Post on 02-Jan-2016
Composite Area
Written by: James Wiens
Newton, Kansas
8cm
5
Instructor Notes
• Subject Area(s): Math• Grade level: 7th grade• Lesson Length: 50 minute class period• Synopsis: Solve for area of composite figures• Objective/goals: Students will find the area of
composite figures by breaking them into common shapes with formulas such as triangles, quadrilaterals and circles.
• Standard: • c. Kansas standard 7.3.2.A1c▲ ■ finding perimeter and area of two-
dimensional composite figures of squares, rectangles, and triangles (2.4.A1h), e.g., the front of a barn is rectangular in shape with a height of 10 feet and a width of 48 feet. Above the rectangle is a triangle that is 7 feet high with sides 25 feet long. What is the area of the front of the barn?
• Pre-requisite skills: Vocabulary – Area, base, height, triangle, paralellogram, trapezoid, pi, radius, circle.
• TurningPoint functions: standard question slides
• Materials: All instructional points and practice problems are provided within the power point slides. Practice questions are designed to be used with the TurningPoint clickers.
Instructor Notes
Lesson Outline
I. Warm-up: find area of basic shapes
II. Definitions / Key Concepts
III. Setting the Stage: Video lesson
IV. Guided practice: Turning Point Questions
V. Independent practice: Paper & pencil
VI. Closure: Write about area
Find the area.
19
in2
44
in2
88
in2
33%33%33%
8in
11in
a) 19 in2
b) 44 in2
c) 88 in2
Countdown
10
Answer
• Area parallelogram = base x height
• A = bh• A = 8 (11)• A = 88 in.2
Find the area.
30 100
1000
100%
0%0%
a) 30 in2
b) 60 in2
c) 120 in2
6in
10in
Countdown
10
Answer
• Area triangle = ½ (base x height)
• A = ½ bh• A = ½ (6)(10)• A = ½ (60)• A = 30 in.2
Find the area. (Use 3.14 for π)
30 100
1000
100%
0%0%
a) 62.8 in2
b) 314 in2
c) 31.4 in2
10in
Countdown
10
Answer
• Area circle = π r2
• A = π r2 • A = π (10)2 • A = π (100)• A = 314 in.2
Definition
• Area of complex figures• To find the area of a complex
figure, break the shape into two or more simple figures. Find the area for the simple figures then combine those amounts to find the total of the complex figure.
Setting the Stage
• How much area does the blue figure cover?
4
3
9 4
Answer
• A = bh • A= 4 (9)• A = 36 in.2
• A = ½ bh• A = ½ (4)(3)• A = ½ (12)• A = 6 in.2
Final Answer:
36 + 6 = 42 in.2
Video Clip Lesson from Teacher Tube
• Click on the link at the right to access a lesson about area of composite figures from Holt Mathematics.
Click here to see the lesson
What is the area of this figure?
A. 36 cm2
B. 54 cm2
C. 45 cm2
D. 18 cm2
912
6
3
3
3 cm
Countdown
10
What is the area of this figure rounded to the nearest cm2?
(Use 3.14 for π)
A. 40 cm2
B. 90 cm2
C. 126 cm2
D. 241 cm2
8cm
5
Countdown
10
What is the area of this figure?
A. 114 cm2
B. 108 cm2
C. 87 cm2
D. 72 cm2
12
268
2
5
Countdown
10
Independent Practice - Find the area of each figure rounded to the nearest foot (All units in feet ).
B.
A.
D.
C.
6 10
7
10
55
30
50
15
6
30
14
4
4
12
50
Answer Key for Independent Practice
A. = 200 ft.2
B. = 210 ft.2
C. = 8500 ft.2
D. = 130 ft.2
Closure / Summary
• Explain how finding the area of a right angle trapezoid is the same as using the sum of the areas of a triangle and a rectangle.
References
• Video clip from slide # 14 found at http://my.hrw.com/math06_07/nsmedia/lesson_videos/msm1/player.html?contentSrc=6072/6072.xml (Holt McDougal math series, Houghton Mifflin Harcourt.)
• Remainder of lesson designed and written by James Wiens, 7th grade math teacher, Newton Kansas.