5 slopes of lines
TRANSCRIPT
Slopes of Lines
Slopes of LinesThe slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.
Slopes of LinesThe slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of LinesThe slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Definition of Slope
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics.
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics. Δy means the difference in the values of y’s, Δx means the difference the values of x’s.
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics. Δy means the difference in the values of y’s, Δx means the difference the values of x’s.
Example A. Let y1 = –2, y2 = 5,
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics. Δy means the difference in the values of y’s, Δx means the difference the values of x’s.
Example A. Let y1 = –2, y2 = 5, then Δy = y2 – y1
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics. Δy means the difference in the values of y’s, Δx means the difference the values of x’s.
Example A. Let y1 = –2, y2 = 5, then Δy = y2 – y1 = 5 – (–2) = 7
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics. Δy means the difference in the values of y’s, Δx means the difference the values of x’s.
Example A. Let y1 = –2, y2 = 5, then Δy = y2 – y1 = 5 – (–2) = 7
Let x1 = 7, x2 = –4,
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics. Δy means the difference in the values of y’s, Δx means the difference the values of x’s.
Example A. Let y1 = –2, y2 = 5, then Δy = y2 – y1 = 5 – (–2) = 7
Let x1 = 7, x2 = –4, then Δ x = x2 – x1
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Slopes of Lines
Definition of SlopeNotation: The Greek capital letter Δ (delta) in generalmeans “the difference” in mathematics. Δy means the difference in the values of y’s, Δx means the difference the values of x’s.
Example A. Let y1 = –2, y2 = 5, then Δy = y2 – y1 = 5 – (–2) = 7
Let x1 = 7, x2 = –4, then Δ x = x2 – x1 = –4 – 7 = –11
The slope of a line is a number. The slope of a line measures the amount of tilt, (inclination, steepness) of the line against the x-axis.Steep lines have slopes with large absolute value. Gradual lines have slopes with small absolute value
Definition of Slope Slopes of Lines
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line,
Slopes of Lines
(x1, y1)
(x2, y2)
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔxm =
Slopes of Lines
(x1, y1)
(x2, y2)
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
Slopes of Lines
(x1, y1)
(x2, y2)
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
Slopes of Lines
Geometry of Slope
(x1, y1)
(x2, y2)
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
Slopes of Lines
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
Slopes of Lines
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
Slopes of Lines
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”.
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
Slopes of Lines
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
Slopes of Lines
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
easy to memorize
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
Slopes of Lines
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
easy to memorize
the exact formula
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
Slopes of Lines
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
easy to memorize
the exact formula
geometric meaning
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
(–2 , 8)( 3 , –2)
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
(–2 , 8)( 3 , –2)
–5 , 10
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
Δy
(–2 , 8)( 3 , –2)
–5 , 10 Δx
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is10–5
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
=
= –2
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is10–5
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
=
= –2
Example C. Find the slope of the line that passes through (3, 5) and (-2, 5). Draw the line.
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is10–5
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
=
= –2
Example C. Find the slope of the line that passes through (3, 5) and (-2, 5). Draw the line.
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is10–5
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
=
= –2
Example C. Find the slope of the line that passes through (3, 5) and (-2, 5). Draw the line.
(–2, 5)( 3, 5)
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is10–5
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
=
= –2
Example C. Find the slope of the line that passes through (3, 5) and (-2, 5). Draw the line.
Δy
(–2, 5)( 3, 5)–5, 0
Δx
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is10–5
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
=
= –2
Example C. Find the slope of the line that passes through (3, 5) and (-2, 5). Draw the line.
Δy
(–2, 5)( 3, 5)–5, 0
Δx
So the slope is
Δx Δym =
Δy
Δx
(–2 , 8)( 3 , –2)
–5 , 10
Δy
Δx
Hence the slope is10–5
Example B. Find the slope of the line that passes through (3, –2) and (–2, 8). Draw the line.
Slopes of Lines
It’s easier to find Δx and Δy vertically.
m =
=
= –2
Example C. Find the slope of the line that passes through (3, 5) and (-2, 5). Draw the line.
Δy
(–2, 5)( 3, 5)–5, 0
Δx
So the slope is
Δx Δy 0
–5 m =
=
= 0
As shown in example F, the slope of a horizontal line is 0, i.e. it’s “tilt” is 0.
Slopes of Lines
As shown in example F, the slope of a horizontal line is 0, i.e. it’s “tilt” is 0.
Slopes of Lines
Example D. Find the slope of the line that passes through (3, 2) and (3, 5). Draw the line.
As shown in example F, the slope of a horizontal line is 0, i.e. it’s “tilt” is 0.
Slopes of Lines
Example D. Find the slope of the line that passes through (3, 2) and (3, 5). Draw the line.
As shown in example F, the slope of a horizontal line is 0, i.e. it’s “tilt” is 0.
Slopes of Lines
Example D. Find the slope of the line that passes through (3, 2) and (3, 5). Draw the line.
Δy
(3, 5)(3, 2)0, 3
Δx
As shown in example F, the slope of a horizontal line is 0, i.e. it’s “tilt” is 0.
Slopes of Lines
Example D. Find the slope of the line that passes through (3, 2) and (3, 5). Draw the line.
Δy
(3, 5)(3, 2)0, 3
Δx
So the slope
Δx Δy 3
0 m =
=
As shown in example F, the slope of a horizontal line is 0, i.e. it’s “tilt” is 0.
Slopes of Lines
Example D. Find the slope of the line that passes through (3, 2) and (3, 5). Draw the line.
Δy
(3, 5)(3, 2)0, 3
Δx
So the slope
Δx Δy 3
0 m =
=
is undefined!
As shown in example F, the slope of a horizontal line is 0, i.e. it’s “tilt” is 0.
Slopes of Lines
Example D. Find the slope of the line that passes through (3, 2) and (3, 5). Draw the line.
Δy
(3, 5)(3, 2)0, 3
Δx
So the slope
Δx Δy 3
0 m =
=
is undefined!
As shown in example G, the slope of a vertical line is undefined.
More on Slopes
Definition of Slope More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line,
(x1, y1)
(x2, y2)
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔxm =
(x1, y1)
(x2, y2)
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
(x1, y1)
(x2, y2)
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
Geometry of Slope
(x1, y1)
(x2, y2)
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”.
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
easy to memorize
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
easy to memorize
the exact formula
More on Slopes
Definition of Slope Let (x1, y1) and (x2, y2) be two points on a line, then the slope m of the line is
ΔyΔx
y2 – y1
x2 – x1m = =
riserun=
(x1, y1)
(x2, y2)
Δy=y2–y1=rise
Δx=x2–x1=run
Geometry of Slope Δy = y2 – y1 = the difference in the heights of the points.Δx = x2 – x1 = the difference in the runs of the points.
ΔyΔx= Therefore m is the ratio of the “rise” to the
“run”. m = Δy
Δxy2 – y1
x2 – x1=
easy to memorize
the exact formula
geometric meaning
More on Slopes
Example A. Find the slope of each of the following lines.
More on Slopes
Example A. Find the slope of each of the following lines.
Two points are(–3, 1), (4, 1).
More on Slopes
Example A. Find the slope of each of the following lines.
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0
More on Slopes
Example A. Find the slope of each of the following lines.
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
Example A. Find the slope of each of the following lines.
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
m =ΔyΔx =
07 = 0
Example A. Find the slope of each of the following lines.
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
m =ΔyΔx =
07
Horizontal line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
m =ΔyΔx =
07
Horizontal line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
m =ΔyΔx =
07
Horizontal line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
m =ΔyΔx =
07
Horizontal line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
m =
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
ΔyΔx =
74m =
ΔyΔx =
07
Horizontal line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
m =
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
More on Slopes
ΔyΔx =
74m =
ΔyΔx =
07
Horizontal line Slope = 0
Tilted line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
m =
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
Two points are(–1, 3), (6, 3).
More on Slopes
ΔyΔx =
74m =
ΔyΔx =
07
Horizontal line Slope = 0
Tilted line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
m =
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
Two points are(–1, 3), (6, 3).Δy = 3 – 3 = 0
More on Slopes
ΔyΔx =
74m =
ΔyΔx =
07
Horizontal line Slope = 0
Tilted line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
m =
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
Two points are(–1, 3), (6, 3).Δy = 3 – 3 = 0Δx = 6 – (–1) = 7
More on Slopes
ΔyΔx =
74m =
ΔyΔx =
07
Horizontal line Slope = 0
Tilted line Slope = 0
= 0
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
m =
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
Two points are(–1, 3), (6, 3).Δy = 3 – 3 = 0Δx = 6 – (–1) = 7
More on Slopes
ΔyΔx =
74m =
ΔyΔx =
07
m =ΔyΔx =
70
Horizontal line Slope = 0
Tilted line Slope = 0
= 0 (UDF)
Example A. Find the slope of each of the following lines.
Two points are(–2, –4), (2, 3).Δy = 3 – (–4) = 7Δx = 2 – (–2) = 4
m =
Two points are(–3, 1), (4, 1).Δy = 1 – (1) = 0Δx = 4 – (–3) = 7
Two points are(–1, 3), (6, 3).Δy = 3 – 3 = 0Δx = 6 – (–1) = 7
More on Slopes
ΔyΔx =
74m =
ΔyΔx =
07
m =ΔyΔx =
70
Horizontal line Slope = 0
Vertical line Slope is UDF
Tilted line Slope = 0
= 0 (UDF)
Lines that go through the quadrants I and III have positive slopes.
More on Slopes
Lines that go through the quadrants I and III have positive slopes.
More on Slopes
III
III IV
Lines that go through the quadrants I and III have positive slopes.
Lines that go through the quadrants II and IV have negative slopes.
More on Slopes
III
III IV
Lines that go through the quadrants I and III have positive slopes.
Lines that go through the quadrants II and IV have negative slopes.
More on Slopes
III
III IV
III
III IV
Lines that go through the quadrants I and III have positive slopes.
Lines that go through the quadrants II and IV have negative slopes.
More on Slopes
The formula for slopes requires geometric information,i.e. the positions of two points on the line.
III
III IV
III
III IV
Lines that go through the quadrants I and III have positive slopes.
Lines that go through the quadrants II and IV have negative slopes.
More on Slopes
The formula for slopes requires geometric information,i.e. the positions of two points on the line. However, if a line is given by its equation instead, we may determine the slope from the equation directly.
III
III IV
III
III IV
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + b
More on Slopes
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept.
More on Slopes
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6 solve for y
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6 solve for y 2y = –3x + 6
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6 solve for y 2y = –3x + 6
y = 2–3 x + 3
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6 solve for y 2y = –3x + 6
y = 2–3 x + 3
Hence the slope m is –3/2
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6 solve for y 2y = –3x + 6
y = 2–3 x + 3
Hence the slope m is –3/2 and the y-intercept is (0, 3).
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.a. 3x = –2y + 6 solve for y 2y = –3x + 6
y = 2–3 x + 3
Hence the slope m is –3/2 and the y-intercept is (0, 3).
Set y = 0, we get the x-intercept (2, 0).
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6 solve for y 2y = –3x + 6
y = 2–3 x + 3
Hence the slope m is –3/2 and the y-intercept is (0, 3).
Set y = 0, we get the x-intercept (2, 0). Use these points to draw the line.
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
Given a linear equation in x and y, solve for the variable y if possible, we get y = mx + bthe number m is the slope and b is the y-intercept. This is called the slope intercept form and this can be doneonly if the y-term is present.
More on Slopes
a. 3x = –2y + 6 solve for y 2y = –3x + 6
y = 2–3 x + 3
Hence the slope m is –3/2 and the y-intercept is (0, 3).
Set y = 0, we get the x-intercept (2, 0). Use these points to draw the line.
Example B. Write the equations into the slope intercept form, list the slopes, the y-intercepts and draw the lines.
b. 0 = –2y + 6More on Slopes
b. 0 = –2y + 6 solve for yMore on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3
More on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
More on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0.
More on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3).
More on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
More on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
More on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
c. 3x = 6
More on Slopes
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
c. 3x = 6
More on Slopes
The variable y can’t be isolated because there is no y.
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
c. 3x = 6
More on Slopes
The variable y can’t be isolated because there is no y.Hence the slope is undefinedand this is a vertical line.
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
c. 3x = 6
More on Slopes
The variable y can’t be isolated because there is no y.Hence the slope is undefinedand this is a vertical line.Solve for x 3x = 6 x = 2.
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
c. 3x = 6
More on Slopes
The variable y can’t be isolated because there is no y.Hence the slope is undefinedand this is a vertical line.Solve for x 3x = 6 x = 2.This is the vertical line x = 2.
b. 0 = –2y + 6 solve for y 2y = 6 y = 3 y = 0x + 3
Hence the slope m is 0. The y-intercept is (0, 3). There is no x-intercept.
c. 3x = 6
More on Slopes
The variable y can’t be isolated because there is no y.Hence the slope is undefinedand this is a vertical line.Solve for x 3x = 6 x = 2.This is the vertical line x = 2.
Two Facts About SlopesI. Parallel lines have the same slope.
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L?
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y So the slope of 4x – 2y = 5 is 2.
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y So the slope of 4x – 2y = 5 is 2. Since L is parallel to it , so L has slope 2 also.
More on Slopes
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y So the slope of 4x – 2y = 5 is 2. Since L is parallel to it , so L has slope 2 also.
More on Slopes
b. What is the slope of L if L is perpendicular to 3x = 2y + 4?
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y So the slope of 4x – 2y = 5 is 2. Since L is parallel to it , so L has slope 2 also.
More on Slopes
b. What is the slope of L if L is perpendicular to 3x = 2y + 4? Solve for y to find the slope of 3x – 4 = 2y
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y So the slope of 4x – 2y = 5 is 2. Since L is parallel to it , so L has slope 2 also.
More on Slopes
b. What is the slope of L if L is perpendicular to 3x = 2y + 4? Solve for y to find the slope of 3x – 4 = 2y x – 2 = y 2
3
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y So the slope of 4x – 2y = 5 is 2. Since L is parallel to it , so L has slope 2 also.
More on Slopes
b. What is the slope of L if L is perpendicular to 3x = 2y + 4? Solve for y to find the slope of 3x – 4 = 2y x – 2 = y
Hence the slope of 3x = 2y + 4 is .
2 3
2 3
Two Facts About SlopesI. Parallel lines have the same slope.II. Slopes of perpendicular lines are the negative reciprocal of each other.
Example C. a. The line L is parallel to 4x – 2y = 5, what is the slope of L? Solve for y for 4x – 2y = 5 4x – 5 = 2y 2x – 5/2 = y So the slope of 4x – 2y = 5 is 2. Since L is parallel to it , so L has slope 2 also.
More on Slopes
b. What is the slope of L if L is perpendicular to 3x = 2y + 4? Solve for y to find the slope of 3x – 4 = 2y x – 2 = y
Hence the slope of 3x = 2y + 4 is . So L has slope –2/3 since L is perpendicular to it.
2 3
2 3
Summary on Slopes
How to Find SlopesI. If two points on the line are given, use the slope formula
II. If the equation of the line is given, solve for the y and get slope intercept form y = mx + b, then the number m is the slope.
Geometry of Slope The slope of tilted lines are nonzero. Lines with positive slopes connect quadrants I and III.Lines with negative slopes connect quadrants II and IV. Lines that have slopes with large absolute values are steep.The slope of a horizontal line is 0.A vertical lines does not have slope or that it’s UDF.Parallel lines have the same slopes.Perpendicular lines have the negative reciprocal slopes of each other.
riserun= m = Δy
Δxy2 – y1
x2 – x1=
Exercise A. Identify the vertical and the horizontal lines by inspection first. Find their slopes or if it’s undefined, state so. Fine the slopes of the other ones by solving for the y.
1. x – y = 3 2. 2x = 6 3. –y – 7= 0
4. 0 = 8 – 2x 5. y = –x + 4 6. 2x/3 – 3 = 6/5
7. 2x = 6 – 2y 8. 4y/5 – 12 = 3x/4 9. 2x + 3y = 3
10. –6 = 3x – 2y 11. 3x + 2 = 4y + 3x 12. 5x/4 + 2y/3 = 2 Exercise B. 13–18. Select two points and estimate the slope of each line.
13. 14. 15.
More on Slopes
16. 17. 18.
Exercise C. Draw and find the slope of the line that passes through the given two points. Identify the vertical line and the horizontal lines by inspection first.19. (0, –1), (–2, 1) 20. (1, –2), (–2, 0) 21. (1, –2), (–2, –1)
22. (3, –1), (3, 1) 23. (1, –2), (–2, 3) 24. (2, –1), (3, –1)
25. (4, –2), (–3, 1) 26. (4, –2), (4, 0) 27. (7, –2), (–2, –6)
28. (3/2, –1), (3/2, 1) 29. (3/2, –1), (1, –3/2)
30. (–5/2, –1/2), (1/2, 1) 31. (3/2, 1/3), (1/3, 1/3)
32. (–2/3, –1/4), (1/2, 2/3) 33. (3/4, –1/3), (1/3, 3/2)
More on Slopes
Exercise D. 34. Identify which lines are parallel and which one are perpendicular. A. The line that passes through (0, 1), (1, –2)
D. 2x – 4y = 1
B. C.
E. The line that’s perpendicular to 3y = xF. The line with the x–intercept at 3 and y intercept at 6.
Find the slope, if possible of each of the following lines.35. The line passes with the x intercept at x = 2, and y–intercept at y = –5.
More on Slopes
36. The equation of the line is 3x = –5y+737. The equation of the line is 0 = –5y+7 38. The equation of the line is 3x = 739. The line is parallel to 2y = 5 – 6x 40. the line is perpendicular to 2y = 5 – 6x41. The line is parallel to the line in problem 30. 42. the line is perpendicular to line in problem 31.43. The line is parallel to the line in problem 33. 44. the line is perpendicular to line in problem 34.
More on SlopesFind the slope, if possible of each of the following lines
Summary of SlopeThe slope of the line that passes through (x1, y1) and (x2, y2) is
Horizontal line Slope = 0
Vertical line Slope is UDF.
Tilted line Slope = –2 0
riserun= m = Δy
Δxy2 – y1
x2 – x1=
Exercise A. Select two points and estimate the slope of each line.
1. 2. 3. 4.
Slopes of Lines
5. 6. 7. 8.
Exercise B. Draw and find the slope of the line that passes through the given two points. Identify the vertical line and the horizontal lines by inspection first.9. (0, –1), (–2, 1) 10. (1, –2), (–2, 0) 11. (1, –2), (–2, –1)
12. (3, –1), (3, 1) 13. (1, –2), (–2, 3) 14. (2, –1), (3, –1)
15. (4, –2), (–3, 1) 16. (4, –2), (4, 0) 17. (7, –2), (–2, –6)
18. (3/2, –1), (3/2, 1) 19. (3/2, –1), (1, –3/2)
20. (–5/2, –1/2), (1/2, 1) 21. (3/2, 1/3), (1/3, 1/3)
22. (–2/3, –1/4), (1/2, 2/3) 23. (3/4, –1/3), (1/3, 3/2)
Slopes of Lines