, output, 1 point 2.

But if the input is -3, we would need to evaluate \(6 \div 0\) to get the output.

An input-output rule diagram. Input, negative 3, right arrow, rule is, divide 6 by 3 more than the input, right arrow, no output listed.

So, when we say that the rule is “divide 6 by 3 more than the input,” we also have to say that -3 is not allowed as an input.