Splash Screen. Lesson Menu Five-Minute Check (over Chapter 6) CCSS Then/Now New Vocabulary Example 1: Identify Monomials Key Concept: Product of Powers.

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Presentation transcript:

Splash Screen

Lesson Menu Five-Minute Check (over Chapter 6) CCSS Then/Now New Vocabulary Example 1: Identify Monomials Key Concept: Product of Powers Example 2: Product of Powers Key Concept: Power of a Power Example 3: Power of a Power Key Concept: Power of a Product Example 4: Power of a Product Key Concept: Simplify Expressions Example 5: Simplify Expressions

Over Chapter 6 5-Minute Check 1 A.(12, 13) B.(10, 15) C.(8, 4) D.(6, 7) Use substitution or elimination to solve the system of equations. r – t = –5 r + t = 25

Over Chapter 6 5-Minute Check 1 A.(12, 13) B.(10, 15) C.(8, 4) D.(6, 7) Use substitution or elimination to solve the system of equations. r – t = –5 r + t = 25

Over Chapter 6 5-Minute Check 2 A.(4, 2) B.(3, 2) C.(2, 2) D.(2, 3) Use substitution or elimination to solve the system of equations. 2x + y = 7 y = 0.5x + 2

Over Chapter 6 5-Minute Check 2 A.(4, 2) B.(3, 2) C.(2, 2) D.(2, 3) Use substitution or elimination to solve the system of equations. 2x + y = 7 y = 0.5x + 2

Over Chapter 6 5-Minute Check 3 A.no solution B.one solution C.infinitely many solutions Graph the system of equations. How many solutions does the system of equations have?

Over Chapter 6 5-Minute Check 3 A.no solution B.one solution C.infinitely many solutions Graph the system of equations. How many solutions does the system of equations have?

Over Chapter 6 5-Minute Check 4 A.53 B.62 C.71 D.80 The tens digit of a two-digit number is 5 more than twice the ones digit. The sum of the digits is 8. What is the number?

Over Chapter 6 5-Minute Check 4 A.53 B.62 C.71 D.80 The tens digit of a two-digit number is 5 more than twice the ones digit. The sum of the digits is 8. What is the number?

Over Chapter 6 5-Minute Check 5 A.(1, –2) B.(–1, 2) C.(2, –1) D.(–2, 1) What is the solution of the system of equations? y = x + 3 y = –2x

Over Chapter 6 5-Minute Check 5 A.(1, –2) B.(–1, 2) C.(2, –1) D.(–2, 1) What is the solution of the system of equations? y = x + 3 y = –2x

CCSS Content Standards A.SSE.2 Use the structure of an expression to identify ways to rewrite it. F.IF.8b Use the properties of exponents to interpret expressions for exponential functions. Mathematical Practices 8 Look for and express regularity in repeated reasoning. Common Core State Standards © Copyright National Governors Association Center for Best Practices and Council of Chief State School Officers. All rights reserved.

Then/Now You performed operations on expressions with exponents. Multiply monomials. Simplify expressions involving monomials.

Vocabulary monomial constant

Example 1 Identify Monomials Determine whether each expression is a monomial. Explain your reasoning. A. 17 – c B. 8f 2 g C. __ 3 4 D. __ 5 t Answer:

Example 1 Identify Monomials Determine whether each expression is a monomial. Explain your reasoning. A. 17 – c B. 8f 2 g C. __ 3 4 D. __ 5 t Answer: No; the expression involves subtraction, so it has more than one term. Answer: Yes; the expression is the product of a number and two variables. Answer: Yes; the expression is a constant. Answer: No; the expression involves division by a variable.

Example 1 Which expression is a monomial? A.x 5 B.3p – 1 C. D.

Example 1 Which expression is a monomial? A.x 5 B.3p – 1 C. D.

Concept

Example 2 Product of Powers A. Simplify (r 4 )(–12r 7 ). (r 4 )(–12r 7 )= [1 ● (–12)](r 4 )(r 7 )Group the coefficients and the variables. = [1 ● (–12)](r 4+7 )Product of Powers = –12r 11 Simplify. Answer:

Example 2 Product of Powers A. Simplify (r 4 )(–12r 7 ). (r 4 )(–12r 7 )= [1 ● (–12)](r 4 )(r 7 )Group the coefficients and the variables. = [1 ● (–12)](r 4+7 )Product of Powers = –12r 11 Simplify. Answer: –12r 11

Example 2 Product of Powers B. Simplify (6cd 5 )(5c 5 d 2 ). = 30c 6 d 7 Simplify. (6cd 5 )(5c 5 d 2 )= (6 ● 5)(c ● c 5 )(d 5 ● d 2 )Group the coefficients and the variables. = (6 ● 5)(c 1+5 )(d 5+2 )Product of Powers Answer:

Example 2 Product of Powers B. Simplify (6cd 5 )(5c 5 d 2 ). = 30c 6 d 7 Simplify. (6cd 5 )(5c 5 d 2 )= (6 ● 5)(c ● c 5 )(d 5 ● d 2 )Group the coefficients and the variables. = (6 ● 5)(c 1+5 )(d 5+2 )Product of Powers Answer: 30c 6 d 7

Example 2 A.9x 5 B.20x 5 C.20x 6 D.9x 6 A. Simplify (5x 2 )(4x 3 ).

Example 2 A.9x 5 B.20x 5 C.20x 6 D.9x 6 A. Simplify (5x 2 )(4x 3 ).

Example 2 A.6xy 5 B.–6x 2 y 6 C.1x 3 y 5 D.–6x 3 y 5 B. Simplify 3xy 2 (–2x 2 y 3 ).

Example 2 A.6xy 5 B.–6x 2 y 6 C.1x 3 y 5 D.–6x 3 y 5 B. Simplify 3xy 2 (–2x 2 y 3 ).

Concept

Example 3 Power of a Power Simplify [(2 3 ) 3 ] 2. = 2 18 or 262,144Simplify. [(2 3 ) 3 ] 2 = (2 3 ● 3 ) 2 Power of a Power = (2 9 ) 2 Simplify. = 2 9 ● 2 Power of a Power Answer:

Example 3 Power of a Power Simplify [(2 3 ) 3 ] 2. = 2 18 or 262,144Simplify. [(2 3 ) 3 ] 2 = (2 3 ● 3 ) 2 Power of a Power = (2 9 ) 2 Simplify. = 2 9 ● 2 Power of a Power Answer: 2 18 or 262,144

Example 3 A.4 7 B.4 8 C.4 12 D.4 10 Simplify [(4 2 ) 2 ] 3.

Example 3 A.4 7 B.4 8 C.4 12 D.4 10 Simplify [(4 2 ) 2 ] 3.

Concept

Example 4 Power of a Product GEOMETRY Find the volume of a cube with side length 5xyz. = 125x 3 y 3 z 3 Simplify. Volume = s 3 Formula for volume of a cube = (5xyz) 3 Replace s with 5xyz. = 5 3 x 3 y 3 z 3 Power of a Product Answer:

Example 4 Power of a Product GEOMETRY Find the volume of a cube with side length 5xyz. = 125x 3 y 3 z 3 Simplify. Volume = s 3 Formula for volume of a cube = (5xyz) 3 Replace s with 5xyz. = 5 3 x 3 y 3 z 3 Power of a Product Answer: 125x 3 y 3 z 3

Example 4 A.8p 3 q 3 B.24p 2 q 2 C.6p 2 q 2 D.8p 2 q 2 Express the surface area of the cube as a monomial.

Example 4 A.8p 3 q 3 B.24p 2 q 2 C.6p 2 q 2 D.8p 2 q 2 Express the surface area of the cube as a monomial.

Concept

Example 5 Simplify Expressions Simplify [(8g 3 h 4 ) 2 ] 2 (2gh 5 ) 4. [(8g 3 h 4 ) 2 ] 2 (2gh 5 ) 4 = (8g 3 h 4 ) 4 (2gh 5 ) 4 Power of a Power = (8) 4 (g 3 ) 4 (h 4 ) 4 (2) 4 g 4 (h 5 ) 4 Power of a Product = 4096g 12 h 16 (16)g 4 h 20 Power of a Power = 4096(16)g 12 ● g 4 ● h 16 ● h 20 Commutative Property = 65,536g 16 h 36 Product of Powers Answer:

Example 5 Simplify Expressions Simplify [(8g 3 h 4 ) 2 ] 2 (2gh 5 ) 4. [(8g 3 h 4 ) 2 ] 2 (2gh 5 ) 4 = (8g 3 h 4 ) 4 (2gh 5 ) 4 Power of a Power = (8) 4 (g 3 ) 4 (h 4 ) 4 (2) 4 g 4 (h 5 ) 4 Power of a Product = 4096g 12 h 16 (16)g 4 h 20 Power of a Power = 4096(16)g 12 ● g 4 ● h 16 ● h 20 Commutative Property = 65,536g 16 h 36 Product of Powers Answer: 65,536g 16 h 36

Example 5 A.1728c 27 d 24 B.6c 7 d 5 C.24c 13 d 10 D.5c 7 d 21 Simplify [(2c 2 d 3 ) 2 ] 3 (3c 5 d 2 ) 3.

Example 5 A.1728c 27 d 24 B.6c 7 d 5 C.24c 13 d 10 D.5c 7 d 21 Simplify [(2c 2 d 3 ) 2 ] 3 (3c 5 d 2 ) 3.

End of the Lesson