If two lines are parallel then they have the same slope. Consider - - PowerPoint PPT Presentation

▶

Jun 23, 2023 41 likes •175 views

D AY 27 S LOPE CRITERIA OF SPECIAL LINES I NTRODUCTION Two lines which intersect at a right angle are said to be perpendicular. If two or more lines on the same plane do not meet, they are said to be parallel. The slopes of parallel are

SLIDE 1

DAY 27 – SLOPE CRITERIA OF

SPECIAL LINES

SLIDE 2

INTRODUCTION

Two lines which intersect at a right angle are said to be perpendicular. If two or more lines on the same plane do not meet, they are said to be

parallel. The slopes of parallel are equal while the

product of that of perpendicular lines is a negative

In this lesson, we will prove these properties.

SLIDE 3

VOCABULARY

 Slope of a Line

This is a number that measures steepness of a line.

SLIDE 4

If two lines are parallel then they have the same

slope. Consider the figure below.

SLIDE 5

Line MN has translated zero units horizontally and 4 units vertically downwards to line 𝑁′𝑂′. If 𝑏 represents one unit, then point P 𝑦1,𝑧1 becomes 𝑄′ 𝑦1,𝑧1 − 4𝑏 and point Q 𝑦2, 𝑧2 becomes 𝑅′ 𝑦2, 𝑧2 − 4𝑏 since line MN is translated 4 units downwards. We show that Lines MN and 𝑁′𝑂′ have equal slopes.

SLIDE 6

Proof We want to prove that the slope of MN is equal to the slope of 𝑁′𝑂′.

 Slope of MN =

∆𝑧 ∆𝑦

=

𝑧2−𝑧1 𝑦2−𝑦1

Slope of 𝑁′𝑂′ =

∆𝑧 ∆𝑦

=

𝑧2−4𝑏− 𝑧1−4𝑏 𝑦2−𝑦1

=

𝑧2−4𝑏+𝑧1+4𝑏 𝑦2−𝑦1

=

𝑧2−𝑧1 𝑦2−𝑦1

Thus, Slope of MN = Slope of 𝑁′𝑂′

SLIDE 7

 Example 1

Line AB is parallel to CD. Line AB passes through points R(4,9) and S(2,3) while CD passes through C(0,11) and D(-2,5). Compare the slopes of CD and AB?

 Solution

Slope of AB =

9−3 4−2 = 6 2 = 3

Slope of CD =

5−11 −2−0 = 6 2 = 3

They have the same slope. The product of the slopes of two perpendicular lines is -1. Consider the figure below. One unit represents a.

SLIDE 8

SLIDE 9

Two perpendicular lines KL and ST intersect at point V. The product of their slopes is -1.

 Proof

Slope of ST =

𝑧1+2𝑏−𝑧1 𝑦1+2𝑏−𝑦1 = 2𝑏 2𝑏 = 1

Slope of KL =

𝑧1+2𝑏−𝑧1 𝑦1+2𝑏−𝑦1+4𝑏 = 2𝑏 −2𝑏 = -1

Slope of ST × Slope of KL = 1 × -1 = -1 Thus the product of the two lines is -1.

SLIDE 10

 Example 2.

Line AB passes through points A(4,2) and B(2,1). If another line ST is perpendicular to AB, and passes through (-2,4) and (-3,6) what is the slope of AB and ST? What is the product of their slope? Solution Slope of AB =

∆𝑧 ∆𝑦

=

2−1 4−2 = 1 2

Slope of ST =

∆𝑧 ∆𝑦

=

6−4 −3−−2 = 2 −1 = −2

The product is −2 ×

1 2 = −1.

SLIDE 11

HOMEWORK

1.

Lines HL and JK are parallel. Line HL passes through points H(3,4) and L(7,9). What is the slope of line JK? If line HL is perpendicular to line MN and passes through M(7,1) and N(12,-3) , What is the slope of line MN? What is the product of the slopes of lines MN and JK?

SLIDE 12

ANSWERS TO HOMEWORK

1.

Slope of line JK =

5 4

Slope of line MN =

−4 5

The product is -1.

SLIDE 13

DAY 27 – SLOPE CRITERIA OF

SPECIAL LINES

INTRODUCTION

Two lines which intersect at a right angle are said to be perpendicular. If two or more lines on the same plane do not meet, they are said to be

product of that of perpendicular lines is a negative

In this lesson, we will prove these properties.

VOCABULARY

 Slope of a Line

This is a number that measures steepness of a line.

If two lines are parallel then they have the same

Proof We want to prove that the slope of MN is equal to the slope of 𝑁′𝑂′.

 Slope of MN =

∆𝑧 ∆𝑦

=

𝑧2−𝑧1 𝑦2−𝑦1

Slope of 𝑁′𝑂′ =

∆𝑧 ∆𝑦

=

𝑧2−4𝑏− 𝑧1−4𝑏 𝑦2−𝑦1

=

𝑧2−4𝑏+𝑧1+4𝑏 𝑦2−𝑦1

=

𝑧2−𝑧1 𝑦2−𝑦1

Thus, Slope of MN = Slope of 𝑁′𝑂′

 Example 1

Line AB is parallel to CD. Line AB passes through points R(4,9) and S(2,3) while CD passes through C(0,11) and D(-2,5). Compare the slopes of CD and AB?

 Solution

Slope of AB =

9−3 4−2 = 6 2 = 3

Slope of CD =

5−11 −2−0 = 6 2 = 3

They have the same slope. The product of the slopes of two perpendicular lines is -1. Consider the figure below. One unit represents a.

Two perpendicular lines KL and ST intersect at point V. The product of their slopes is -1.

 Proof

Slope of ST =

𝑧1+2𝑏−𝑧1 𝑦1+2𝑏−𝑦1 = 2𝑏 2𝑏 = 1

Slope of KL =

𝑧1+2𝑏−𝑧1 𝑦1+2𝑏−𝑦1+4𝑏 = 2𝑏 −2𝑏 = -1

Slope of ST × Slope of KL = 1 × -1 = -1 Thus the product of the two lines is -1.

 Example 2.

Line AB passes through points A(4,2) and B(2,1). If another line ST is perpendicular to AB, and passes through (-2,4) and (-3,6) what is the slope of AB and ST? What is the product of their slope? Solution Slope of AB =

∆𝑧 ∆𝑦

=

2−1 4−2 = 1 2

Slope of ST =

∆𝑧 ∆𝑦

=

6−4 −3−−2 = 2 −1 = −2

The product is −2 ×

1 2 = −1.

HOMEWORK

1.

Lines HL and JK are parallel. Line HL passes through points H(3,4) and L(7,9). What is the slope of line JK? If line HL is perpendicular to line MN and passes through M(7,1) and N(12,-3) , What is the slope of line MN? What is the product of the slopes of lines MN and JK?

ANSWERS TO HOMEWORK

1.

Slope of line JK =

5 4

Slope of line MN =

−4 5

The product is -1.

THE END