Presentation is loading. Please wait.

Presentation is loading. Please wait.

1 3-10-15 Area and Perimeter Unit Area of 2-D Shapes.

Published byJoshua Horn Modified over 9 years ago

Similar presentations

Presentation on theme: "1 3-10-15 Area and Perimeter Unit Area of 2-D Shapes."— Presentation transcript:

1 1 3-10-15 Area and Perimeter Unit Area of 2-D Shapes

2 2 Squares and Rectangles s s A = s² 6 6 A = 6² = 36 sq. units b h A = bh 12 5 A = 12 x 5 = 60 sq. units Example: Area of Rectangle: A = bh Area of Square: A = s²

3 3 Circles and Sectors r 9 cm A =  (9)² = 81  sq. cm Area of Circle: A =  r² arc r B C A 120° Example: 9 cm

4 4 Triangles and Trapezoids h h h b b b1b1 b2b2 h is the distance from a vertex of the triangle perpendicular to the opposite side. h is the distance from b 1 to b 2, perpendicular to each base

5 5 Example: Triangles and Trapezoids 7 6 8 12 6

6 Example: 10 12 First: Find the height. The height bisects the base. So, b=6. Now we need to find the missing side. IDEAS???? * hint: we are now working with a right triangle. We know 2 of its sides. THAT’S RIGHT!!! Pythagorean Theorem a²+b²=c² 6²+x²=10² 36+x²=100 x²=64 x=8

7 7 Parallelograms & Rhombi Area of Parallelogram: A = bh 6 9 A = 9 x 6 = 54 sq. units 8 10 A = ½ (8)(10) = 40 sq units h b Example:

8 8 Area of Regions 8 10 12 414 8 The area of a region is the sum of all of its non-overlapping parts. A=½bh A = ½(8)(10) A= 40 A=bh A = (12)(10) A= 120 A=bh A = (4)(8) A=32 A=bh A = (14)(8) A=112 Area = 40 + 120 + 32 + 112 = 304 sq. units

9 Examples: Cut the shape into several basic shapes. A B C Section A A=bh A=4*5 A=20 cm² Section B A=bh A=3*5 A=15 cm² Section C A=s² A=3² A=9 cm² Whole shape= 20+15+9= 44 cm²

10 Terms to Know: For any regular polygon : Radius : is a segment joining the center to any vertex Apothem : is a segment joining the center to the midpoint of any side and is also perpendicular to the side.

11 Area of a regular polygon: Remember all angles are congruent and all sides are congruent. Regular pentagon: O is the center OA the radius OM is an apothem N T A O M E P

12 Apothems Facts : 1.All apothems of a regular polygon are congruent. 2.Only regular polygons have apothems. 3.An apothem is the perpendicular bisector of a side.

13 13 Areas of Regular Polygons Perimeter = (6)(8) = 48 apothem = Area = ½ (48)( ) = sq. units 8 A reg. poly = ½ a p Area of a regular polygon equals one-half the product of the apothem and the perimeter. Where : a = apothem p = perimeter

Download ppt "1 3-10-15 Area and Perimeter Unit Area of 2-D Shapes."

Similar presentations

Area of 2-D Shapes 1 G.13 * Area of 2-D Shapes. Area of 2-D Shapes 2 Squares and Rectangles s s A = s² 6 6 A = 6² = 36 sq. units L W A = LW 12 5 A = 12.

Area of 2-D Shapes 1 G.13 * Area of 2-D Shapes. Area of 2-D Shapes 2 Squares and Rectangles s s A = s² 6 6 A = 6² = 36 sq. units L W A = LW 12 5 A = 12.
Lesson 9-1: Area of 2-D Shapes 1 Lesson 9-1 Area of 2-D Shapes.

Lesson 9-1: Area of 2-D Shapes 1 Lesson 9-1 Area of 2-D Shapes.
6.1 Circles and Related Segments and Angles

6.1 Circles and Related Segments and Angles
Jim Smith JCHS 3108.1.9 Expand analysis of units of measure to include area and volume. 3108.4.27 Use right triangle trigonometry to find the area and.

Jim Smith JCHS Expand analysis of units of measure to include area and volume Use right triangle trigonometry to find the area and.
Chapter 11 Areas of Plane Figures Understand what is meant by the area of a polygon. Know and use the formulas for the areas of plane figures. Work geometric.

Chapter 11 Areas of Plane Figures Understand what is meant by the area of a polygon. Know and use the formulas for the areas of plane figures. Work geometric.
Area of a rectangle: A = bh This formula can be used for squares and parallelograms. b h.

Area of a rectangle: A = bh This formula can be used for squares and parallelograms. b h.
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.
TMAT 103 Chapter 2 Review of Geometry. TMAT 103 §2.1 Angles and Lines.

TMAT 103 Chapter 2 Review of Geometry. TMAT 103 §2.1 Angles and Lines.
Section 9-4 Perimeter, Area, and Circumference.

Section 9-4 Perimeter, Area, and Circumference.
Chapter 10 Section Areas of Parallelograms and Triangles

Chapter 10 Section Areas of Parallelograms and Triangles
The perimeter of a triangle is the measure around the triangle = a + b + c.

The perimeter of a triangle is the measure around the triangle = a + b + c.
Areas of Parallelograms and Triangles

Areas of Parallelograms and Triangles
Areas of Regular Polygons Lesson 11.5. Equilateral Triangle Remember: drop an altitude and you create two 30-60-90 triangles. What is the measure of the.

Areas of Regular Polygons Lesson Equilateral Triangle Remember: drop an altitude and you create two triangles. What is the measure of the.
Rectangle l - length w - width Square s – side length s s s.

Rectangle l - length w - width Square s – side length s s s.
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.
Section 16.1 Pythagorean Theorem a=11.6. x=3.86 y=4.60 x=9.90 35.7 15.3.

Section 16.1 Pythagorean Theorem a=11.6. x=3.86 y=4.60 x=
Lesson 8-4 Areas of Regular Polygons. In this lesson you will… ● Discover the area formula for regular polygons Areas of Regular Polygons.

Lesson 8-4 Areas of Regular Polygons. In this lesson you will… ● Discover the area formula for regular polygons Areas of Regular Polygons.
Review: Area of 2-D Shapes Keystone Geometry.

Review: Area of 2-D Shapes Keystone Geometry.
Polygons OBJECTIVES Exterior and interior angles Area of polygons & circles Geometric probability.

Polygons OBJECTIVES Exterior and interior angles Area of polygons & circles Geometric probability.
Areas of Regular Polygons Section 11.2. Theorem 11.3 Area of an Equilateral Triangle: The area of an EQUILATERAL triangle is one fourth the square of.

Areas of Regular Polygons Section Theorem 11.3 Area of an Equilateral Triangle: The area of an EQUILATERAL triangle is one fourth the square of.

Similar presentations

Ads by Google