1.2.1 – Algebraic Expressions, PEMDAS

1. 1.2.1 – Algebraic Expressions, PEMDAS

2. You are familiar with equations…right? • Algebraic expressions are similar, but no equal signs (not solving for anything) • Combination of variables (letter to represent one or more numbers) and operations (+, -, etc.)

3. PEMDAS • We will encounter numerous types of algebraic expressions; some may be used to model real life scenarios or situations • 2x + 9 • 3(p – 7) + 10 • Before evaluating them, always must consider the order of operations • Gives us a guide on how to evaluate expressions correctly • PEMDAS

4. P = parenthesis • Always start on inner most set; work your way out • E = exponents • Always check signs • M = multiplication • D = division • A = addition • S = subtraction

5. Typically, after you substitute a value for a variable, most follow the order of operations to obtain the correct answer • Example. Evaluate 3(x + 1) – 2 if x = 4 • What do you do with the x = 4 part?

6. Example. Evaluate ((x + 2)/2) + 9 x 2 for x = 5

7. Example. Evaluate -2 ∕2 + 6 x 4 • Example. Evaluate 4 – 3(7 + 2)

8. Powers • With large scale multiplication, need a quick way to complete it • Multiplication is essentially fast hand addition • We use powers for repeated multiplication • Two parts; • Base = factor being multiplied • Exponent = numbers of times multiplied • Example. 7 x 7 x 7 = 73

9. With powers, always have to be careful about negative signs and parenthesis (use our knowledge of PEMDAS to help) • Example. Evaluate the following expressions • A) 23 • B) (-2)3 • C) -23

10. Example. Evaluate the following. • A) -162 • B) 63 • C) -25 • D) (-2)5

11. Not all exponents are the same! Always be aware of the negative sign • It’s like a “-1” • Using multiplication after exponents

12. Example. Evaluate -4p2 + 4p – 2 if p = 2. • Example. Evaluate 2x2 + 2x – 1 if x = -2.

13. Assignment • Pg. 12 • 15-19 odd, 21-27 odd, 33-39 odd, 48, 50, 54