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Topic 4.3.1Topic 4.3.1
Slope of a LineSlope of a Line
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Topic4.3.1
Slope of a LineSlope of a Line
California Standard:7.0: Students verify that a point lies on a line, given an equation of the line. Students are able to derive linear equations by using the point-slope formula.
What it means for you:You’ll find the slope of a line given any two points on the line.
Key words:• slope• steepness• horizontal• vertical• rise over run
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Topic4.3.1
By now you’ve had plenty of practice in plotting lines.
Slope of a LineSlope of a Line
Any line can be described by its slope — which is what this Topic is about.
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Topic4.3.1
The Slope of a Line is Its Steepness
The slope (or gradient) of a line is a measure of its steepness.
Slope of a LineSlope of a Line
The vertical change is usually written y, and it’s often called the rise.
The slope of a straight line is the ratio of the vertical change to the horizontal change between any two points lying on the line.
In the same way, the horizontal change is usually written x, and it’s often called the run.
x = run
y = rise
x is pronounced “delta x” and just means “change in x.”
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Topic4.3.1
Slope of a LineSlope of a Line
Slope = , provided x 0 vertical change
horizontal change =
rise run
y x
=
If you know the coordinates of any two points on a line, you can find the slope. The slope, m, of a line passing through points P1 (x1, y1) and P2 (x2, y2) is given by this formula:
= m = , provided x2 – x1 0 y x
y2 – y1 x2 – x1
There is an important difference between positive and negative slopes — a positive slope means the line goes “uphill” , whereas a line with a negative slope goes “downhill” .
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Topic4.3.1
Find the slope of the line that passes through the points (2, 1) and (7, 4) and draw the graph.
Solution follows…
Solution
Slope of a LineSlope of a Line
Example 1
my2 – y1 x2 – x1
= =4 – 1 7 – 2
=3 5
So the slope is .3 5
Solution continues…
You can use the formula to find the slope of the line.
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Topic4.3.1
Find the slope of the line that passes through the points (2, 1) and (7, 4) and draw the graph.
Solution (continued)
Slope of a LineSlope of a Line
You know that the line passes through (2, 1) and (7, 4), so just join those two points up to draw the graph.
Example 1
Notice how the line has a positive slope, meaning it goes “uphill” from left to right.
In fact, since the slope is ,the line goes 3 units up for every 5 units across.
35
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Topic4.3.1
Guided Practice
Solution follows…
In Exercises 1–4, find the slope of the line on the graph below.
Slope of a LineSlope of a Line
1
21. m = ……..
2. m = ……..
3. m = ……..
4. m = ……..
3
4
4
3–
3
2–
9
Topic4.3.1
Guided Practice
Solution follows…
5. Find the slope of the line that passes through the points (1, 5) and (3, 2), and draw the graph on a copy of the coordinate plane opposite.
Slope of a LineSlope of a Line
6. Find the slope of the line that passes through the points (3, 1) and (2, 4), and draw the graph on a copy of the coordinate plane opposite.
3
2m = –
5.
m = –3
6.
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Topic4.3.1
Slope of a LineSlope of a Line
Example 2
Find the slope of the line that passes through the points (3, 4) and (6, –2).
Solution
m =4 – (–2)
3 – 6
4 + 2
–3= =
6
–3= –2
So the slope is –2.
Solution follows…
Be extra careful if any of the coordinates
are negative.
Be extra careful if any of the coordinates
are negative.
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Topic4.3.1
Slope of a LineSlope of a Line
This time the line has a negative slope, meaning it goes “downhill” from left to right.
Here the slope is –2, which means that the line goes 2 units down for every 1 unit across.
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2
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Topic4.3.1
Slope of a LineSlope of a Line
Find the slope of the lines through: a) (2, 5) and (–4, 2)
b) (1, –6) and (3, 3)Solution
Example 3
a) m =5 – 2
2 – (–4)=
3
2 + 4=
3
6=
1
2
b) m =3 – (–6)
3 – 1=
3 + 6
2=
9
2
Solution follows…
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Find the slope m of the line through each pair of points below.
7. (–1, 2) and (3, 2)
8. (0, –5) and (–6, 1)
9. (5, –7) and (–3, –7)
10. (4, –1) and (–3, 5)
11. (–1, –3) and (1, –4)
Topic4.3.1
Guided Practice
Solution follows…
Slope of a LineSlope of a Line
m = = = 0y2 – y1
x2 – x1
–7 – (–7)
–3 – 5
m = = = 0y2 – y1
x2 – x1
2 – 2
3 –(–1)
m = = = –y2 – y1
x2 – x1
–4 – (–3)
1 – (–1)
1
2
m = = = – 67
y2 – y1
x2 – x1
5 – (–1)
–3 – 4
m = = = = –1y2 – y1
x2 – x1
1 –(–5)
–6 – 0
6
–6
14
Find the slope m of the line through each pair of points below.
12. (5, 7) and (–11, –12)
13. (–2, –2) and (–3, –17)
14. (18, 2) and (–32, 7)
15. (0, –1) and (1, 0)
16. (0, 0) and (–14, –1)
Topic4.3.1
Guided Practice
Solution follows…
Slope of a LineSlope of a Line
m = = = = 15y2 – y1
x2 – x1
–17 – (–2)
–3 – (–2)
–15
–1
m = = = = 1y2 – y1
x2 – x1
0 – (–1)
1 – 0
1
1
m = = = =y2 – y1
x2 – x1
–1 – 0
–14 – 0
–1
–14
1
14
m = = = = –y2 – y1
x2 – x1
7 – 2
–32 –18
5
–50
1
10
m = = = =y2 – y1
x2 – x1
–12 – 7
–11 – 5
–19
–16 16
19
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Topic4.3.1
Slope of a LineSlope of a Line
If the slope of the line that passes through the points (4, –1) and (6, 2k) is 3, find the value of k.
Solution Even though one pair of coordinates contains a variable, k, you can still use the slope formula in exactly the same way as before.
my2 – y1
x2 – x1 = , which means that m =
2k – (–1)
6 – 4 =2k + 1
2
But the slope is 3, so = 32k + 1
2
2k + 1 = 6
2k = 5
Example 4
k =52
Solution follows…
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17. (7, –2c) and (10, –c)
18. (b, 1) and (3b, –3)
19. (2, 2k) and (–5, –5k)
20. (3q, 1) and (2q, 7)
21. (3d, 7d) and (5d, 9d)
Topic4.3.1
Guided Practice
Solution follows…
Find the slope m of the lines through the points below.
Slope of a LineSlope of a Line
m = = =–c – (–2c)
7b – 4b
c
3
y2 – y1
x2 – x1
m = = = = – –3 – 1
3b – b
–4
2b
2
b
y2 – y1
x2 – x1
m = = = = k–5k –2k
–5 – 2
–7k
–7
y2 – y1
x2 – x1
m = = = –7 – 1
2q – 3q
6q
y2 – y1
x2 – x1
2d
2dm = = = = 1
9d – 7d
5d – 3d
y2 – y1
x2 – x1
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22. (4a, 5k) and (2a, 7k)
23. (9c, 12v) and (12c, 15v)
24. (p, q) and (q, p)
25. (10, 14d) and (d, –7)
26. (2t, –3s) and (18s, 14t)
Topic4.3.1
Guided Practice
Solution follows…
Find the slope m of the lines through the points below.
Slope of a LineSlope of a Line
m = = = = –y2 – y1
x2 – x1
7k – 5k
2a – 4a
2k
–2a
k
a
m = = = =v
c
3v
3c
15v – 12v
12c – 9c
y2 – y1
x2 – x1
m = =p – q
q – p
y2 – y1
x2 – x1
m = = =–7 –14d
d – 10
14d + 7
10 – d
y2 – y1
x2 – x1
m = = =14t –(–3s)
18s – 2t
14t + 3s
18s – 2t
y2 – y1
x2 – x1
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Topic4.3.1
Guided Practice
Solution follows…
In Exercises 27–29 you’re given two points on a line and the line’s slope, m. Find the value of the unknown constant in each Exercise.
27. (–2, 3) and (3k, –4), m =
28. (4, –5t) and (7, –8t), m =
29. (4b, –6) and (7b, –10), m =
Slope of a LineSlope of a Line
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27
34
m = = =
= (–7)(5) = 2(3k + 2) –35 = 6k + 4 6k = –39 k = –2
5
y2 – y1
x2 – x1
–7
3k + 2
–4 – 3
3k –(–2)
2
13–7
3k + 2
m = = = = –t
–t = t = –
y2 – y1
x2 – x1
–8t –(–5t)
7 – 42
7
2
7
–3t
3
m = = =
= –16 = 9b b = –
–4
3b3
4
16
9
y2 – y1
x2 – x1
–10 –(–6)
7b – 4b–4
3b
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Topic4.3.1
Guided Practice
Solution follows…
In Exercises 30–32 you’re given two points on a line and the line’s slope, m. Find the value of the unknown constant in each Exercise.
30. (–8, –6) and (12, 4), m = – v
31. (7k, –3) and (k, –1), m = 4
32. (1, –17) and (40, 41), m = – t
Slope of a LineSlope of a Line
17478
25
m = = = =
– v = –4v = 5 v = –
y2 – y1
x2 – x1
1
2
2
5
5
4
10
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4 – (–6)
12 – (–8)
1
2
m = = = = –
4 = 12k = –1 k = –
y2 – y1
x2 – x1
–1 – (–3)
k – 7k
1
3k1
12
2
–6k1
3k
m = = =
– t = t = – = – = –
y2 – y1
x2 – x1
174
78
58
39
41 – (–17)
40 – 1
58 × 78
39 × 174
4524
6786
2
3
58
39
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Topic4.3.1
Independent Practice
Solution follows…
1. Find the slope m of the lines shown below.
Slope of a LineSlope of a Line
(i) m = ……..
(ii) m = ……..
(iii) m = ……..
(iv) m = ……..
(v) m = ……..
2
–2
0
12
19
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Topic4.3.1
Independent Practice
Solution follows…
In Exercises 2–5, find the slope of the line that passes through the given points, and draw the graph on a copy of the coordinate plane below.
Slope of a LineSlope of a Line
2. (–2, 1) and (0, 2)
3. (4, 4) and (1, 0)
4. (–5, 2) and (–1, 3)
5. (3, –3) and (7, 3)
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m =
43
m =
14
m =
32
m =
2.3.4.5.
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Topic4.3.1
Independent Practice
Solution follows…
In Exercises 6–10, find the slope of the line through each of the points.
Slope of a LineSlope of a Line
6. (–3, 5) and (2, 1) 7. (0, 4) and (–4, 0)
8. (2, 3) and (4, 3) 9. (6d, 2) and (4d, –1)
10. (2s, 2t) and (s, 3t)
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m = –
m = 0
ts
m = –
m = 1
32d
m =
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Topic4.3.1
Solution follows…
In Exercises 11–15, you’re given two points on a line and the line’s slope, m. Find the value of the unknown constant in each Exercise.
11. (3t, 7) and (5t, 9), m = –
12. (3k, 1) and (2k, 7), m =
13. (0, 14d) and (10, –6d), m = –1
14. (2t, –3) and (–3t, 5), m =
15. (0, 8d) and (–1, 4d), m = –
Slope of a LineSlope of a Line
12
54
t = –2
k = –18
d = – 112
Independent Practice
13
13
d =12
t = –3225
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Topic4.3.1
Round UpRound Up
Slope is a measure of how steep a line is — it’s how many units up or down you go for each unit across.
Slope of a LineSlope of a Line
If you go up or down a lot of units for each unit across, the line will be steep and the slope will be large (either large and positive if it goes up from left to right, or large and negative if it goes down from left to right).