Algebraic Expressions 2x + 3y - 7 What are the Terms?
Algebraic Expressions 2x + 3y - 7 Terms
Algebraic Expressions 2x + 3y - 7 What are the variables?
Algebraic Expressions 2x + 3y - 7 Variables
Algebraic Expressions 2x + 3y - 7 What are the coefficients?
Algebraic Expressions 2x + 3y - 7 Coefficients
Algebraic Expressions 2x + 3y - 7 What is the constant?
Algebraic Expressions 2x + 3y - 7 Constant
Algebraic Expressions Polynomial: monomial → x, 2xy, 4, 3x²y, … single term binomial → x+1, 2xy+x, 3x²y+4, …two terms trinomial → 2x+3y+7, 3x²y+xy+4x, …three terms polynomial → …four or more terms
What is the area of a rectangle? Length times Width If the length is 3 meters and the width is 2 meters, what is the area? A = L x W A = 3 x 2 = 6 meters2 A, L and W are the variables. It is any letter that represents an unknown number.
An algebraic expression contains: 1) one or more numbers or variables, and 2) one or more arithmetic operations. Examples: x - 3 3 • 2n
In expressions, there are many different ways to write multiplication. 1) ab 2) a • b 3) a(b) or (a)b 4) (a)(b) 5) a x b We are not going to use the multiplication symbol any more. Why?
Division, on the other hand, is written as: 1) 2) x ÷ 3
Here are some phrases you may have see throughout the year Here are some phrases you may have see throughout the year. The terms with * are ones that are often used.
Write an algebraic expression for 1) m increased by 5. m + 5 2) 7 times the product of x and t. 7xt or 7(x)(t) or 7 • x • t
3) 11 less than 4 times a number. 4) two more than 6 times a number. 6n + 2 5) the quotient of a number and 12.
Which of the following expressions represents 7 times a number decreased by 13?
Which one of the following expressions represents 28 less than three times a number?
Write a verbal expression for: 1) 8 + a. The sum of 8 and a 2) The ratio of m to r Do you have a different way of writing these?
Which of the following verbal expressions represents 2x + 9? 9 increased by twice a number a number increased by nine twice a number decreased by 9 9 less than twice a number
Which of the following expressions represents the sum of 16 and five times a number?
Which of the following verbal expressions represents x2 + 2x? the sum of a number squared and twice the number the sum of a number and twice the number twice a number less than the number squared the sum of a number and twice the number squared
Which of the following expressions represents four less than the cube of a number?
Evaluate. 21 2 22 2 • 2 = 4 23 2 • 2 • 2 = 8 2n7 We can’t evaluate because we don’t know what n equals to!!
Competition Problems Evaluating Algebraic Expressions
Evaluate the following algebraic expression using m=7, n=8 n² - m
Answer: 57
Evaluate the following algebraic expression using x=5, y=2 8(x-y)
Answer: 24
Evaluate the following algebraic expression using x=7, y=2 yx ÷ 2
Answer: 7
Evaluate the following algebraic expression using x=1, z=19 z + x³
Answer: 20
Evaluate the following algebraic expression using m=3, p=10 15-(m+p)
Answer: 2
Evaluate the following algebraic expression using a=9, b=4 b(a+b) + a
Answer: 61
Evaluate the following algebraic expression using m=3, p=4 p²÷4-m
Answer: 1
Evaluate the following algebraic expression using x=4, y=2 y(x-(9-4y))
Answer: 6
Evaluate the following algebraic expression using x=9, y=1 x-(x-(x-y³))
Answer: 8
Evaluate the following algebraic expression using h=9, j=8 j(h-9)³ +2
Answer: 2
Simplifying Algebraic Expressions
REVIEW
Insert Lesson Title Here Vocabulary term coefficient like terms
The terms of an expression are the parts to be added or subtracted The terms of an expression are the parts to be added or subtracted. Like terms are terms that contain the same variables raised to the same powers. Constants are also like terms. Like terms Constant 4x – 3x + 2
A coefficient is a number multiplied by a variable A coefficient is a number multiplied by a variable. Like terms can have different coefficients. A variable written without a coefficient has a coefficient of 1. Coefficients 1x2 + 3x
In the expression 7x + 5, 7x and 5 are called terms In the expression 7x + 5, 7x and 5 are called terms. A term can be a number, a variable, or a product of numbers and variables. Terms in an expression are separated by + and –. x 3 7x + 5 – 3y2 + y + term term term term term In the term 7x, 7 is called the coefficient. A coefficient is a number that is multiplied by a variable in an algebraic expression. A variable by itself, like y, has a coefficient of 1. So y = 1y. Coefficient Variable 7 x
Term Coefficient 2 3 x 9 4a 3k2 x2 4.7t 2 3 1 9 4 3 1 4.7
Like terms are terms with the same variable raised to the same power Like terms are terms with the same variable raised to the same power. The coefficients do not have to be the same. Constants, like 5, , and 3.2, are also like terms. 1 2 Like Terms Unlike Terms w 7 3x and 2x w and 5 and 1.8 5x2 and 2x 6a and 6b 3.2 and n Only one term contains a variable The exponents are different. The variables are different
Additional Example 1: Identifying Like Terms Identify like terms in the list. 3t 5w2 7t 9v 4w2 8v Look for like variables with like powers. 3t 5w2 7t 9v 4w2 8v Like terms: 3t and 7t, 5w2 and 4w2, 9v and 8v Use different shapes or colors to indicate sets of like terms. Helpful Hint
Identify like terms in the list. Insert Lesson Title Here Identify like terms in the list. 2x 4y3 8x 5z 5y3 8z Look for like variables with like powers. 2x 4y3 8x 5z 5y3 8z Like terms: 2x and 8x, 4y3 and 5y3 , 5z and 8z
Insert Lesson Title Here Combining like terms is like grouping similar objects. x x x x x x x x + = x x x x x x x x x x = 9x 4x + 5x To combine like terms that have variables, add or subtract the coefficients.
Using the Distributive Property can help you combine like terms Using the Distributive Property can help you combine like terms. You can factor out the common factors to simplify the expression. 7x2 – 4x2 = (7 – 4)x2 Factor out x2 from both terms. = (3)x2 Perform operations in parenthesis. = 3x2 Notice that you can combine like terms by adding or subtracting the coefficients and keeping the variables and exponents the same.
Simplify the expression by combining like terms. 72p – 25p 72p – 25p 72p and 25p are like terms. 47p Subtract the coefficients.
Simplify the expression by combining like terms. A variable without a coefficient has a coefficient of 1. and are like terms. Write 1 as . Add the coefficients.
Simplify the expression by combining like terms. 0.5m + 2.5n 0.5m + 2.5n 0.5m and 2.5n are not like terms. 0.5m + 2.5n Do not combine the terms.
16p + 84p –20t – 8.5t2 3m2 + m3 Simplify by combining like terms. 16p + 84p are like terms. 100p Add the coefficients. –20t – 8.5t2 –20t – 8.5t2 20t and 8.5t2 are not like terms. –20t – 8.5t2 Do not combine the terms. 3m2 + m3 3m2 + m3 3m2 and m3 are not like terms. 3m2 + m3 Do not combine the terms.
Simplify 14x + 4(2 + x) Procedure Justification 1. 14x + 4(2 + x) 2. Distributive Property 3. 14x + 8 + 4x Multiply. Commutative Property 4. 14x + 4x + 8 5. (14x + 4x) + 8 Associative Property 6. 18x + 8 Combine like terms.
Simplify 6(x – 4) + 9. Justify each step. Procedure Justification 1. 6(x – 4) + 9 2. 6(x) – 6(4) + 9 Distributive Property 3. 6x – 24 + 9 Multiply. Combine like terms. 4. 6x – 15
Simplify −12x – 5x + 3a + x. Justify each step. Procedure Justification 1. –12x – 5x + 3a + x 2. –12x – 5x + x + 3a Commutative Property 3. –16x + 3a Combine like terms.
5($1.99) 6(13) 165 +27 + 3 + 5 Simplify each expression. 200 8 Write each product using the Distributive Property. Then simplify. 5($1.99) 5($2) – 5($0.01) = $9.95 6(13) 6(10) + 6(3) = 78
Simplify each expression by combining like terms Simplify each expression by combining like terms. Justify each step with an operation or property. 14c2 – 9c 14c2 – 9c 301x – x 300x 24a + b2 + 3a + 2b2 27a + 3b2
Let’s work more problems…
Simplify the following algebraic expression: -3p + 6p
Answer: 3p
Simplify the following algebraic expression: 7x - x
Answer: 6x
Simplify the following algebraic expression: -10v + 6v
Answer: -4v
Simplify the following algebraic expression: 5n + 9n
Answer: 14n
Simplify the following algebraic expression: b - 3 + 6 - 2b
Answer: -b + 3
Simplify the following algebraic expression: 10x + 36 - 38x - 47
Answer: -28x - 11
Simplify the following algebraic expression: 10x-w+4y-3x+36-38x-47+32x+2w-3y
Answer: w+x+y-11
Simplify the following algebraic expression using the distributive property:
Answer: 6 – 30m
Simplify the following algebraic expression using the distributive property:
Answer: -2 + 10v
Simplify the following algebraic expression using the distributive property:
Answer: -21n - 3
Simplify the following algebraic expression using the distributive property:
Answer: 14x + 14
Simplify the following algebraic expression using the distributive property: (3 - 7k) ∙ (-2)
Answer: -6 + 14k
Simplify the following algebraic expression using the distributive property:
Answer: -160x - 400
Simplify the following algebraic expression using the distributive property:
Answer: -105 – 285b
Variable Expressions
Simplify: (-a)²
Answer: a²
Substitution and Evaluating STEPS Write out the original problem. Show the substitution with parentheses. Work out the problem. = 64
Evaluate the variable expression when x = 1, y = 2, and w = -3 Step 1 Step 1 Step 1 Step 2 Step 2 Step 2 Step 3 Step 3 Step 3
Contest Problem
Are you ready? 3, 2, 1…lets go!
Evaluate the expression when a= -2 a² + 2a - 6
Answer: -6
Evaluate the expression when x= -4 and t=2 x²(x-t)
Answer: -96
Evaluate the expression when y= -3 (2y + 5)²
Answer: 1
MULTIPLICATION PROPERTIES PRODUCT OF POWERS This property is used to combine 2 or more exponential expressions with the SAME base.
MULTIPLICATION PROPERTIES POWER OF PRODUCT This property combines the first 2 multiplication properties to simplify exponential expressions.
Problems Are you ready? 3, 2, 1…lets go!
Simplify. Your answer should contain only positive exponents Simplify. Your answer should contain only positive exponents. 2n⁴ · 5n ⁴
Answer: 10n⁸
Simplify. Your answer should contain only positive exponents. 6r · 5r²
Answer: 30r³
Simplify. Your answer should contain only positive exponents. 6x · 2x²
Answer: 12x³
Simplify. Your answer should contain only positive exponents Simplify. Your answer should contain only positive exponents. 6x² · 6x³y⁴
Answer: 36x⁵y⁴
Simplify. Your answer should contain only positive exponents Simplify. Your answer should contain only positive exponents. 10xy³ · 8x⁵y³
Answer: 80x⁶y⁶
MULTIPLICATION PROPERTIES POWER TO A POWER This property is used to write and exponential expression as a single power of the base.
MULTIPLICATION PROPERTIES SUMMARY PRODUCT OF POWERS ADD THE EXPONENTS POWER TO A POWER MULTIPLY THE EXPONENTS POWER OF PRODUCT
Problems Are you ready? 3, 2, 1…lets go!
Simplify. Your answer should contain only positive exponents. (a²)³
Answer: a⁶
Simplify. Your answer should contain only positive exponents. (3a²)³
Answer: 27a⁶
Simplify. Your answer should contain only positive exponents. (x⁴y⁴)³
Answer: x¹²y¹²
Simplify. Your answer should contain only positive exponents. (2x⁴y⁴)³
Answer: 8x¹²y¹²
Simplify. Your answer should contain only positive exponents. (4x⁴∙x⁴)³
Answer: 64x²⁴
Simplify. Your answer should contain only positive exponents. (4n⁴∙n)²
Answer: 16n¹⁰
ZERO AND NEGATIVE EXPONENTS ANYTHING TO THE ZERO POWER IS 1.
DIVISION PROPERTIES QUOTIENT OF POWERS This property is used when dividing two or more exponential expressions with the same base.
DIVISION PROPERTIES POWER OF A QUOTIENT Hard Example
ZERO, NEGATIVE, AND DIVISION PROPERTIES Zero power Quotient of powers Negative Exponents Power of a quotient
Problems Are you ready? 3, 2, 1…lets go!
Simplify. Your answer should contain only positive exponents. 3r³ 2r
Answer: 3r² 2
Simplify. Your answer should contain only positive exponents. 3xy 5x² 2 ( )
Answer: 9y² 25x²
Simplify. Your answer should contain only positive exponents Simplify. Your answer should contain only positive exponents. 18x⁸y⁸ 10x³
Answer: 9x⁵y⁸ 5
Simplify: (x⁴y¯²)(x¯¹y⁵)
Answer: x³y³
Simplify the following algebraic expression using the distributive property: 8x ∙ (6x + 6)
Answer: 48x² + 48x
Simplify the following algebraic expression using the distributive property: 7n(6n + 3)
Answer: 42n² + 21n
Simplify the following algebraic expression using the distributive property: 2(9x – 2y)
Answer: 18x – 4y
Simplify the following algebraic expression using the distributive property:
Answer: 8 - 21b
Simplify the following algebraic expression using the distributive property:
Answer: 5 + 21b
Simplify the following algebraic expression using the distributive property: 3n(n² - 6n + 5)
Answer: 3n³ - 18n² + 15n
Simplify the following algebraic expression using the distributive property: 2k³(2k² + 5k - 4)
Answer: 4k⁵ +10k⁴ - 8k³
Simplify the following algebraic expression using the distributive property: 9(x² + xy – 8y²)
Answer: 9x² + 9xy – 72y²
Simplify the following algebraic expression using the distributive property: 9v²(u² + uv - 5v²)
Answer: 9v²u² +9v³u – 45v⁴
Simplify the following algebraic expression using the distributive property: 3x(5x+2) - 14(2x²-x+1)
Answer: -13x² + 20x - 14
Simplify completely: 4x²y 2x
Answer: 2xy
Simplify completely: y¯¹ y¯²
Answer: y
Simplify completely: 16x⁴y¯¹ 4x²y¯²
Answer: 4x²y
Simplify completely: 36x³y⁶z¹² 4x¯¹y³z¹⁰
Answer: 9x⁴y³z²
Simplify completely: 21x³y⁷z¹⁴ 30x³z¯⁵ 18x⁴y⁶ y¹²z¯⁶ ·
Answer: 35x²z¹⁵ y¹¹