PRESENTATION 12 Basic Algebra

1. PRESENTATION 12 Basic Algebra

2. BASIC ALGEBRA DEFINITIONS • A term of an algebraic expression is that part of the expression that is separated from the rest by a plus or minus sign • A factor is one of two or more literal and/or numerical values of a term that are multiplied • A numerical coefficient is the number factor of a term • The letter factors of a term are the literal factors

3. BASIC ALGEBRA DEFINITIONS • Like terms are terms that have identical literal factors • Unlike terms are terms that have different literal factors or exponents

4. ADDITION • Only like terms can be added. The addition of unlike terms can only be indicated • Procedure for adding like terms: • Add the numerical coefficients, applying the procedure for addition of signed numbers • Leave the variables unchanged

5. ADDITION • Example: Add 5x and 10x • Add the numerical coefficients 5 + 10 = 15 • Leave the literal factor unchanged 5x + 10x = 15x • Example: –14a2b2 + (–6a2b2) • Add the numerical coefficients and leave the literal factor unchanged –14 + –6 = –20 –14a2b2 + (–6a2b2) = –20a2b2

6. ADDITION • Procedure for adding expressions that consist of two or more terms: • Group like terms in the same column • Add like terms and indicate the addition of the unlike terms

7. ADDITION • Example: Add the two expressions 7x + (–xy) + 5xy2 and (–2x) + 3xy + (–6xy2) • Group like terms in the same column • Add the like terms and indicate the addition of the unlike terms

8. SUBTRACTION • Just as in addition, only like terms can be subtracted • Each term of the subtrahend is subtracted following the procedure for subtraction of signed numbers

9. SUBTRACTION • Example: Subtract the following expressions (4x2 + 6x – 15xy) – (9x2 – x – 2y + 5y2) • Change the sign of each term in the subtrahend –9x2 + x + 2y – (5y2) • Follow the procedure for addition of signed numbers

10. MULTIPLICATION • In multiplication, the exponents of the literal factors do not have to be the same to multiply the values • Procedure for multiplying two or more terms: • Multiply the numerical coefficients, following the procedure for multiplication of signed numbers • Add the exponents of the same literal factors • Show the product as a combination of all numerical and literal factors

11. MULTIPLICATION • Example: Multiply (2xy2)(-3x2y3) • Multiply the numerical coefficients following the procedure for multiplication of signed numbers(2)(-3) = -6 • Add the exponents of the same literal factors(x)(x2) = x1+2 = x3 and (y2)(y3) = y2+3 = y5 • Show the product of coefficients and literal factors(2xy2)(-3x2y3) = -6x3y5

12. MULTIPLICATION • Procedure for multiplying expressions that consist of more than one term within an expression: • Multiply each term of one expression by each term of the other expression • Combine like terms

13. MULTIPLICATION • Example: 3a(6 + 2a2) • Multiply each term of one expressions by each term of the other expression = 3a(6) + 3a(2a2) = 18a + 6a3 • Combine like terms; since 18a and 6a3 are unlike terms, they can not be combined = 18a + 6a3

14. MULTIPLICATION • Example: (3c + 5d2)(4d2 – 2c) • Multiply each term of one expressions by each term of the other expression (FOIL method) 3c (4d2) = 12cd2 (F)irst term 3c(–2c) = –6c2 (O)uter term 5d2(4d2) = 20d4 (I)nner term 5d2(–2c) = –10cd2 (L)ast term • Combine like terms (3c + 5d2)(4d2 – 2c) = 2cd2 –6c2 + 20d4

15. DIVISION • Procedure for dividing two terms: • Divide the numerical coefficients following the procedure for division of signed numbers • Subtract the exponents of the literal factors of the divisor from the exponents of the same letter factors of the dividend • Combine numerical and literal factors

16. DIVISION • Example: Divide (-20a3x5y2) ÷ (-2ax2) • Divide the numerical coefficients-20 / -2 = 10 • Subtract the exponentsa3 – 1= a2x5 – 2 = x3y2 = y2 • Combine numerical and literal factors (-20a3x5y2) ÷ (-2ax2) = 10a2x3y2

17. POWERS • Procedure for raising a single term to a power: • Raise the numerical coefficients to the indicated power following the procedure for powers of signed numbers • Multiply each of the literal factor exponents by the exponent of the power to which it is raised • Combine numerical and literal factors

18. POWERS • Example: (–4x2y4z)3 • Raise the numerical coefficients to the indicated power (–4)3 = (–4)(–4)(–4) = –64 • Multiply the exponents of the literal factors by the indicated powers (x2y4z)3 = x2(3) + y4(3) + z1(3) = x6y12z3 • Combine (–4x2y4z)3 = –64x6y12z3

19. POWERS • Procedure for raising two or more terms to a power: • Apply the procedure for multiplying expressions that consist of more than one term

20. POWERS • Example: (3a + 5b3)2 • Apply the FOIL method 3a(3a) = 9a2 (F)irst term 3a(5b3) = 15ab3 (O)uter term 5b3(3a) = 15ab3 (I)nner term 5b3(5b3) = 25d6 (L)ast term • Combine 9a2 + 30ab3 + 25d6

21. ROOTS • Procedures for extracting the root of a term: • Determine the root of the numerical coefficient following the procedure for roots of signed numbers • The roots of the literal factors are determined by dividing the exponent of each literal factor by the index of the root • Combine the numerical and literal factors

22. ROOTS • Example: • Determine the root of the numerical coefficient • Divide the exponent of the literal factors by the index • Combine

23. REMOVAL OF PARENTHESES • Procedure for removal of parentheses preceded by a plus sign: • Remove the parentheses without changing the signs of any terms within the parentheses • Combine like terms • Example: – 7x + (–4x + 3y – 2) = –7x – 4x + 3y – 2 = –11x + 3y – 2

24. REMOVAL OF PARENTHESES • Procedure for removal of parentheses preceded by a minus sign: • Remove the parentheses while changing the signs of any terms within the parentheses • Combine like terms • Example: –(7a2 + b – 3) + 12 – (– b + 5) = – 7a2 – b + 3 + 12 + b – 5 = – 7a2 + 10

25. COMBINED OPERATIONS • Expressions that consist of two or more different operations are solved by applying the proper order of operations • Example: 5b + 4b(5 + a – 2b2) • Multiply 4b(5 + a – 2b2) = 20b + 4ab – 8b3 • Combine like terms 5b + 20b = 25b 25b + 4ab – 8b3