If students seem to have trouble making sense of how the expression represents the change in when increases by 1, or how the expression has a value of 2, consider asking them to reason about the expression as if and were numerical expressions (say, 3 and ).

Students may have trouble with the first part of the last question (about how the values of change whenever increases by 4). Ask them to try several pairs of values (like 1 and 5, 3 and 7, and so on) to see if there is a pattern. Then prompt them to refer to how an increase of 1 was expressed algebraically and rearranged in an earlier question.

Watch for students who overlook the fact that the change in the value of must be 1 if the change in the value of is the same as the slope.

Invite students to share their responses to the last two questions. Relate the algebraic work done in this activity to what students have learned about slope and similar triangles in grade 8. Discuss questions such as:

• "Can you find an example where the output of does not increase by 2 when goes up by 1? Explain your reasoning?" (No. The graph of , a line, has a particular slope, an amount by which the output value changes when changes by 1. So any two points on the line whose -values are 1 unit apart will have -values that differ by the value of the slope.)
• "Can you find an example where the input increases by 4, but the output does not increase by 8? Explain your reasoning." (No. If increasing the input by 1 always changes the output by 2, then increasing by 1 four times always changes the output by 4 times the slope, or . Consider showing a graph.)
• "How does the expression show that when changes by 4, the output changes by 8?" (The is the output of for . The is the output of for . Subtracting the two gives us: , which is 8.)

Emphasize that in any linear function, when increases by an equal amount, the output also changes by an equal amount.

To further highlight that this observation is true for any linear function, and if time permits, consider showing a diagram of an abstract case of a linear function with slope .

When the input changes by , the output changes by . (The triangles drawn are similar triangles, so the ratios of their corresponding sides are equivalent.)

After the previous activity on linear relationships, students may initially look for something similar here. They should notice that the differences in consecutive rows of the table are not the same. Encourage them to look for other patterns.

Invite students to share what they noticed about values of for consecutive whole numbers. If not mentioned by students, point out the pattern that as the -value increases by 1, the output changes by a factor of 3. For example: is 3 times ,  is 3 times , and so on.

Discuss questions such as:

• "What do we have when dividing the outputs for two consecutive -values, such as or ?" (A quotient of 3)
• "How are the two outputs  and  related?" ( is times 3, or when we divide  by , the quotient is 3.)
• "How can we use the rules of exponents to show that this is always the case?" (, so . When dividing two powers with the same bases, we can subtract the exponents. Dividing the two, we have , which is 3.)
• "Does this reasoning work if the function has a different initial value, say given by ?" (Yes, still equals 3.)
• "What happens to the output of  when increases by 2?" ( increases by a factor of 3 twice, or .) What about when it increases by 5? ( increases by a factor of 3 five times.)
• "What happens to the output when increases by ?" ( increases by a factor of 3 times, or . The rule of exponents can help us here as well. If we divide by , we have: .)

Consider using a graph of to help students visualize the growth of over equal intervals of . The successive quotients of the outputs are always 3.