1. Square Units and Second Power, then Square Roots
STANDARDS
Square Units and Second Power,
then Square Roots
Cubic Units and Cube Numbers
In between what whole numbers
is the square root?
A pattern of Powers of 10’s
Scientific Notation
Exponent Properties
END SHOW
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2. GRADE 7: Number Sense GRADE 8: Algebra
2.1 Understand negative whole-number exponents. Multiply and divide expressions involving exponents with a common base.
2.4 Use the inverse relationship between raising to a power and extracting the root of a perfect square; for an integer that is not square, determine without a calculator the two integers between which its square root lies and explain why.
2.1 Entender exponentes enteros negativos. Multiplicar y dividir expresiones que involucran exponentes.
2.4 Usar la relación inversa entre elevar una potencia y sacar su raíz cuadrada perfecta; para un entero que no es cuadrado, determinar sin calculadora los dos enteros entre los cuales se encuentra dicha raíz y explicar porqué.
GRADE 8: Algebra
2.0 Students understand and use such operations as taking the opposite, finding the reciprocal, and taking a root. They understand and use the rules of exponents.
2.1 Los estudiantes entienden y usan operaciones como tomar el opuesto, encontrar el reciproco, y sacar la raíz. Ellos entienden y usan las reglas de los exponentes.
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3. What is the area of the square?
STANDARDS 1 1 1
What is the area of the square? 1 2
1x1 =
= 1
What is the length of the side? 1
= 1
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4. What is the area of the square?
STANDARDS 4 3 2 1 2 2
What is the area of the square? 2
2x2 =
= 4
What is the length of the side? 4
= 2
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5. What is the area of the square?
STANDARDS 9 8 7 6 5 4 3 2 1 3 3
What is the area of the square? 3 2
3x3 = =9
What is the length of the side? 9
= 3
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6. What is the area of the square?
STANDARDS 16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1 4 4
What is the area of the square? 4 2
4x4 =
= 16
What is the length of the side? 16
= 4
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7. What is the area of the square?
STANDARDS
What is the area of the square? 5 2 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1
5x5 =
= 25
The SQUARE OF A NUMBER is the total of square units used to form a larger square. 5
What is the length of the side? 5 25
= 5
The SQUARE ROOT OF A NUMBER is the opposite of the square. It is when you find the lenght of the side in a square with a given number of square units.
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8. THE SQUARE ROOT OF A NUMBER STANDARDS
THE SQUARE OF A NUMBER
THE SQUARE ROOT OF A NUMBER
STANDARDS
3x3 = 3 2 9 8 7 6 5 4 1 =9
= 3
2x2 = 2 4 3 1
= 4
= 2 1
1x1 = 2
= 1
4x4 = 4 2 16 15 14 13 12 11 10 9 8 7 6 5 3 1
= 16
= 4
1x1 = 5 2 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 4 3 1
= 25
= 5
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9. SUMMARIZING: STANDARDS 3 32
We say 3 SQUARE or THREE TO THE SECOND POWER.
3x3 = =9
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10. SUMMARIZING: STANDARDS 5 We say 5 SQUARE or FIVE TO THE SECOND POWER.25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 4 3 2 1 5 2
We say 5 SQUARE or FIVE TO THE SECOND POWER.
5x5 =
= 25
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11. What means 7 square? Why? STANDARDS 7x7 = 7 = 49 7 49 square units. 2
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12. What means 13 square? Why? STANDARDS 13x13 = 13 = 169 132
Why?
13x13 =
= 169 13
169 square units.
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13. What is the volume for these cubes?3 1 2 1 1 2 2 3 1 3 3
1x1x1 =
= 1 2 3
2x2x2 =
= 8 3
3x3x3 =
= 27
1 CUBED
2 CUBED
3 CUBED 4 4 3
4x4x4 =
=64 4
4 CUBED 4
STANDARDS
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14. Three to the THIRD POWER
What is 3 cubed? 3
3x3x3 =
= 27 3
Three to the THIRD POWER 3 OR 3
That is 27 cubic units!
STANDARDS
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15. What is 4 cubed? 4 4x4x4 = =64 4 4 Four to the THIRD POWER 4 OR3
4x4x4 =
=64 4 4
Four to the THIRD POWER 4 OR
That is 64 cubic units!
STANDARDS
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16. Which whole numbers is between? 3
STANDARDS
Which whole numbers is between? 3
What is the largest perfect square that can be made with 3 square units?
Adding 1 more:
Taking out 2: 3 2 1 2 4 3 1 1
There is no possible perfect square with 3 square units. 1 2 2
1x1 =
= 1
2x2 =
= 4 4 1
= 2
= 1
We either take out 2 or add 1. 1 4
The square root of 3 is between 1 and 2. 4 3 2 1 3 3
1.73
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17. Which whole numbers is between? 8
STANDARDS
Which whole numbers is between? 8
What is the largest perfect square that can be made with 8 square units? 3
Adding 1 more:
Taking out 3: 2
There is no possible perfect square with 8 square units. 2
2x2 =
= 4 3 2
3x3 = =9 4
= 2
We either take out 3 or add 1. 9
= 3 4 9
The square root of 8 is between 3 and 4. 4 3 2 1 8 8
2.83
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18. Which whole numbers is between? 12
STANDARDS
Which whole numbers is between? 12
What is the largest perfect square that can be made with 12 square units?
Adding 4 more:
Taking out 3: 4 3
There is no possible perfect square with 12 square units. 3 2 4 2
3x3 = =9
4x4 =
We either take out 3 or add 4.
= 16 9
= 3 16
= 4 9 16
The square root of 12 is between 3 and 4. 4 3 2 1 12 12
3.46
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19. Can you continue the pattern?
STANDARDS
Finding a pattern: 10 4
10x10x10x10 = 10 2 10 3
10x10 =
10x10x10 =
10x1000
100
10x100
10000
1000 10 5
100 square units. 10
10x10x10x10x10 = 10
1000 cubic units.
10x10000
100000 10 6
10x10x10x10x10x10 =
10x100000
Can you continue the pattern?
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20. ONE MILLIONS HUNDRED THOUSANDS TEN THOUSANDS ONE THOUSANDS HUNDREDS
TENS
ONES
100000
10000
1000
100 10 1
10x10x10x10x10x10
10x10x10x10x10
10x10x10x10
10x10x10
10x100000
10x10000
10x1000
10x100
10x10
10x1 10 6 10 5 10 4 10 3 10 2 10 1 10
Then:
500 = 5 x
100
8x10 6
=8x
=5x10 2
and =
3x10 5
=3x100000
7000 = 7 x
1000
=7x10 3
=300000
9x10
=9x1 =9
STANDARDS
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21. Write in scientific notation: 1,750,000
10x10 10 2
100
10x10x10 3
1000
10x10x10x10 4
10000
10x10x10x10x10 5
100000
10x10x10x10x10x10 6
10x100
10x1000
10x10000
10x100000
10x1 1
ONES
TENS
HUNDREDS
ONE THOUSANDS
TEN THOUSANDS
HUNDRED THOUSANDS
ONE MILLIONS 1 7 5
Then: 10 6 x
1,750,000 = millions
= 1.750
This is the number in scientific notation! 10 6 x OR
1 ,7 5 0 ,
= 1.750
STANDARDS
6 places to the left
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22. Write in Scientific Notation the following numbers:
1,320
11.45 10 3 x 10 3 x
1,320
= 1.32
11.45 10 3 x 10 4 x
3 places to the left
= 1.145
1 place to the left
37,900
237.6 10 5 x 10 4 x
37,900
= 3.79
237.6 10 5 x 10 7 x
= 2.376
4 places to the left
2 places to the left
55.91 10 1 x
55.91
= 5.591
1 place to the left
STANDARDS
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23. Write in Standard Notation the following numbers:
2.85 10 3 x
= 2.85
1000
8.093 10 1 x
= 8.093 10
= 2,851.
= 80.93
= 2,851
5.71 10 6 x
27.9 10 2 x
= 5.71
= 27.9
100
= 5,710,000.
= 2790.
= 5,710,000
= 2,790
STANDARDS
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24. Observe the following pattern:
ONE THOUSANDS
TEN THOUSANDTHS
TENS
HUNDREDTHS
HUNDREDS
THOUSANDTHS
TENTHS
ONES 1 10 1
100 1
1000 1
10000
1000
100 10 1
10x 1 10
10x 1
100
10x 1
1000
10x 1
10000
10x100
10x10
10x1
10x 1
100000 10 3 10 2 10 1 10 10 -1 10 -2 10 -3 10 -4 .1
.01
.001
.0001
What pattern do you see emerging in the exponents?
They decrease from left to right!
STANDARDS
What about the decimals?
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25. STANDARD 1.2
How many hundredths does the unit have?
100 99 98 97 96 95 94 93 92 91 90 89 88 87 86 85 84 83 82 81 80 79 78 77 76 75 74 73 72 71 70 69 68 67 66 65 64 63 62 61 60 59 58 57 56 55 54 53 52 51 50 49 48 47 46 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9 8 7 6 5 4 3 2 1 =
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26. How many parts does the tenth have?
STANDARD 1.2
How many parts does the tenth have? 10 9 8 7 6 5 4 3 2 1 =
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27. Penny STANDARD 1.2 1 cent A hundredth of a dollar. 1¢ $1 =$ .01 100
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28. Dime STANDARD 1.2 10 cents 10¢ A tenth of a dollar $1 =$ .1 10
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29. Dollar STANDARD 1.2 = Name = 1 dollar Worth = $1.00 Worth = 10 dimes
Word = 100 cents
Worth = 100 ¢
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30. Hundredths Tenths Units or Ones STANDARD 1.2 DECIMAL POINT
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31. Write in Scientific Notation the following numbers:1
10000 x 10 -4 x
= 3.45
= 3.45 OR
4 places to the right 10 -4 x
= 3.45 1
1000 x 10 -3 x
.00675
= 6.75
.00675
= 6.75 OR
3 places to the right 10 -3 x
= 6.75
STANDARDS
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32. Write in Standard Notation the following numbers:
4.35 10 -4 x 1
10000 x
4.35 10 -4 x
= 4.35 OR
000 =
4 places to the left
= 4.35
10000 =
7.26 10 -7 x 1 x
= 7.26
7.26 10 -7 x OR
000000 =
7 places to the left
= 7.26 =
40.1 10 -6 x 1 x
= 40.1
40.1 10 -6 x OR
0000 =
6 places to the left
= 40.1 =
STANDARDS
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33. Product of Powers: Do you remember? STANDARDS 10 = 10x10x10x10x10x106 =
10x10x10x10x10x10
10x100000 = =
Let’s look for a pattern:
Exponential Form
Standard Numbers
What is then? 10 1 x 10 2 =
10x10
=100 7 1 x 7 1 Z 1 x Z 1 Z 2 = 7 2 = 10 1 2 x 10 3 =
10x100 7 1 x 7 2 7 3 = Z 1 x Z 2 Z 3 =
=1000 10 1 3 x 10 4 = 7 1 x 7 3 7 4 = Z 1 x Z 3 Z 4 =
10x1000
=10000 10 1 4 x 10 5 = 7 1 x 7 4 7 5 = Z 1 x Z 4 Z 5 =
10x10000
=100000 10 6 = 7 1 x 7 5 7 6 = Z 1 x Z 5 Z 6 = 10 1 5 x
10x100000 =
Product of Powers:
For any real number a and integers m and n a m n
= a
m+n
Write the expressions as a single power of the base:
x x 2 5
= x
2+5
y y y 2 5 7
= y
2+5+7
= x 7
= y 14
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34. Let’s look for a pattern: then
STANDARDS 1
10x10x10x10x10x10 10
1x10x10x10x10x10 1 = If
=100000
Let’s look for a pattern:
then
Exponential Form
Standard Numbers
What is happening? 10
=100000 10 6 1 10 5 = 10 6 1 10
6–1 = 10 5 =
100000 10
=10000 10 5 1 10 4 =
Quotient of powers:
For any real number a, except a=0, and integers m and n
10000 10
=1000 10 4 1 10 3 =
1000 10
=100 10 3 1 10 2 = a m n
= a
m-n
100 10
=10 10 2 1 10 1 =
Simplify the quotients: 10 =1 10 1 10 = x 9 3 y 7 6
= x
9–3 =y
7–6
= x 6
= y
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35. STANDARDS Exponential Form Standard Numbers 10 =1
Let’s concentrate in this part: If
Exponential Form
Standard Numbers 10 =1 10 1 10
1–1 = 10 =
then
Power to the zero: a
= 1
UNDEFINED!
(4y)
= 1
(-3kp)
= 1
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36. Let’s look for a pattern: then
STANDARDS 1
10x10x10x10x10x10 10
1x10x10x10x10x10 1 =
100000 1 = If
Let’s look for a pattern:
then
Exponential Form
Standard Numbers
Power with Negative Exponents: 10
100000 1 = 10 1 6 10
1–6 = 10 -5 =
For any real number a, and any integer n, where a = 0
100000 10
10000 1 = 10 1 5 10 -4 = 10
1–5 =
a = -n n 1 a
10000 10
1000 1 = 10 1 4 10
1–4 = 10 -3 =
1000 10
100 1 = 10 1 3 10 -2 = 10
1–3 =
a = -3 3 1 a
x = -5 5 1 x
100 10 10 1 = 10 1 2 10
1–2 = 10 -1 =
y = -9 9 1 y
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