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1.3 – AXIOMS FOR THE REAL NUMBERS. Goals  SWBAT apply basic properties of real numbers  SWBAT simplify algebraic expressions.

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Presentation on theme: "1.3 – AXIOMS FOR THE REAL NUMBERS. Goals  SWBAT apply basic properties of real numbers  SWBAT simplify algebraic expressions."— Presentation transcript:

1 1.3 – AXIOMS FOR THE REAL NUMBERS

2 Goals  SWBAT apply basic properties of real numbers  SWBAT simplify algebraic expressions

3  An axiom (or postulate) is a statement that is assumed to be true.  The table on the next slide shows axioms of multiplication and addition in the real number system. Note: the parentheses are used to indicate order of operations

4

5  Substitution Principle:  Since a + b and ab are unique, changing the numeral by which a number is named in an expression involving sums or products does not change the value of the expression.  Example: and  Use the substitution principle with the statement above.

6 Identity Elements In the real number system: The identity for addition is: 0 The identity for multiplication is: 1

7 Inverses For the real number a, The additive inverse of a is: - a The multiplicative inverse of a is:

8 Axioms of Equality  Let a, b, and c be and elements of.  Reflexive Property:  Symmetric Property:  Transitive Property:

9 1.4 – THEOREMS AND PROOF: ADDITION

10  The following are basic theorems of addition. Unlike an axiom, a theorem can be proven.

11 Theorem  For all real numbers b and c,

12 Theorem  For all real numbers a, b, and c,  If, then

13 Theorem  For all real numbers a, b, and c, if or then

14 Property of the Opposite of a Sum  For all real numbers a and b,  That is, the opposite of a sum of real numbers is the sum of the opposites of the numbers.

15 Cancellation Property of Additive Inverses  For all real numbers a,

16 Simplify 1. 2.

17 1.5 – Properties of Products

18  Multiplication properties are similar to addition properties.  The following are theorems of multiplication.

19 Theorem  For all real numbers b and all nonzero real numbers c,

20 Cancellation Property of Multiplication  For all real numbers a and b and all nonzero real numbers c, if or,then

21 Properties of the Reciprocal of a Product  For all nonzero real numbers a and b,  That is, the reciprocal of a product of nonzero real numbers is the product of the reciprocals of the numbers.

22 Multiplicative Property of Zero  For all real numbers a, and

23 Multiplicative Property of -1  For all real numbers a, and

24 Properties of Opposites of Products  For all real numbers a and b,

25 Explain why the statement is true. 1. A product of several nonzero real numbers of which an even number are negative is a positive number.

26 Explain why the statement is true. 2. A product of several nonzero real numbers of which an odd number are negative is a negative number.

27 Simplify 3.

28 Simplify 8.

29 Simplify the rest of the questions and then we will go over them together!

30 1.6 – Properties of Differences

31 Definition  The difference between a and b,, is defined in terms of addition.

32 Definition of Subtraction  For all real numbers a and b,

33  Subtraction is not commutative. Example:  Subtraction is not associative. Example:

34 Simplify the Expression 1.

35 Simplify the expression 2.

36 Your Turn! Try numbers 3 and 4 and we will check them together!

37 Evaluate each expression for the value of the variable. 5.

38 Evaluate each expression for the value of the variable. 6.


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