Download - Www.mathsrevision.com APP 1.1 Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

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Page 1: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

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APP 1.1

www.mathsrevision.comwww.mathsrevision.com

Straight LineApplications 1.1

Distance FormulaThe Midpoint Formula

Prior Knowledge

Collinearity

Gradients of Perpendicular Lines Median, Altitude & Perpendicular Bisector

Exam Type Questions

m = tan θ

Mindmap

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Where is Straight Line Theory

Used in Higher

Recurrence Relations

Circle

Differentiation

Logs & Exponential

s

Vector

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Straight Liney = mx + c

2 1

2 1

y ym

x x

m = tan θθ

Possible values for gradient

m > 0

m < 0

m = 0

m = undefined

2 22 1 2 1( ) ( )D x x y y

For Perpendicular lines the following is

true.m1.m2 = -1

Parallel lines have

same gradient

1 2 1 2,2 2

x x y y

Mid

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APP 1.1

Straight Line FactsStraight Line Facts

Y – axis Intercept

2 1

2 1

y - yGradient =

x - x

y = mx + c

Another version of the straight line formula is

ax + by + c = 0

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APP 1.1

QuestionsQuestions

Find the gradient and y – intercept for equations.

(a) 4x + 2y + 10 = 0

(b) 3x - 5y + 1 = 0

(c) 4 - x – 3y = 0

m = -2 c = -5

m = 3/5 c = 1/5

m = - 1/3 c = 4/3

Demo

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APP 1.1

=

The Equation of the Straight LineThe Equation of the Straight Liney – b = m (x - a)

The equation of any line can be found if we know

the gradient and one point on the line.

O

y

x

x - a

P (x, y)

m

A (a, b)y - by - b

x – a

m =y - b

(x – a)m

Gradient,

mPoint (a,

b)

y – b = m ( x – a ) Point on the line ( a, b )

a x

y

b

Demo

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Higher Outcome 1

Apr 20, 2023www.mathsrevision.com 7

m < 0

m > 0

m = 0

x = a

y = c

Sloping left to right up has +ve gradient

Sloping left to right down has -ve gradient

Horizontal line has zero gradient.

Vertical line has undefined gradient.

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Higher Outcome 1

Apr 20, 2023www.mathsrevision.com 8

m > 0

Lines with the same gradient

means lines are Parallel

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APP 1.1

Straight Line TheoryStraight Line Theory

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APP 1.1

Straight Line TheoryStraight Line Theory

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APP 1.1

Straight Line TheoryStraight Line Theory

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APP 1.1

Straight Line TheoryStraight Line Theory

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APP 1.1

Find the equation of the straight line which is parallel to the

line with equation and which passes through

the point

(2, –1) .

Find gradient of given line:

Knowledge: Gradient of parallel lines are the same.

Therefore for line we want to find has gradient

2

3m

Find equation: Using y – b =m(x - a)

3 2 1 0 y x

2 3 5x y

2 2

3 33 2 5 5y x y x m

Typical Exam Typical Exam QuestionsQuestions

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APP 1.1

HHM Book Practice

HHM Ex1A

HHM Ex1B Q4 , Q5

HHM Ex1E

HHM Ex1G Q1 , Q2

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APP 1.1

Distance FormulaDistance FormulaLength of a straight lineLength of a straight line

A(x1,y1)

B(x2,y2)

x2 – x1

y2 – y1

C

x

y

O

This is just

Pythagoras’ Theorem

2 2 2(AB) =(AC) +(BC)

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APP 1.1

Distance FormulaDistance Formula

The length (distance ) of ANY line can be given by the formula :

2 22 1 2 1(x ) (y ) ABD x y

Just Pythagoras Theorem in

disguiseDemo

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APP 1.1

2 2AB 2 1 2 1(x ) (y ) D x y

2√26

8√22√26Isosceles Triangle !

Demo

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APP 1.1

HHM Book Practice

HHM Ex12B

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APP 1.1

Mid-Point of a lineMid-Point of a line

A(x1,y1)

B(x2,y2)

x

y

O

1 2 1 2,2 2

AB

x x y yM

x1 x2

M

y1

y2

The mid-point (Median)

between 2 points is given by

Simply add both x coordinates together

and divide by 2.

Then do the same with the y

coordinates.

Online Demo

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APP 1.1

1 21 2 , ,2 2

y yx xM

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APP 1.1

HHM Book Practice

Use Show me boards

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Higher Outcome 1

Apr 20, 2023www.mathsrevision.com 22

m = tan θ

The gradient of a line is ALWAYS

equal to the tangent of the angle

made with the line and the positive x-axisθ

θO

A

H

m = V

H

O

A=

O

Atan θ =

0o ≤ θ < 180o

Demo

Page 23: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

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APP 1.1

m = tan m = tan θθ

60o

60o

m = tan 60o = √3

Page 24: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

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APP 1.1

m = tan m = tan θθ

y = -2x

m = tan θ

θ = tan-1 (-2)

θ = 180 – 63.4

θ = 116.6o

Page 25: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

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APP 1.1

Find gradient of the line:

1tan

3

Use table of exact values1 1

tan 303

2 ( 1) 3 1

3 3 0 3 3 3m

tanm

Find the size of the angle a° that the line

joining the points A(0, -1) and B(33, 2)

makes with the positive direction of the x-

axis.

Exam Type QuestionsExam Type Questions

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APP 1.1

The line AB makes an angle of 60o with

the y-axis, as shown in the diagram.

Find the exact value of the gradient of AB.

Find angle between AB and x-axis: 090 60 30o o

Use table of exact values

tanm tan 30om

1

3m

(x and y axes are perpendicular.)

Typical Exam Typical Exam QuestionsQuestions

60o

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APP 1.1

The lines and

make angles of a and b with the positive direction of the x-axis, as shown in the diagram.

a) Find the values of a and b

b) Hence find the acute angle between the two given lines.

2m

Find supplement of b 180 135 45

2 4y x 13x y

2 4y x

13x y 1m

Find a° tan 2 63a a

Find b° tan 1 135b b

angle between two lines

Use angle sum triangle = 180°

72°

Typical Exam Typical Exam QuestionsQuestions

45o

72o

63o 135o

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APP 1.1

HHM Book Practice

HHM Ex1A Q9 , Q10

HHM Ex1B Q6 , Q7 , Q10

HHM Ex1D Q7

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APP 1.1

Gradient of perpendicular linesGradient of perpendicular lines

If 2 lines with gradients m1 and m2 are perpendicular then m1 × m2

= -1 When rotated through 90º about the origin A (a, b) → B (-b, a)

-aB(-b,a)

-b

A(a,b)

aO

y

x

- 0

- 0 OA

b bm

a a

- 0-

- - 0 OB

a am

b b

- -1-

OA OB

b a abm m

a b ab

Conversely:

If m1 × m2 = -1 then the two lines with gradients m1 and m2 are perpendicular.

-b

Investigation

Demo

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APP 1.1

HHM Book Practice

HHM Ex1D

HHM Ex1F

HHM Ex1G Q3 – Q5

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Higher Outcome 1

A

B C

D

Apr 20, 2023 31www.mathsrevision.com

AMedian means a line

from a vertex to

the midpoint of the base.

Altitude means a perpendicular line

from a vertex to the base.

B D C

Demo

Demo

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Higher Outcome 1

Apr 20, 2023 32www.mathsrevision.com

A

B D C

Perpendicular bisector - a line that cuts another line

into two equal parts at an angle of 90o

Demo

Page 33: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

Finding the Equation of an Altitude

A

BTo find the equation of an altitude:

• Find the gradient of the

side it is

perpendicular to ( ).

mAB C

• To find the gradient of the altitude, flip the

gradient

of AB and change from positive to negative:maltitude = mAB

–1

• Substitute the

gradient

and the point C

intoy – b = m ( x – a )

ImportantWrite final equation in the

formA x + B y + C = 0with A x

positive.

Common Straight Strategies for Exam Questions

Page 34: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

Finding the Equation of a Median

P

Q

To find the equation of a median:

• Find the midpoint of the

side itbisects, i.e. O

• Calculate the gradient of the

median OM.• Substitute the gradient and

either

point on the line (O or M)

intoy – b = m ( x – a )

ImportantWrite answer in the

formA x + B y + C = 0with A x

positive.=

=M

( )

M = 2

y2 y1 2

x2 x1 ,+ +

Common Straight Strategies for Exam Questions

Page 35: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

Any number of lines are said to be concurrent if there is a point through which they all

pass.For three lines to be concurrent,

they must all pass through a single point.

Demo

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APP 1.1

HHM Book Practice

HHM Ex1I

HHM Ex1K

HHM Ex1M

HHM Ex1N

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APP 1.1

CollinearityCollinearity

A

C

x

y

O x1 x2

B

Points are said to be collinear

if they lie on the same straight.

The coordinates A,B C are collinear since they lie on

the same straight line.

D,E,F are not collinear they do not lie on the

same straight line.

D

EF

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APP 1.1

Straight Line TheoryStraight Line Theory

2 1

2 1

y ym

x x

PQ2 1

m 15 4

QR4 2

m 17 5

Since mPQ = mQR and

they have a point in common Q

PQR are collinear.

DPQ=√2DPQ=2√2 Ratio

DPQ:DPQ

1:2

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APP 1.1

HHM Book Practice

HHM Ex1B Q1 – Q3

HHM Ex1O

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APP 1.1

Find the equation of the line which passes through the point

(-1, 3) and is perpendicular to the line with equation 4 1 0x y

Find gradient of given line: 4 1 0 4 1 4x y y x m

Find gradient of perpendicular:1

(using formula 1)1 24 m mm

Find equation:1 3

1 4( 3) 1 4 124 ( 1)

yx y x y

x

4 13 0y x

Typical Exam Typical Exam QuestionsQuestions

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APP 1.1

A and B are the points (–3, –1) and (5, 5).

Find the equation of

a) the line AB.

b) the perpendicular bisector of AB Find gradient of the AB: 4 3 5y x

Find mid-point of AB 1, 2

3

4m Find equation of AB

Gradient of AB (perp):4

3m

Use y – b = m(x – a) and point ( 1, 2) to obtain line of perpendicular bisector of AB we get

3 4 10 0 y x

Exam Type QuestionsExam Type Questions

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APP 1.1

A triangle ABC has vertices A(4, 3), B(6, 1)

and C(–2, –3) as shown in the diagram.

Find the equation of AM, the median from B

to C

Find mid-point of BC: 1 2 1 2(2, 1) Using M ,2 2

x x y y

Find equation of median AM

Find gradient of median AM

2 1

2 1

-2 Using

-

y ym m

x x

2 5 Using - ( - ) y x y b m x a

Typical Exam Typical Exam QuestionsQuestions

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APP 1.1

P(–4, 5), Q(–2, –2) and R(4, 1) are the vertices

of triangle PQR as shown in the diagram.

Find the equation of PS, the altitude from P.

Find gradient of QR:2 1

2 1

-1 Using

2 -

y ym m

x x

Find equation of altitude PS

Find gradient of PS (perpendicular to QR)

1 22 ( 1) m m m

2 3 0 Using ( ) y x y b m x a

Typical Exam Typical Exam QuestionsQuestions

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APP 1.1

Triangle ABC has vertices

A(–1, 6), B(–3, –2) and C(5, 2)

Find:

a) the equation of the line p, the median from C of triangle ABC.

b) the equation of the line q, the perpendicular bisector of BC.

c) the co-ordinates of the point of intersection of the lines p and q.

Find mid-point of AB

Find equation of p

2y

Find gradient of p(-2, 2)

Find mid-point of BC

(1, 0) Find gradient of BC

1

2m

0m

Find gradient of q 2m Find equation of q

2 2 y x

Solve p and q simultaneously for intersection

(0, 2)

Exam Type Exam Type QuestionsQuestions p

q

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APP 1.1

Triangle ABC has vertices A(2, 2), B(12, 2) and C(8, 6).

a) Write down the equation of l1, the perpendicular bisector of

AB

b) Find the equation of l2, the perpendicular bisector of AC.

c) Find the point of intersection of lines l1 and l2.

7, 2Mid-point AB

Find mid-point AC

(5, 4) Find gradient of AC2

3m

Equation of perp. bisector AC

Gradient AC perp.3

2m 2 3 23y x

Point of intersection (7, 1)

7x Perpendicular bisector AB

Exam Type Exam Type QuestionsQuestions l1

l2

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APP 1.1

A triangle ABC has vertices A(–4, 1), B(12,3) and C(7, –7).

a) Find the equation of the median CM.

b) Find the equation of the altitude AD.

c) Find the co-ordinates of the point of intersection of CM and AD

4, 2Mid-point AB

Equation of median CM using y – b = m(x – a)

Gradient of perpendicular AD

Gradient BC 2m 1

2m

Equation of AD using y – b = m(x – a)

3m Gradient CM (median)

3 14 0 y x

Solve simultaneously for point of intersection(6, -4)

2 2 0y x

Exam TypeExam TypeQuestionsQuestions

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APP 1.1

A triangle ABC has vertices A(–3, –3), B(–1, 1) and C(7,–3).

a) Show that the triangle ABC is right angled at B.

b) The medians AD and BE intersect at M.

i) Find the equations of AD and BE. ii) Find find the co-ordinates of M.

2m Gradient AB

Product of gradients

Gradient of median AD

Mid-point BC 3, 1 1

3m Equation AD

1

2m Gradient

BC1

2 12

Solve simultaneously for M, point of intersection

3 6 0y x

Hence AB is perpendicular to BC, so B = 90°

Gradient of median BE

Mid-point AC 2, 3 4

3m Equation

AD3 4 1 0y x

51,

3

Exam Type Exam Type QuestionsQuestions

M

Page 48: Www.mathsrevision.com APP 1.1  Straight Line Applications 1.1 Distance Formula The Midpoint Formula Prior Knowledge Collinearity Gradients.

Straight Liney = mx + c

2 1

2 1

y ym

x x

m = tan θθ

Possible values for gradient

m > 0

m < 0

m = 0

m = undefined

2 22 1 2 1( ) ( )D x x y y

For Perpendicular lines the following is

true.m1.m2 = -1

Parallel lines have

same gradient

m1.m2 = -1

1 2 1 2,2 2

x x y y

Mid

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APP 1.1

Are you on Target !

• Update you log book

• Make sure you complete and correct

ALL of the Straight Line questions in

the past paper booklet.