Copyright © Swun Math Grade 8 Unit 2 Lesson 5 C TEInput/Model
(Teacher Presents)
Directions: Write the expanded and standard form.
1.
Power Expanded Standard24
23
22
21
20
Solution:- Begin by recording the expanded form and standard
form for the powers of 2^4 , 2^3 , 2^2 , and 2^1 (not 2^0 ). - Discuss the decreasing pattern in the standard form
column. Each value decreases by a factor of 2, which is
equivalent to dividing by two. - Have students predict what the value of 2^0 is equivalent
to. - Using the pattern established, determine that since
21 = 2, 2 will be divided by the base to yield the value of
20. - 2 ÷ 2 = 1; Therefore, 2^0 = 1
Power Expanded Standard(^24 2) ⋅ 2 ⋅ 2 ⋅ 2 16
23 2 ⋅ 2 ⋅ 2 8
22 2 ⋅ (^2 4)
(^21 2 2)
(^20 1 1)
2.
Power Expanded Standard
23 2 ⋅^2 ⋅^2 8
22 2 ⋅ 2 4
21 2 2
20
2 −1 (^)
2 −2
2 −3
Solution:
- Continue to build the base 2 chart.
- Review the pattern found in input 1. Remind students
that each value is divided by the “base,” in this case 2. - Note the chart is partially filled in; continue building
the chart beginning with 2^0 (to reinforce that 2^0 = 1). - Using the established pattern, determine that since
20 = 1, 1 will be divided by the base 2 to yield the value of
2 -1. - 12 ÷=^12. Therefore, 2 −^1 =^12
- Continue the pattern to find 2 −2 and 2 −3.
(^112)
24
÷=. Therefore 22 1
4
−=
(^112)
48
÷=. Therefore 23 1
8
−=
- Note: students may need to be reminded how to divide
fractions by a whole number.
Power Expanded Standard
23 2 ⋅^2 ⋅^2 8
22 2 ⋅^2 4
21 2 2
20 1 1
2 −^1 1
21
22 −^2 1
2 ⋅1
21
42 −^3 1
2⋅
1
2
⋅
1
2
1
81
4 ÷ 2^1
2 ÷ 2^(^1) ÷ 2