Chapter 2: Inequalities, Functions, and Linear Functions

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1 CHAPTER Chapter : Inequalities, Functions, and Linear Functions Exercise.. a. + ; ; > b. ; + ; c. + ; ; > d. 7 ; 8 ; 8 < e ; ; 0. < 0.6 f....0;. (0.).0;.0 >.0 Inequality Line Graph Inequality in Words. x see text x is less than or equal to.. < x < see text x is between and. 7. x x is greater than or equal to. 9. < x < see text x is between and.. x < or x > see text x is less than or x is greater than.. x < or x > see text x is less than or x is greater than.. x or x see text x is less than or equal to or x is greater than or equal to. 7. < x < is x > and x < 9. Neither x > nor x < is appropriate for a compound inequality.. x > and x is < x.. x < is x and x <.. < x and > x is < x < 7. a. Xmin, Xmax is x or x on the interval [, ]. b. Ymin 0, Ymax 0 is 0 y 0 or y on the interval [ 0, 0]. Copyright by Houghton Mifflin Company. All rights reserved.

2 Inequalities, Functions, and Linear Functions Inequality Interval Words Line Graph 9. < x < (, ) Set of numbers greater than and less than. < x (, ] Set of numbers greater than and less than or equal to. x > (, ) Set of numbers greater than see text. x < (, ) Set of numbers less than 7. x (, ) Set of numbers less than or equal to 9. x [, ) Set of numbers greater than or equal to. y $ for 0 < x ; y $ + $0.0(x ) for x >. y $0 for 0 < x ; y $0 + $(x ) for x >, x rounded up to the next integer.. y $6 for 0 < x 00; y $6 + $0.(x 00) for x > y $8 for 0 < x 0; y $8 + $.7(x 0) for x > 0 7. Answers may vary. For example, by using systematic guess-and-check starting with the 6 fractions given, < π < Exercise.. f(x) x. Not a function. f(x) x 7. Fails vertical-line test, all x < have two outputs, not a function 9. Each input has one output, function. Fails vertical-line test, each input has two outputs, not a function. Exercise 8; [, ]; [0, ]. Exercise 9; (, ); [0, ) Copyright by Houghton Mifflin Company. All rights reserved.

3 CHAPTER 7. Function; one output for each input 9. Function; one output for each input. Not a function; and both have two outputs.. Function. Not a function 7. Not a function 9. x is any real number; f(x) 0.. x is any real number; h(x).. x is any real number; g(x) 6.. a. domain b. negative numbers plus zero c. (, 0] 7. a. range b. positive numbers c. (0, + ) 9. a. domain b. positive numbers c. (0, + ). a. range b. negative numbers plus zero c. (, 0]. x g(x) + (x ) + [( ) ] + [( ) ] 0 + [(0) ] + [() ] + [() ] + [() ] + [() ] 7 Copyright by Houghton Mifflin Company. All rights reserved.

4 Inequalities, Functions, and Linear Functions. 7. x g(x) 8 x 8 ( ) 8 ( ) (0) 8 8 () 7 8 () 8 (9) 8 () 8 x f(x) x x ( ) ( ) ( ) ( ) 0 0 (0) (0) () () () () () () 0 () () 9. a. f() + [() ] b. f() + [() ] f() + (0) f() + () f() f() c. f(n) + [(n) ] d. f(n + m) + [(n + m) ] f(n) + n f(n + m) + n + m f(n) n + f(n + m) n + m +. a. g() () + () b. g() () + () g() 9 + () g() + () g() 0 g() 0 c. g( ) ( ) + ( ) d. g(n) (n) + (n) g(n) n + n e. g(n m) (n m) + (n m) g(n m) n nm + m + n m. a. (00 6) or ( b. (00) 6 6 correct answer is b. a. ( + ) b. + ( ) or + correct answer is b 7. a. abs() b. abs( ) correct answer is b 9. r is length, domain should be r > x is length, domain should be x > 0. 6 Copyright by Houghton Mifflin Company. All rights reserved.

5 CHAPTER 6. 0 digits 6. 9 digits 7. a. + (x 0) b. + (x 0) + x 0 + x 0 x + + x + + x 0 x 8 x 0 x 7. a. From the table, f( ) and f() both equal 0. The solution set is {, }. b. f(x) does not appear on the table. We extend it to find f(6) (6) (6). Noting the symmetry, we check f( ); ( ) ( ). The solution set is {, 6}. 7. a. From the table, g( ) and g() both equal. The solution set is {, }. b. From the table, g( ) and g() both equal 7. The solution set is {, }. 77. a. b. Function, each input has one output. Not a function, one input has two outputs. c. d. Not a function, one input has two outputs. Function, each input has one output. Exercise. 60. f(x) 9 ( x ) 9 x 9 ; linear function. C(x) πx; linear function. f(x) x + x; non-linear Copyright by Houghton Mifflin Company. All rights reserved. 7

6 Inequalities, Functions, and Linear Functions 7. v(x) gt + v o ; linear function 9. h(x) ax + bx + c ; non-linear. a. x-intercept: (, 0), y-intercept: (0, ) b. x-intercept: (, 0), y-intercept: (0, ). The function shown in b decreases less rapidly.. The function shown in a increases more rapidly. 7. a. y-intercept point b. x-intercept point c. y-intercept point d. origin, x- and y- intercept 9. f(x) x + f(x) x + 0 x + f(0) 0 + x f(0) x-intercept: (, 0) y-intercept: (0, ). g(x) x + g(x) x + 0 x + g(0) (0) + x g(0) x y-intercept: (0, ) x-intercept: (, 0). f(x) x 6 f(x) x 6 0 x 6 f(0) (0) 6 6 x f(0) 6 9 x y-intercept: (0, 6) x-intercept: (9, 0) 8 Copyright by Houghton Mifflin Company. All rights reserved.

7 CHAPTER. f(x) x + 0 f(x) x x + 0 f(0) (0) x f(0) 0 0 x y-intercept: (0, 0) 0 x-intercept: (, 0) F C(F) ( F ) ( F ) C(0) ( 0 ) C(F) ( ) F C(0) F y-intercept: (0, 9 9 F x-intercept: (, 0) 60 ) ( ) ( ) ( ) 7. 0 ( ) 0 ( ) 0 ; undefined 9. 0 ( ) ( ) ( ) 9 Copyright by Houghton Mifflin Company. All rights reserved. 9

8 Inequalities, Functions, and Linear Functions $ a. Δx $0 sales, Δy $0.60 tax; slope $0.06 tax/$ sales $0 b. Working backward in the table, x-intercept (0, 0); $0 sales means $0 tax. c. y-intercept is also (0, 0), there is 0 sales tax if there is 0 sales. 9. a. Δx trip, Δy $0.7 value; slope $0.7 value/trip b. Working forward on the table, x-intercept (6, 0); maximum number of trips is 6. c. y-intercept is in the table (0, 0); original value of mass transit ticket is $0.. Δx 0. sec, Δy is not constant; function is not linear.. a. b. x y 0 0.0x (0) (00) (00) 0 x y 0 0.x (0) (0) (0) Slope 0. 0 Slope From (, ), move units in y and units in x; ( +, ) (7, ). 7. From (, ), move units in y and units in x; ( +, + ) (, ). Mid-Chapter Test. a. b. (, ) (, 6) c. d. [, ] (, 6] e. f. (, ), (, ) R or (, ) 0 Copyright by Houghton Mifflin Company. All rights reserved.

9 CHAPTER. a. x ; [, ] b. x ; [, ) c. y ; [, ) d. y > or y < ; R; (, ) e. < y ; (, ]. a. The set of numbers greater than or equal to and less than. b. The set of inputs between and. c. The set of numbers less than or equal to. d. The set of outputs less than or equal to.. y 6. for 0 < x 0; y (x 0) for x > 0. The set of numbers x 0 is called non-negative. 6. The set of inputs in a function is called the domain. 7. The ordered pair describing the intersection of a graph and the vertical axis is written (0, y). 8. a. f() () b. f() () c. f( ) ( ) f() f() 9 f( ) f() f() f( ) 0 d. f(a) (a) e. f(a + b) (a + b) f(a) a f(a + b) a + b 9. a. f() () () b. f() () () c. f( ) ( ) ( ) f() f() 9 f( ) + f() 0 f() 6 f( ) 0 d. f(a) (a) (a) e. f(a + b) (a + b) (a + b) f(a) a a f(a + b) a + ab + b a b 0. a. Domain: R, < x <, (, ) b. Range: y 0, [0, ) c. Graph describes a function.. a. Domain: R, < x <, (, ) b. Range: R, < y <, (, ) c. Graph describes a function.. a. Domain: x, [, ] b. Range: y, [, ] Copyright by Houghton Mifflin Company. All rights reserved.

10 Inequalities, Functions, and Linear Functions c. Graph does not describe a function (fails vertical-line test).. a. y ; a 0, b, c ; 0x + y ; linear function b. x ; a, b 0, c ; x + 0y ; not a function c. πx 7; a π, b 0, c 7; πx + 0y 7; not a function d. Equation is not linear.. a. To find the horizontal (x) intercept, let y 0; x + (0), x, x-intercept (, 0). To find the vertical (y) intercept, let x 0; (0) + y, y, y-intercept (0, ). b. y is a horizontal line, so it does not have an x-intercept; y-intercept (0, ). c. x is a vertical line, so it does not have a y-intercept; x-intercept (, 0). d. For the horizontal intercept, let F 0; 0 9 C +, 9 C, C 7.78, intercept ( 7.78, 0). For vertical intercept let C 0; F 9 (0) +, F, intercept (0, ). a. Δinput, Δoutput ; slope ; vertical axis intercept is (, ( )) (0, ) 8. b. Δinput, 6; Δoutput 8., ;.,., slope $.0/ft; vertical axis 6 intercept is (, 9. (.0)) (0, ). Exercise.. y 0.0x; slope $0.0/$; y-intercept $0. y.00x + 0; slope $.00/person; y-intercept $0. C πr; slope π; vertical axis intercept 0 7. F μn; slope μ, vertical axis intercept 0 9. C a + by; slope b, vertical axis intercept a. Slope 8; y-intercept : y 8x. Slope ; y-intercept 8: y x 8 Copyright by Houghton Mifflin Company. All rights reserved.

11 CHAPTER. Slope ; y-intercept 0: y x 7. (, 6) and (0, ); slope ; y 8 x 7 9. (, ) and (, ); slope ; b ( )( ), b ( ) 7 y x + or y x +. a. Pulse rate is a function of age. b. Answers will vary. c. Max. pulse rate is 0 age. Let x age and P pulse rate. P 0.(0 x) d. P 0.7(0 x) e. P 0.(0 0) P 0.7(0 0) P 0.(70) P 0.7(70) P 8 P 9 f. 9 0.(0 x) 0.7(0 x) 90 0 x 90 0 x x 0 x 0. The fixed cost is the $00 in fees; the variable cost per dollar is.%, or 0.0. Cost function is C 0.0x + 00 (C in $).. (, ) and (, ); slope 7 7 ; b ( )(), b ; y x + 7. (, ) and (, ); slope ; b (), b ; y x 9. (, ) and (, ); slope ; b ( )(), b 9; y x + 9. slope ; b ; F 9 C +,000,8. slope. 7 ; b,000.7(0), b 7; 0 00 C.70x + 7, C in $; fixed cost is $7, variable cost per pair is $.70. Copyright by Houghton Mifflin Company. All rights reserved.

12 Inequalities, Functions, and Linear Functions. Let y cost in $ and x size in inches; points are (, 0.99) and (6,.99); slope 0.; b (), b.0; y 0.x.0 6 If x 8, y 0.(8).0 $ Let y cost in $ and x pounds; points are (7,.99) and (6, 8.99); slope ; b (7), b.66; y x +.66 If x 0, y (0) +.66 $ Let y cost in $ and x year; points are (00, 900) and (00, 6000); slope ; b 900 (00), b 066; y x 066 If x 008, y (008) 066 $77.. Δx x (cups) y ($).9 Δy slope Average slope 0.6; working backwards in table y-intercept.; y 0.6x +.. Δx 0 0 x (#) y ($) Δy slope Copyright by Houghton Mifflin Company. All rights reserved.

13 CHAPTER Average slope 0.0; working backwards in table y-intercept 6.99; y 0.0x ;. 7. Δx x y Δy 8 7 Δx x y Δy 9 7 slope ; b 8 () slope ; b 9 () 7 y x y x Δx x y Δy slope 6; b 6() y 6x Copyright by Houghton Mifflin Company. All rights reserved.

14 Inequalities, Functions, and Linear Functions.. a: y x + a: y x + b: y x + b: y x Exercise.. m 0 ( ) 0 ( ) 0 ; undefined; x. m 0 ; y ( ) 6. y 0x ; y 7. x 9. y 0x + 0; y 0. y b names the vertical intercept.. a. x y ( x) b. y x + y x y 6 + x y + y x + y + y x x + 6 y 6 + x x x 6 y or y 6 x 0 Lines are perpendicular; zero slope vs. undefined slope.. a. x 6y b. x y x x 6 6y 6 x + x + y x + x + x x 6 y or y 6 6x + y or y 6x + Lines are perpendicular; slopes are negative reciprocals. 7. a. x b. y x + y y y x + y y 0 x or x 6 Copyright by Houghton Mifflin Company. All rights reserved.

15 CHAPTER Lines are parallel; same slope - both undefined. 9. a. y + x b. y (x ) y + x x x y x y x + Lines are neither parallel nor perpendicular.. C 78x, C 98x, C 08x; not parallel, different slopes. V x, V x, V x; parallel lines, same slope. If postage cost is $0.9 per stamp, C 00(0.9)x 9.00x; C 0(0.9)x 9.0x; C 0(0.9)x 7.80x; not parallel, different slopes In exercises 7 to, change to ymx + b form (where necessary) to find the slope of the original equation before solving the problem. 7. x + y 6 9. y x + y x + 6 Perpendicular line has negative y x + reciprocal slope. Parallel line has same slope. slope y-intercept is (0, 0) y-intercept is (0, 0) y x y x. y 8 x. x y Perpendicular line has negative x y reciprocal slope. y x 8 slope Parallel lines have same slope. 8 b ( )() b ( )( ) 8 y x + y x +. x y 8 x 8 y y x Perpendicular lines have negative reciprocal slope. Copyright by Houghton Mifflin Company. All rights reserved. 7

16 Inequalities, Functions, and Linear Functions slope b ( )() y x 7. Starting at (, ) and moving clockwise around the figure:,,, Opposite lines are parallel (same slope) and adjacent lines are perpendicular (negative reciprocal slopes). 9. a. b. Diagonals are perpendicular (negative reciprocal slopes). Opposite sides should have the same slopes and adjacent sides should have negative reciprocal slopes.,,, ( ) ( ), ; not a rectangle; ( ),, ; rectangle. y 0.x 0.; r. $0.0 is added to the price for each quarter-inch increase in diameter. Each ordered pair exactly fits the price increase rule. Note that 0.0 to is the same as 0.0 to, which is the slope. 8 Copyright by Houghton Mifflin Company. All rights reserved.

17 CHAPTER 7. y 0.x +.9, x in oz, y in $ 9. Equation will approximate: y 0.x.9 Exercise.6. Domain R, Range y. Domain R, Range y. Constant function; output is always $. 7. Constant function; output is always $ Constant function; output is always.. Identity function; output equals input. Copyright by Houghton Mifflin Company. All rights reserved. 9

18 Inequalities, Functions, and Linear Functions. a. is an identity. b. a(b + c) ab + ac is an identity. c. a(b c) ab bc is neither. d. f(x) x a x is neither. e. h(n) n is an identity function.. a. f(x) f(x) x 0 0 b. f(0) f() c. x 7. a. c, r 6 {, 8} b. c, r {, } c. c, r { 8, } 9. c is the center and r is the distance (radius) to the solutions; if r 0, then x c; if r 0, then the circle is a point. 0 Copyright by Houghton Mifflin Company. All rights reserved.

19 CHAPTER. V at origin. V at x Domain: (, ), Range: (, 0] Domain: (, ), Range: (, 0]. V at x 7. V at x 0 Domain: R, Range: y 0 Domain: R, Range: y 9. V at x. V at x 0 Domain: R, Range: y 0 Domain: R, Range: y. a. { 6, } b. {, } c. { } d. no solution. a. slope is b. slope is c. y-intercept is, input is 0 d. y x +, x > Copyright by Houghton Mifflin Company. All rights reserved.

20 Inequalities, Functions, and Linear Functions e. f( ) ( ) + 0 f. m ; y x, x < ( 6) g. f( ) ( ) 0 h. Set x + 0 and solve for x. 7. a. {, } b. no solution c. {, } d. {0, } 9. x. x + x or x x + or x + {±} x or x {, }. x. x x or x x or x x 7 or x x 6 or x {, 7} {, 6} 7. a., x + ; abs(x + ) b., x + ; abs(x) + c., x + ; (abs(x+)) d., ; (abs(x) + ) x + 9. a mi b. 0 8 mi D x x. a. Dot graph, partial pages not possible. a. Step graph, partial hrs appropriate b. b. Copyright by Houghton Mifflin Company. All rights reserved.

21 CHAPTER. a. Dot graph, no partial skaters 7. a. Step graph, partial min. appropriate b. Note: Dots in graph appear as a solid line b. due to selection scale on x-axis. 9. part of an hour, portion of a minute Review Exercises. The vertical-line test is used to find out if a graph is a function. The two-output test is used on a table to see if it is a function.. A dot graph has only integer inputs.. Limits on inputs due to an application setting represent the relevant domain. 7. A linear function is a set of data with a constant slope. 9. A function for which the output exactly matches the input is an identity function.. A function with a zero or positive output for any real-number input is the absolute value function. (Note: squaring function is not in the list.). The ways to describe a set of numbers are inequality, compound inequality, interval, line graph. The ways to find a linear equation are point-slope, slope-intercept, arithmetic sequence, table, linear regression. 7. a. 8 < x ; ( 8, ] b. < x < ; (, ) c. < x < 7; (, 7) d. x > ; (, ) Copyright by Houghton Mifflin Company. All rights reserved.

22 Inequalities, Functions, and Linear Functions e. x > 0; (0, ) f. x 0; [0, ) 9. a. 6. x. b. y c. not a function Note: the values in part a are estimated.. a. R b. y 0 c. function. a. f(0) b. f() c. f( ) d. f() 8 e. f() f. x g. none h. x i. j. R k. y > 0. f() () () + 7. f(0.) (0.) (0.) + f() + f(0.) f() 0 f(0.) 0 9. f( ) ( ) ( ) +. f( ) ( ) ( ) + f( ) f( ). slope is negative reciprocal, a. y-intercept is 0; y x b. b ( )(), b ; y x + Ordered Pairs. (, ) (, ) 7. (, ) (0, 0) 9. (, ) (, ). (, ) (, ) Slope Equation Hor/Ver x-intercept y- intercept b ( )(), b y x + neither 0 x + x y 0 b 0 neither x 0 y 0 0 y x b () neither 0 x + y b x y x + y horiz. no x- y 0 intercept Copyright by Houghton Mifflin Company. All rights reserved.

23 CHAPTER. Ex. and 7 are parallel.. a. y 0.06x b. slope $0.06 tax/$ purchased; y-intercept 0, no tax on $0 purchases 7. a. y x + 00 b. slope $/hour of repair; y-intercept $00, basic inspection cost Exercise 9 used LinReg on a graphing calculator to find the equation. The solution is given for reference only. 9. y,8 x. Δx (ft) & 6; Δy ($) 6.0 & 9; slopes are & using the first data set: b.0.0(), b 8; y.0x + 8. Δx, Δy ; working backwards when x 0, y + ; y x +. C $0; constant function (monthly pass does not depend on x) 7. C 8.9x; C in $; increasing function (as x increases, C increases) 9. V 0 x; V in $; decreasing function (as x increases, V decreases) 6. Let x # of people, y total cost; y 8 for 0 < x 0; y 8 +.7(x 0) for x > 0, inputs are positive integers only, dot graph 6. Let x # of hrs; y cost; y 6 for 0 < x ; y 6 + 9(x ) for x > ; inputs may be any non-negative number, step graph 6. a. x b. x x or x x or x Copyright by Houghton Mifflin Company. All rights reserved.

24 Inequalities, Functions, and Linear Functions x or x x or x {, } {, } c. x 0 d. x x 0 absolute value is always positive x { } or {} 67. domain R; range domain R; range y 0 7. domain R; range R 7. domain R; range y 7. x x or x x 7 or x {, 7} 77. a: y x + b: y x 6 Chapter Test. a. x ; (, ] b. < x < ; (, ) c. R; (, ). a. not a function, one input has two outputs b. function 6 Copyright by Houghton Mifflin Company. All rights reserved.

25 CHAPTER c. function d. not a function, one input has two outputs. a. f( ) ( ) ( ) b. f(0) (0) (0) f( ) + f(0) 0 0 f( ) f(0) c. f() () () f() f(). a. slope 7 b. b ( 7 )( ), b 7 ; y 7 x + 7 c. parallel line same slope: 7 d. perpendicular line negative reciprocal slope: 7 ; b ( 7 ), b 8; y 7 x 8. a. The slope of a horizontal line is zero. b. A line that falls from left to right has a negative slope and is said to be a decreasing function. c. If the slope of a graph between all pairs of points is constant, the graph is a linear function. d. A horizontal linear graph is also called a constant function. e. Linear equations have a constant slope. f. The set of inputs to a number pattern is the positive integers or natural numbers. 6. a. y 7x +.0, y in $ b. Slope is $7 per mile. 7. a. Reasonable inputs and output would be non-negative numbers; x number of batteries, y cost in dollars. b. (,.9), (6, 8.99) c. slope 0. 7, b.9 0.7(), b.9; y 0.7x d. If x 8, y 0.7(8) Would recommend $.9. e. 8 is not half way between the given amount of batteries ( and 6). 8. From LinReg on graphing calculator: y 0.x.8 Copyright by Houghton Mifflin Company. All rights reserved. 7

26 Inequalities, Functions, and Linear Functions 9. a. Δy 8, next number is + 8 0; when x 0, y 0 8 ; y 8x +. b. Δy 7, next number is + 7 9; when x 0, y 6 7 ; y 7x. 0. y x -. y x ( ) Copyright by Houghton Mifflin Company. All rights reserved.

27 CHAPTER 6. Transcript 6 Copies Cost $ 7 9 Points should not be connected; only whole copies are reasonable. 7. x + x + or x + x or x 7 { 7, } Cumulative Review Chapters and. Input Input Output Output Output x y xy x + y x y ( )() ( )(7) ( ) ( ) 6 ( ) 6 + ( ) ( ) 7 ( ) 6 ( )( 6) 6 7 ( 6) 7 ( ) ( )( ) 0 7 ( ) ( ) ()( ) 6 ( ) 7 9 ()( 9) 8 7 ( 9) Copyright by Houghton Mifflin Company. All rights reserved. 9

28 Inequalities, Functions, and Linear Functions. a. Two numbers, n and n, that add to zero are opposites. b. Two numbers or expressions, a and b, that are multiplied to obtain the product ab are factors. c. Two numbers, n and n, that multiply to are reciprocals. d. Removing a common factor from two or more terms is factoring. e. Collections of objects or numbers are sets.. Factoring ab + ac changes a sum to a product. 7. To divide real numbers, we may change division to multiplication by the reciprocal. 9. a(b + c) b(a + c) + c(a b) ab + ac ab bc + ac bc ac bc. π( ft) 6.π ft. 6 + x 6 does not simplify.. x (6 x) 7. x x + x 0 x x x x + x 0 x x x x f(x) x + ( ) x f(x) x ( ) 0 (0) 0 () () 60 Copyright by Houghton Mifflin Company. All rights reserved.

29 CHAPTER. slope ( ) ; b ( ) ( 6) ; y x. Slope is negative reciprocal or ; b 0; y x. 7. Next pair is (, ); f(x) x. 9. Next pair is (, ); f(x).. Let x number of workers and y cost in $; y 6x a. { } b. {, } c. {, } d. {, } e. { } Copyright by Houghton Mifflin Company. All rights reserved. 6

( ) ( ) SECTION 1.1, Page ( x 3) 5 = 4( x 5) = 7. x = = = x x+ 0.12(4000 x) = 432

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