Presentation is loading. Please wait.

Presentation is loading. Please wait.

Unit 5 Writing the Equation of a Line

Published byJessica Jefferson Modified over 5 years ago

Similar presentations

Presentation on theme: "Unit 5 Writing the Equation of a Line"— Presentation transcript:

1 Unit 5 Writing the Equation of a Line
HSA ALGEBRA Unit 5 Writing the Equation of a Line

2 You can also find the slope (m) of the line
The Equation of a Line Given any two points in the coordinate plane, you can draw a line through them. x y l (X2,Y2) (X1,Y1) rise You can also find the slope (m) of the line run m = Y2 – Y1 X2 – X1 m = rise run

3 The Equation of a Line y (X2,Y2) x (X1,Y1)
A line contains infinite points. x y The Equation of the Line is the relationship between the coordinates of the infinite points on the line. It has three different forms: Slope-Intercept Point-Slope Standard (X2,Y2) (X1,Y1)

4 The Equation of a Line has three Different Forms
Slope-Intercept Y = mX + b where m is the slope and b is the y-intercept Point-Slope Y – Y1 = m (X – X1) where m is the slope and X1 and Y1 are the coordinates of one of the given points Standard AX + BY = C where A, B, and C are integers, and A is positive

5 The Equation of a Line has three Different Forms
We will focus on two Forms: Slope-Intercept Form Y = mX + b, where m is the slope and b is the y-intercept Point-Slope Form Y – Y1 = m (X – X1), where m is the slope and X1 and Y1 are the coordinates of one of the given points

6 How can you find the Equation of a line?
x y l You need two points. They can be the intercepts, y-intercept (0,Y) (X2,Y2) (X1,Y1) They can be any two points, or… …the combination of an intercept and a point. x-intercept (X,0)

7 Finding the Equation of a Line given two points
x y l First step - find the slope (m) of the line (4,6) m = rise run rise m = Y2 – Y1 X2 – X1 (-3,-2) m = 6 – (-2) 4 – (-3) run m = 8 7

8 Finding the Equation of a Line given two points
x y l Second step - substitute the slope (m) of the line and the coordinates of either point in the Point-Slope Form of the Equation (4,6) (-3,-2) rise Y – Y1 = m(X – X1) Y – 6 = 8 (X – 4) run m = 8 7

9 Finding the Equation of a Line given two points
Third step - solve the equation using cross-multiplication, distributive property and opposite operations to isolate the variables to the left and constant (numbers) to the right Y – 6 = 8(X – 4) 7 cross-multiplication 7(Y – 6) = 8(X – 4) distributive property 7Y – 42 = 8X – 32 opposite operations – 8X + 7Y =

10 Finding the Equation of a Line – Practice 1
Write the equation of the line through points (9, 5) and (-3, -1). First step - find the slope (m) of the line m = Y2 – Y1 X2 – X1 m = – 1 – (5) – 3 – 9 m = – 6 – 12 m = 1 2 Second step - substitute the slope (m) and the coordinates of either point into the Point-Slope Form Y – Y1 = m(X – X1) Y – (– 1) = 1(X – (-3))

11 Finding the Equation of a Line – Practice 1
Third step - solve the equation using cross-multiplication, distributive property, and opposite operations to isolate the variables and constant. Y – (-1) = 1(X – (-3)) Multiply both sides by two 2(Y + 1) = 1(X + 3) distributive property 2Y + 2 = X + 3 opposite operations 2Y = X 2Y = X + 1 Solve for Y Y = ½ X – ½

12 Finding the Equation of a Line – Practice 2
Write the equation of the line with slope –3/4 going through point (-2, 5). First step - find the slope (m) - given m = -3 4 Second step - substitute the slope (m) of the line and the coordinates of the point in the Point-Slope Form Y – Y1 = m(X – X1) Y – 5 = - 3 (X – (-2))

13 Finding the Equation of a Line – Practice 2
Third step - solve the equation using cross-multiplication, distributive property and opposite operations Y – 5 = - 3(X – (-2)) 4 cross-multiplication 4(Y – 5) = – 3(X + 2) distributive property 4Y – 20 = – 3X - 6 opposite operations 4Y = – 3X 4Y = – 3X + 14 Y = – ¾ X + 7/2

14 Finding the Equation of a Line – Practice 3
What is the equation for the line below? x y First step - Find the slope (m) In this case, identify two points on the line. (- 3, 3) y-intercept = -2 m = - 2 – 3 0 – (- 3) m = 3

15 Finding the Equation of a Line – Practice 3
Second step - substitute the slope (m) of the line and the coordinates of one of the points in the Point-Slope Form of the Equation m = - 5 3 (3, - 3) or (0, - 2) Y – Y1 = m (X – X1) Y – (- 2 ) = - 5 (X – 0)

16 Finding the Equation of a Line – Practice 3
Third step - solve the equation using cross-multiplication, distributive property and opposite operations Y – (- 2) = - 5 (X – 0) cross-multiplication 3(Y + 2) = – 5(X) distributive property 3Y + 6 = – 5X opposite operations 3Y = – 5X – 6 Y = – 5/3 X – 2

17 Find the Equation of a Line – Practice 4
x y What is the Standard form of the equation for line s? 5x + 2y = 20 What is the slope-intercept form of the equation for line s? y = - 5x

18 Find the Equation of a Line – Practice 4
x y What is the slope for line s? m = - 5/2 What is the x-intercept for line s? x-intercept is 2 (2,0)

19 Questions ? Good luck!

Download ppt "Unit 5 Writing the Equation of a Line"

Similar presentations

Writing Linear Equations Using Slope Intercept Form

Writing Linear Equations Using Slope Intercept Form
Linear Equations Unit.  Lines contain an infinite number of points.  These points are solutions to the equations that represent the lines.  To find.

Linear Equations Unit.  Lines contain an infinite number of points.  These points are solutions to the equations that represent the lines.  To find.
2.2 Linear Equations.

2.2 Linear Equations.
The equation of a line - Equation of a line - Slope - Y intercept

The equation of a line - Equation of a line - Slope - Y intercept
CHAPTER V Writing Linear Equations

CHAPTER V Writing Linear Equations
Where’s the fire? A fire station is located on a grid at (-3,2) and sights a fire along a line of sight with a slope of. Another fire station located.

Where’s the fire? A fire station is located on a grid at (-3,2) and sights a fire along a line of sight with a slope of. Another fire station located.
1 Linear Equation Jeopardy SlopeY-int Slope Intercept Form Graphs Solving Linear Equations Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400.

1 Linear Equation Jeopardy SlopeY-int Slope Intercept Form Graphs Solving Linear Equations Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400.
Solving Systems of three equations with three variables Using substitution or elimination.

Solving Systems of three equations with three variables Using substitution or elimination.
Systems of Equations and Inequalities

Systems of Equations and Inequalities
Writing Linear Functions

Writing Linear Functions
6-1 System of Equations (Graphing): Step 1: both equations MUST be in slope intercept form before you can graph the lines Equation #1: y = m(x) + b Equation.

6-1 System of Equations (Graphing): Step 1: both equations MUST be in slope intercept form before you can graph the lines Equation #1: y = m(x) + b Equation.
Slope Intercept Form. Y = mx + b m is the slope b is the y-intecept (0, b) Your equation must say “y = “ Example: Y = 3x + 8 m = 3 Y-intercept (0,8) Y.

Slope Intercept Form. Y = mx + b m is the slope b is the y-intecept (0, b) Your equation must say “y = “ Example: Y = 3x + 8 m = 3 Y-intercept (0,8) Y.
Equations of Lines and Graphing Them Equations of Lines Vertical line x = # Horizontal line y = # Slope, y-intercept y=mx+b Standard Form Ax+By = C using.

Equations of Lines and Graphing Them Equations of Lines Vertical line x = # Horizontal line y = # Slope, y-intercept y=mx+b Standard Form Ax+By = C using.
Objective I will identify the number of solutions a linear system has using one of the three methods used for solving linear systems.

Objective I will identify the number of solutions a linear system has using one of the three methods used for solving linear systems.
Welcome to MM 212 Unit 4 Seminar!. Graphing and Functions.

Welcome to MM 212 Unit 4 Seminar!. Graphing and Functions.
ALGEBRA 1 Lesson 5-4 Warm-Up. ALGEBRA 1 “Point-Slope Form and Writing Linear Equations” (5-4) (5-3) What is “point- slope form”? How can you use point-slope.

ALGEBRA 1 Lesson 5-4 Warm-Up. ALGEBRA 1 “Point-Slope Form and Writing Linear Equations” (5-4) (5-3) What is “point- slope form”? How can you use point-slope.
Solve each equation for y. 1. 3x + y = 52. y – 2x = 10 3. x – y = 6 4. 20x + 4y = 85. 9y + 3x = 16. 5y – 2x = 4 Clear each equation of decimals. 7. 6.25x.

Solve each equation for y. 1. 3x + y = 52. y – 2x = x – y = x + 4y = 85. 9y + 3x = 16. 5y – 2x = 4 Clear each equation of decimals x.
What is a System of Linear Equations? A system of linear equations is simply two or more linear equations using the same variables. We will only be dealing.

What is a System of Linear Equations? A system of linear equations is simply two or more linear equations using the same variables. We will only be dealing.
Linear Equations Objectives: -Find slope of a line - Write 3 different forms of linear equations Mr. Kohls.

Linear Equations Objectives: -Find slope of a line - Write 3 different forms of linear equations Mr. Kohls.
7-3 Writing equations in Slope- Intercept form Objectives: Write a linear equation in Slope-intercept form given the slope and y intercept.

7-3 Writing equations in Slope- Intercept form Objectives: Write a linear equation in Slope-intercept form given the slope and y intercept.

Similar presentations

Ads by Google