Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes

Find the slope of the line that passes through each pair of points. ‏
Warm Up Find the slope of the line that passes through each pair of points. ‏ 2 3 Negative; –

Problem of the Day A cat weighs 11 ounces at birth. It gains 0.5 ounces a day for the first two weeks. How much will the cat weigh at the end of two weeks? The cat will weigh 1 lb, 2 oz.

Learn to use slopes and intercepts to graph linear equations.

Vocabulary x-intercept y-intercept slope-intercept form

The x-intercept of a line is the x- coordinate of the point where the line intersects the x-axis. The y-coordinate of this point is always 0. The y-intercept of a line is the y-coordinate of the point where the line intersects the y-axis. The x-coordinate of this point is always 0.

Additional Example 1: Finding x-intercepts and
y-intercepts to Graph Linear Equations Find the x-intercept and y-intercept. A. x y –2 –4 2 4 The line intersects the x-axis at (2,0). The x-intercept is 2. The line intersects the x-axis at (–4). The y-intercept is –4.

Additional Example 1: Finding x-intercepts and
y-intercepts to Graph Linear Equations Find the x-intercept and y-intercept. B. x y –2 –4 2 4 The line intersects the x-axis at (4,0). The x-intercept is 4. The line intersects the x-axis at (0, 1). The y-intercept is 1.

Find the x-intercept and y-intercept. A.
Check It Out: Example 1 Find the x-intercept and y-intercept. A. x y –2 –4 2 4 The line intersects the x-axis at (1,0). The x-intercept is 1. The line intersects the x-axis at (–3). The y-intercept is –3.

Find the x-intercept and y-intercept. B.
Check It Out: Example 1 Find the x-intercept and y-intercept. B. x y –2 –4 2 4 The line intersects the x-axis at (5,0). The x-intercept is 5. The line intersects the x-axis at (0, 2). The y-intercept is 2.

The linear equation y = mx + b is written in slope-intercept form, where m is the slope and b is the y-intercept of the line. y = mx + b Slope y-intercept

Additional Example 2A: Graphing by Using Slope
and y-intercept Graph the equation. y = x + 1 1 3 Step 1: Find m and b. y = x + 1 1 3 m = 1 3 b = 1 Step 2: Plot (0, 1)‏ 1 3 Step 3: Use the slope to plot at least 1 more point on the line.

Additional Example 2A Continued
Graph the equation. y = x + 1 1 3 x y –2 –4 2 4 Step 4: Draw a line through the points.

Since the y-intercept is 1, the point (0, 1) is a point on the line.
Remember!

Additional Example 2: Graphing by Using Slope
and y-intercept Graph the equation. B. 3x + y = 5 Step 1: Find m and b. 3x + y = 5 – 3x = – 3x y = 5 – 3x y = –3x + 5 m = – b = 5

Additional Example 2B Continued
Step 2: Plot (0, 5)‏ Step 3: Use the slope –3 to plot at least 1 more point on the line. Step 4: Draw a line through the points.

Check It Out: Example 2A Graph the equation. y = x + 2 1 4 Step 1: Find m and b. y = x + 2 1 4 m = 1 4 b = 2 Step 2: Plot (0, 2)‏ 1 4 Step 3: Use the slope to plot at least 1 more point on the line. Step 4: Draw a line through the points.

Check It Out: Example 2A Continued
Graph the equation. y = x + 2 1 4 x y –2 –4 2 4 Step 4: Draw a line through the points.

Check It Out: Example 2B Graph the equation. 2x + y = 4 Step 1: Find m and b. 2x + y = 4 – 2x = – 2x y = 4 – 2x y = –2x + 4 m = – b = 4

Check It Out Example 2B Continued
Step 2: Plot (0, 4)‏ Step 3: Use the slope –2 to plot at least 1 more point on the line. Step 4: Draw a line through the points.

Additional Example 3: Writing an Equation in Slope-Intercept Form
Write the equation of the line in slope-intercept form. The line rises from right to left so the slope is negative. m = rise run = - 2 5 The line intersects the y-axis at (0, -4), so the y-intercept is -4. b = –4 Substitute for m and b. y = 2 5 x – 4

Check It Out: Example 3 Write the equation of the line in slope-intercept form. The line rises from left to right so the slope is positive. m = rise run = 1 2 The line intersects the y-axis at (0, 2), so the y-intercept is 2. b = 2 Substitute for m and b. y = 1 2 x + 2

Additional Example 4: Using Slope-Intercept Form
A spider descends a 20-foot drainpipe at a rate of 2 feet per minute. The linear equation y = –2x + 20 represents the distance y the spider has left to descend after x minutes. Graph the equation, and then identify the x- and y- intercepts and describe their meaning.

Additional Example 4 Continued
Spider's Decent Use the slope and y-intercept to graph the equation. 20 18 Plot (0, 20). Use the slope -2 to plot the line down to the x-axis. 16 14 12 The y-intercept is 20. This represents the total distance in feet the spider has to descend. Distance remaining (ft)‏ 10 8 6 4 The x-intercept is 10. This represents the time in minutes it takes the spider has to descend the 20 ft. 2 2 4 6 8 10 12 14 16 Time (min)‏

Check It Out: Example 4 A submarine descends into a 40-mile sea cave at a rate of 5 miles per minute. The linear equation y = –5x + 40 represents the distance y the submarine has left to descend after x minutes. Graph the equation, and then identify the x- and y- intercepts and describe their meaning.

Check It Out: Example 4 Continued
Use the slope and y-intercept to graph the equation. Submarine's Decent 45 Plot (0, 40). Use the slope -5 to plot the line down to the x-axis. 40 35 Distance remaining (mi)‏ 30 The y-intercept is 40. This represents the total distance in feet the submarine has to descend. 25 20 15 10 The x-intercept is 8. This represents the time in minutes it takes the submarine to descend the 40 miles. 5 1 2 3 4 5 6 7 8 9 Time (min)‏

Lesson Quizzes Standard Lesson Quiz Lesson Quiz for Student Response Systems

1. Graph y = x – 3. Identify the x- and y- intercepts. 3 8
Lesson Quiz: Part I 1. Graph y = x – 3. Identify the x- and y- intercepts. 3 8 x y –4 –8 4 8 x-int. = 8, y-int. = –3

2. Write the equation of the line in slope- intercept form.
Lesson Quiz: Part II 2. Write the equation of the line in slope- intercept form. x y –4 –8 4 8 y = – x + 3 1 2

Lesson Quiz 3. A snail is crawling across a 15 mm long leaf. The snail crawls at a constant rate of 1 mm per second. The linear equation y = –x + 15 represents the distance y that the snail has left to crawl after x seconds. Graph the equation, and then identify the x- and y-intercepts and describe their meanings. y-int. = 15, total distance in mm that the snail has to crawl; x-int. = 15, time in seconds it takes the snail to crawl 15 mm.

Lesson Quiz for Student Response Systems
3 2 Graph y = – x – 3. Identify the x- and y-intercepts. A. x-int: –2, y-int: –3 B. x-int: 2, y-int: 3

2. Write the equation of the line in slope-intercept form. A. y = x – 3 B. y = x + 2 C. y = x – 3 D. y = x + 2 2 3 2 3 3 2 3 2

3. A gelato shop charges $3 for a cup of gelato, plus $1.50 for each topping. The equation C = 1.5t + 3 represents the cost of the cup of gelato for t number of toppings. Graph the equation, and then identify the x- and y-intercepts. A. x-int: 3, y-int: none B. x-int: none, y-int: 3

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