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Good Afternoon! Our objective today will be to review all of the material we have covered in Unit 1. WARM-UP: Can you use mental math to solve these problems?

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Presentation on theme: "Good Afternoon! Our objective today will be to review all of the material we have covered in Unit 1. WARM-UP: Can you use mental math to solve these problems?"— Presentation transcript:

1 Good Afternoon! Our objective today will be to review all of the material we have covered in Unit 1. WARM-UP: Can you use mental math to solve these problems? Don't use your pencil! 1.)58 + 12 2.)638 - 328 3.)594 + 406 4.)702 - 212 = 70 = 310 = 1,000 = 490

2 A whole number is DIVISIBLE by another number if the remainder is 0. A whole number is EVEN if it is divisible by 2. A whole number is ODD if it is not divisible by 2. 1 2 3 4 5 6 7 8 9 12 14 15 18 19

3 DIVISIBILITY RULES A whole number is divisible by: 2if the ones digit is divisible by 2 3if the sum of the digits is divisible by 3 5if the ones digit is 0 or 5 10if the ones digit is 0 Can you give me some examples??

4 DIVISIBILITY RULES A whole number is divisible by: 4if the number formed by the last two digits is divisible by 4 6if the number is divisible by 2 AND 3 9if the sum of the digits is divisible by 9 Examples: The rules for 4, 6, and 9 are related to the rules for 2 and 3.

5 Let's practice some Long Division. 8 976 122 -8 17 -16 16 -16 0 Check 8

6 Remember that when two or more numbers are multiplied, each number is called a FACTOR of the product*. 1 x 6 = 6and2 x 3 = 6 1, 6, 2, and 3 are the factors of 6 * Remember that "product" is the answer to a multiplication problem.

7 COMPOSITE NUMBER - A number greater than 1 with more than two factors How to identify COMPOSITE NUMBERS and PRIME NUMBERS Can you think of a number that we would classify as COMPOSITE? What are its factors?

8 PRIME NUMBERS A Prime Number is a whole number that has exactly two factors.....1 and itself Can you think of a number like that?

9 A factor tree can be used to find the PRIME FACTORIZATION of a number. Write the number being factored at the top. Choose any pair of whole number factors. Continue to factor any number that is not prime. Except for the order, the prime factors are the same. 54 3 18 3 2 9 3 2 3 3 x x x 2 27 2 3 9 2 3 3 3 x x x x x x x x x THE PRIME FACTORIZATION OF 54 IS 2 x 3 x 3 x 3

10 Numbers expressed using Exponents are called Powers WordsExpressionsValue 2 5 3 2 10 3 2 to the fifth power 3 to the second power or 3 squared 10 to the third power or 10 cubed 2 x 2 x 2 x 2 x 2 3 x 3 10 x 10 x 10 32 9 1,000

11 Let's Practice... If we write 3 x 3 x 3 x 3 using an exponent, the base is 3 AND the exponent is 4 3 3 3 3 = 3 4 = 81...

12 We can also refer to writing 4 5 as a PRODUCT OF THE SAME FACTOR (Remember that a "Product" is the answer to a multiplication problem.) The Base is 4. The Exponent is 5. So 4 is a Factor 5 times. 4 5 = 4 x 4 x 4 x 4 x 4 = 1,024

13 Exponents can be used to write the Prime Factorization of a number. Example: 24 2 12 2 62 3 2 2 2 x x xx x x OR 2 3 x 3 (Start with the smallest prime factor)

14 A Numerical Expression is a combination of numbers and operations. Examples:4 + 3 * 5 2 2 + 6 ÷ 2 (10 * 8) - 7 1 2 3 4 5 6

15 Order of Operations 1. Parentheses 2. Exponents 3. Multiplication Division 4. Addition Subtraction Simplifying the expressions inside grouping symbols examples: (3+5) or (4*6) Find the value of all powers examples: 2 3 or 4 2 Perform multiplication or division in the order in which it occurs when reading the expression from left to right. Perform addition or subtraction in the order in which it occurs when reading the expression from left to right. P E M D A S

16 We can remember the Order of Operations as PEMDAS P E M D A S arentheses xponents ultiplication ivision ddition ubtraction "Please Excuse My Dear Aunt Sally"

17 P E M D A S arentheses xponents ultiplicatio n ivision ddition ubtraction whichever comes first "Please Excuse My Dear Aunt Sally" 20 ÷ 4 + 17 * (9 - 6) = Do the operations in Parentheses first. 20 ÷ 4 + 17 * 3 = 5 + 17 * 3 = 5 + 51 = 56 = There are no Exponents. Perform Multiplication or Division in the order in which they occur. The Division should be done first. Then perform the Multiplication. Finally perform the Addition.

18 3 + n is an "ALGEBRAIC EXPRESSION" Numbers Operations Variables Algebraic Expressions consist of Numbers, Operations, and Variables.

19 The VARIABLES in an expression can be replaced with any number. 3 + x If I substitute a 5 for the x........... I have 3 + 5 or 8 This is how we Evaluate (or find the value of) the Expression

20 Let's Evaluate the Algebraic Expression 16 + b if b = 25 We replace b with the number 25 16 + b = 16 + 25 = 41 The Value of the Algebraic Expression when b = 25 is 41

21 When solving math problems, it is often helpful to have an organized problem-solving plan. U P S nderstand lan olve

22 U To nderstand the problem, we need to -read the problem carefully -identify the facts that we know -identify what we need to know (WHAT IS THE QUESTION?) -determine if we have enough or too much information (Many students find it helpful to highlight or underline the important facts in the problem.)

23 Next, we must P lan -determine how the facts relate to each other -plan a strategy for solving the problem -estimate your answer Key words play an important role in determining which operations to use. Add plus sum total in all Subtract Multiply Divide minus difference less times product of quotient

24 And finally, we S olve the problem -use your plan to solve the problem -if your plan does not work, revise it or make a new plan -find the solution -make sure the answer makes sense and is close to your estimate Keep in mind that numbers do NOT always appear in a problem in the order in which they should be used to solve the problem.

25 Our formula for Area would be width length Area = length x width The Area of this rectangle would be 4 x 3 or 12

26 The rectangle with an area of 24 length is 8 width is 3 Using the formula, the area of this rectangle is Area = length x width Area = 8 x 4 Area = 32 square units

27 1.) How can I tell if a number is divisible by a.)2 b.)3 c.)4 d.)5 e.)6 f.)9 g.)10 Example : 2.) Use Long Division. 164 246 0

28 1.) What is a Prime Number? Can you give me some examples? 3.) Tell whether each number is Prime, Composite, or Neither. a.12Composite b.5Prime c.1Neither d. 41Prime 4.) Write the number 28 as the product of prime numbers. 5.) Use a factor tree to find the Prime Factorization of 60. 2.) What is a Composite Number? Can you give me some examples? A whole number that has exactly two unique factors, 1 and the number itself, is a prime number. Examples: 3, 5, 7, 11 A number greater than 1 with more than two factors, is a composite number. Examples: 6, 9, 12, 15 28 = 2 x 2 x 7 60 2 30 2152 3 2 2 x x x x x X 5 The Prime Factorization of 60 is 2 2 x 3 x5

29 1. Can you write this product using an exponent? 6 x 6 x 6 x 6 = 6 4 2. Can you find the value of this product? 4 x 4 x 4 = 4 3 = 64 3. Can you write this power as a product of the same factor? 3 6 = 3 x 3 x 3 x 3 x 3 x 3 4. Can you find the value of this power? 2 4 = 2 x 2 x 2 x 2 x 2 = 32 Let's see how well we know Powers and Exponents!

30 1.) Can you give me an example of a "Numerical Expression"? 2.)What do I mean by "Operations"? 3.)In what order do I perform the "Operations"? 4.)Find the value of each expression? a.)5 x 6 - (9 - 4) = 5x6-5 = 30-5 = 25 b.)16 ÷ 2 + 8 x 3 =8+8x3 = 8+24 = 32 c.)4 3 - 24 + 8 = 64-24+8 = 64-16 = 48 4 + 3 * 5 We “operate” on the numbers by Adding, Subtracting, Multiplying or Dividing PEMDAS

31 1.)In the Algebraic Expression 14n + 5 - 6m - what are the variables? n, m -what are the numbers? 14, 5, 6 -what are the operations? +, - Evaluate each expression if a = 4, b = 12, and c = 4. 2.)7c ÷ 4 + 5a = 7 x 4 ÷ 4 + 5 x 4 = 28 ÷ 4 + 20 = 7 + 20 = 27 3.)b 2 ÷ ( 3 X c) = 12 2 ÷ (3 x 4) = 12 2 ÷ 12 = 144 ÷ 12 = 12

32 1.) In 1990, the population of Sacramento, CA was 370,000. In 2000, the population was 407,000. How much did the population increase? 2.)The Smith family wants to purchase a television set and pay for it in four equal payments of $180. What is the cost of the television set? 3.)Complete the pattern: 6, 11, 16, 21, ___, ___, ___ 26 31 36 Problem Solving Increase in population = Population in 2000 – Population in 1990 = 407,000 – 370,000 = 37,000 Cost of TV set = 4 x 180 = $ 720

33 1.) What is the formula we use to find the area of a rectangle? 2.)How would we find the area of a square? 3.)Find the area of each rectangle. 19 ft 11 ft 6 cm 27 cm 4.)Find the width of this rectangle. 3360 yd 2 84 yd ? yd Area Problems The area A of a rectangle is the product of the length l and width w. A = l x w A = l 2 A = 19 x 11 = 209 A = 6 x 27 = 162 A = l x w 3360 = 84 x w W = 3360/84 = 40 yd

34 Congratulations! You really understand what we have covered in the first unit!

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