Presentation is loading. Please wait.

Presentation is loading. Please wait.

Formulas… They help us find the area. They did not fall out of the sky! In Exploration 10.7, you will develop the formulas for the area of a triangle,

Published byJordan Craig Modified over 9 years ago

Similar presentations

Presentation on theme: "Formulas… They help us find the area. They did not fall out of the sky! In Exploration 10.7, you will develop the formulas for the area of a triangle,"— Presentation transcript:

1 Formulas… They help us find the area. They did not fall out of the sky! In Exploration 10.7, you will develop the formulas for the area of a triangle, rectangle, and parallelogram. Now, let’s develop the formula for the area of a trapezoid.

2 Area of Trapezoids First method: draw a diagonal, and find the area of 2 triangles. Base 1 Base 2 Height

3 Area of Trapezoids Method 2: make a 180˚ rotated image; find the area, and cut it in half. Base 1 Base 2 Height Base 1 Base 2 Height

4 Area of a circle If you like, read Exploration 10.8. It explains in more detail why the area of a circle is πr 2.

5 Take any circle. Subdivide it into many congruent sectors--in this case, we made 16.

6 Cut out each sector. Rearrange them. What shape does this remind you of? –What is the formula for finding the area of this shape? Find it!

7 Pythagorean Theorem The most proved theorem ever--over 300 proofs! One was done by James Garfield, before he was president of the United States. If you have a right triangle with hypotenuse of length “c”, then a 2 + b 2 = c 2.

8 It looks like this! a 2 + b 2 = c 2.

9 But we use it like this. Find the perimeter and area of this triangle. 5 feet x feet 13 feet

10 Other ways to make our life easy. Compare the circumference and area. r 2r

11 Try this--find perimeter and area 13 “ 10 “ 20 “

12 P = tri + rect + sem 13 + 13 + 10 + 20 + 10 + sem (.5 2π 5) A = tri + rect + sem 5 2 + x 2 = 13 2 x = 12.51012 + 2010 +.5π5 2 13 “ 10 “ 20 “

13 Try to find the shaded area Assume the trapezoid is isosceles. 24 cm 38 cm--whole base 7 cm 4 cm

14 Area of trapezoid - area of parallelogram Trap:.5 24 (24 + 38) Para: 7 4 Did not need Pythagorean Theorem! 24 cm 38 cm--whole base 7 cm 4 cm

15 Find the perimeter and area… If it looks right or congruent, it is. (1)(2) 9 in. 18 in. 10 m 14 m4 m 2 2.8 m 2 m

16 One Perimeter –Sides of large triangle: 9 2 + 9 2 = x 2 x = 12.7 12.7 + 12.7 + 12.7 + 12.7 + 9 + 9 = 68.6 in. Area: Note that the large triangle can be moved to make a rectangular figure. –9 18 = 162 in. 2 9 in. 18 in.

17 Two Perimeter: –10 + 10 + 2.8 + 2.8 + 2.8 + 2.8 + 2 + 2 = 35.2 m Area: –Two trapezoids and a rectangle –(.5)(2)(10 + 14) + (.5)(2)(10 + 14) + 2 14 –84 m 2 10 m 14 m4 m 2 2.8 m 2 m

Download ppt "Formulas… They help us find the area. They did not fall out of the sky! In Exploration 10.7, you will develop the formulas for the area of a triangle,"

Similar presentations

Triangles, Trapezoids & Kites

Triangles, Trapezoids & Kites
Volume and Total Surface Area of RIGHT Prisms and CYLINDERS.

Volume and Total Surface Area of RIGHT Prisms and CYLINDERS.
Areas of Rectangles and Parallelograms Areas of Triangles, Trapezoids and Kites.

Areas of Rectangles and Parallelograms Areas of Triangles, Trapezoids and Kites.
Perimeter and Area. Objectives Calculate the area of given geometric figures. Calculate the perimeter of given geometric figures. Use the Pythagorean.

Perimeter and Area. Objectives Calculate the area of given geometric figures. Calculate the perimeter of given geometric figures. Use the Pythagorean.
Developing Formulas for Triangles and Quadrilaterals

Developing Formulas for Triangles and Quadrilaterals
7.4 Areas of Triangles and Quadrilaterals

7.4 Areas of Triangles and Quadrilaterals
1. A kite has two diagonals. We’ll label them. 2. The diagonals in a kite make a right angle. 3. Let’s put a rectangle around the kite because we know.

1. A kite has two diagonals. We’ll label them. 2. The diagonals in a kite make a right angle. 3. Let’s put a rectangle around the kite because we know.
TODAY IN GEOMETRY…  Review: Pythagorean Theorem and Perimeter  Learning Target: 11.1-11.2 You will find areas of different polygons  Independent practice.

TODAY IN GEOMETRY…  Review: Pythagorean Theorem and Perimeter  Learning Target: You will find areas of different polygons  Independent practice.
Unit 10 Review By Cindy Lee and Nitin Kinra. Formulas Heron’s Formula S= a+b+c/2 A= √s(s-a)(s-b)(s-c) Equilateral Triangle A= x² √3/4 Area of Circle A=πr².

Unit 10 Review By Cindy Lee and Nitin Kinra. Formulas Heron’s Formula S= a+b+c/2 A= √s(s-a)(s-b)(s-c) Equilateral Triangle A= x² √3/4 Area of Circle A=πr².
find the perimeter and area of triangles and trapezoids.

find the perimeter and area of triangles and trapezoids.
$100 Area of Parallelograms Area of Triangles Perimeter And Area Area of Trapezoids Area of Compound Figures & Area and Circumference of Circles $200.

$100 Area of Parallelograms Area of Triangles Perimeter And Area Area of Trapezoids Area of Compound Figures & Area and Circumference of Circles $200.
© 2008 Pearson Addison-Wesley. All rights reserved 9-3-1 Chapter 1 Section 9-3 Perimeter, Area, and Circumference.

© 2008 Pearson Addison-Wesley. All rights reserved Chapter 1 Section 9-3 Perimeter, Area, and Circumference.
You will learn to find the perimeter and area for different shapes and the circumference of circles. s s Perimeter = 4s or s+s+s+s Area = s 2 l w P =

You will learn to find the perimeter and area for different shapes and the circumference of circles. s s Perimeter = 4s or s+s+s+s Area = s 2 l w P =
Geometric Formulas RectangleSquare Parallelogram Triangle Ch. 5: 2 – D Measurement Trapezoid.

Geometric Formulas RectangleSquare Parallelogram Triangle Ch. 5: 2 – D Measurement Trapezoid.
Unit 10 Review Area Formulas. FOR EACH FIGURE: IMAGINE the shape THINK of its AREA FORMULA.

Unit 10 Review Area Formulas. FOR EACH FIGURE: IMAGINE the shape THINK of its AREA FORMULA.
Prerequisite 12.0 OBJECTIVE:  Solve for area of various quadrilaterals, triangles, and circles  Solve for perimeter of irregular figures and circles.

Prerequisite 12.0 OBJECTIVE:  Solve for area of various quadrilaterals, triangles, and circles  Solve for perimeter of irregular figures and circles.
Section 9-4 Perimeter, Area, and Circumference.

Section 9-4 Perimeter, Area, and Circumference.
ACT ASPIRE PART 1 Geometry Pythagorean Theorem.

ACT ASPIRE PART 1 Geometry Pythagorean Theorem.
Geometry Section 9.4 Special Right Triangle Formulas

Geometry Section 9.4 Special Right Triangle Formulas
Camilo Henao Dylan Starr. Postulate 17 & 18 Postulate 17: The area of a square is the square of the length of a side (pg.423) A=s 2 Postulate 18 (Area.

Camilo Henao Dylan Starr. Postulate 17 & 18 Postulate 17: The area of a square is the square of the length of a side (pg.423) A=s 2 Postulate 18 (Area.

Similar presentations

Ads by Google