parallel and perpendicular lines t€¦ · chapter 5 158 5-6 parallel and perpendicular lines 1....
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![Page 1: Parallel and Perpendicular Lines t€¦ · Chapter 5 158 5-6 Parallel and Perpendicular Lines 1. Circle the product of a number and its reciprocal. 100 1 0 21 2. Circle the pairs](https://reader036.vdocument.in/reader036/viewer/2022071006/5fc3bf4c5f394e71eb5dc925/html5/thumbnails/1.jpg)
Two distinct lines in a coordinate plane either intersect or are parallel. Parallel lines are lines in the same plane that never intersect. You can determine the relationship between two lines by comparing their slopes and y-intercepts. KEY CONCEPT: SLOPES OF PARALLEL LINES Nonvertical lines are parallel if they have the same slope and different y-intercepts. Vertical lines are parallel if they have different x-intercepts. The graphs of ! = #
$ % + 1 and ! = #$ % − 2 are lines that have the same
slope, ½, and different y-intercepts. Therefore, these lines are parallel. You can use the fact that the slopes of parallel lines are the same to write the equation of a line parallel to a given line. PROBLEM 1: WRITING AN EQUATION OF A PARALLEL LINE Write an equation in slope-intercept form of the line that passes through the given point and is parallel to the graph of the given equation. 1. (12,5); ! = $
/ % − 1 2. (−3,−1); ! = 2% + 3 3. (1, −3); ! + 2 = 4(% − 1) 4. (4,2); % = −3 5. (1,5); ! = −2
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Chapter 5 158
5-6 Parallel and Perpendicular Lines
1. Circle the product of a number and its reciprocal.
100 1 0 21
2. Circle the pairs of numbers that are reciprocals.
7 and 17 1 and 21 0 and 012 23
4 and 243
Vocabulary Builder
parallel (adjective) PA ruh lel
Related Word: perpendicular (adjective)
Math Usage: Lines that are parallel are lines in the same plane that never intersect.
Using symbols: *AB) 6 *CD) means line AB is parallel to line CD.
Example: The stripes on the American flag are parallel.
Use Your Vocabulary
Picture A Picture B Picture C
Complete each sentence with parallel or perpendicular.
3. The railroad tracks in Picture A are 9.
4. The window bars in Picture B that do NOT meet are 9.
5. The roads in Picture C are 9.
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6. Write an equation for the line that is parallel to the given line and that passes through the given point. You can use slope to determine whether two lines are perpendicular. Perpendicular lines are lines that intersect to form right angles. KEY CONCEPT: SLOPES OF PERPENDICULAR LINES Two nonvertical lines are perpendicular if the product of their slopes is -1. A vertical line and a horizontal line are also perpendicular. The graph of ! = #
$ % − 1 has a slope of ½ . The graph of ! = −2% + 1 has a
slope of -2. Since #$ (−2) = −1, the lines are perpendicular. Two numbers whose product is -1 are opposite reciprocals. So, the slopes of perpendicular lines are opposite reciprocals of each other. To find the opposite reciprocal of −/
2, for example, first find the reciprocal, −2/.
Then write its opposite, 2/. Since −/2 3
2/4 = −1, 2/ is the opposite reciprocal of −/
2. PROBLEM 2: WRITING THE EQUATION OF A PERPENDICULAR LINE Write an equation in slope-intercept form of the line that passes through the given point and is perpendicular to the graph of the given equation. 7. (2,4); ! = #
/ % − 1 8. (1,8); ! = 2% + 1 9. (5,0); ! + 1 = −3(% − 4)
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10. (−3,2); 2% + 3! = 7 11. (1,2); % = 4 12. Write an equation for the line that is perpendicular to the given line and that passes through the given point. PROBLEM 3: CLASSIFYING LINES Determine whether the graphs of the given equations are parallel, perpendicular, or neither. 13. 4! = −5% + 12 14. ! = /
2 % + 7 15. % + 6! = 6
and ! = 29 % − 8 and 4% − 3! = 9 and ! = − #
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PROBLEM 4: SOLVING A REAL-WORLD PROBLEM 16. A path for a new city park will connect the park entrance to Park Road. The path should be perpendicular to Park Road. What is an equation that represents the path? 17. A bike path is being planned for the park. The bike path will be parallel to Park Road and will pass through the park entrance. What is an equation of the line that represents the bike path?
Lesson 6-6 Parallel and Perpendicular Lines 345
You can use the negative reciprocal of the slope of a given line to write anequation of a line perpendicular to that line.
Writing Equations for Perpendicular Lines
Multiple Choice Which equation describes a line that contains (0,- 2) and isperpendicular to y = 5x + 3?
y = 5x - 2 y = y = y =
Step 1 Identify the slope of Step 2 Find the negative reciprocal the given line. of the slope.
y = 5x + 3 The negative reciprocal of 5 is .c
slope
Step 3 Use the slope-intercept form to write an equation.
y = mx + b
y = x + (- 2) Substitute for m, and – 2 for b.
y = x - 2 Simplify.
The equation is y = - 2. So D is the correct answer.
Write an equation of the line that contains (1, 8) and is perpendicular to y = + 1.
You can use equations of parallel and perpendicular lines to solve some real-world problems.
Urban Planning A bike path for a new city park will connect the park entrance toPark Road. The path will be perpendicular to Park Road. Write an equation for theline representing the bike path.
Step 1 Find the slope m of Park Road.
m = = = = 2 Points (2, 1) and (4, 5) are on Park Road.
Step 2 Find the negative reciprocal of the slope.
The negative reciprocal of 2 is So the slope of the bike path is The y-intercept is 4.
The equation for the bike path is y = + 4.
A second bike path is planned. It will be parallel to Park Road and will alsocontain the park entrance. Write an equation for the line representing this bike path. y ≠ 2x ± 4
44Quick Check2
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EXAMPLEEXAMPLE Real-World Problem Solving44
34 x33Quick Check
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5 x 1 215 x 2 2
EXAMPLEEXAMPLE33
ConnectionReal-World
Careers Urban planners usemathematics to makedecisions on communityproblems such as trafficcongestion and air pollution.
y ≠ – x ± 913
43
Test-Taking Tip
1 A B C D E
2 A B C D E
3 A B C D E
4 A B C D E
5 A B C D E
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After finding theslopes of theperpendicular lines,multiply the twoslopes as a check.
5(215) 5 21
345
Error Prevention
Students may think that anegative reciprocal is alwaysnegative. Tell students that the phrase negative reciprocalactually means the negative ofthe reciprocal. So they are reallyjust finding the opposite of thereciprocal.
Additional Examples
Find an equation of the line that contains (6, 2) and isperpendicular to y = -2x + 7. y ≠ x – 1
The line in the graph representsthe street in front of a new house.The point is the front door. Thesidewalk from the front door willbe perpendicular to the street.Write an equation representingthe sidewalk. y ≠ x – 3
Resources• Daily Notetaking Guide 6-6• Daily Notetaking Guide 6-6—
Adapted Instruction
Closure
Ask: Compare the equations of non-vertical parallel lines.Parallel lines have the sameslope, but different y-intercepts.Compare the equations ofperpendicular lines.Perpendicular lines have slopesthat are negative reciprocals ofeach other. They will have thesame y-intercept only if that iswhere the two lines intersect.
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Name__________________________________________________________ Period_________5-6PracticeWorksheetFindtheslopeofalineparalleltothegraphofeachequation.1. 2. Arethegraphsofthelinesineachpairparallel?
3. 4.
5.Writeanequationforthelinethatisparallelto andpassesthrough .Findtheslopeofalineperpendiculartothegraphofeachequation.
6. 7. 8.Writeanequationforthelinethatisperpendicularto andpassesthrough .9.Acity’scivilengineerisplanninganewparkinggarageandanewstreet.ThenewstreetwillgofromtheentranceoftheparkinggaragetoHandelSt.ItwillbeperpendiculartoHandelSt.Whatistheequationofthelinerepresentingthenewstreet?
7x − y = 5 y = 5
y = 13x +3
x −3y = 6
y = 4x +12−4x +3y = 21
y = − 23x +12 5,−3( )
y = − x5− 7 y = −8
−10x +8y = 3 15,12( )
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Tellwhetherthelinesforeachpairofequationsareparallel,perpendicular,orneither.
10. 11. 12.
13. 14. 15.Forwhatvalueofkarethegraphsof and parallel?16.Forwhatvalueofkarethegraphsof and perpendicular?17.AparallelogramhasverticesA(0,2),B(2,-1),C(6,3),andD(p,q).Whichofthefollowingorderedpairshaspossiblevaluesfor(p,q)?(a)(0,6) (b)(6,1) (c)(4,6) (d)(6,4)18.Supposethelinethroughpoints(x,6)and(1,2)isparalleltothegraphof .Findthevalueofx.Showyourwork
y = 4x + 34
y = − 14x + 4
3x − 5y = 3−5x +3y = 8
y = x3− 4
y = 13x + 2
ax − by = 5−ax + by = 2
ax + by = 8bx − ay =1
3x +12y = 8 6y = kx − 5
3x +12y = 8 6y = kx − 5
2x + y = 3