Title: Perimeter and Area in
1Perimeter and Area in the Coordinate Plane
10-4
Warm Up
Lesson Presentation
Lesson Quiz
Holt Geometry
Holt McDougal Geometry
2Warm Up Use the slope formula to determine the
slope of each line. 1. 2. 3. Simplify
3Objective
Find the perimeters and areas of figures in a
coordinate plane.
4In Lesson 10-3, you estimated the area
of irregular shapes by drawing composite figures
that approximated the irregular shapes and by
using area formulas. Another method of
estimating area is to use a grid and count the
squares on the grid.
5Example 1 Estimating Areas of Irregular Shapes
in the Coordinate Plane
Estimate the area of the irregular shape.
6Example 1A Continued
Method 1 Draw a composite figure that
approximates the irregular shape and find the
area of the composite figure.
The area is approximately 4 5.5 2 3 3
4 1.5 1 6 30 units2.
7Example 1A Continued
There are approximately 24 whole squares and 14
half squares, so the area is about
8Check It Out! Example 1
Estimate the area of the irregular shape.
There are approximately 33 whole squares and 9
half squares, so the area is about 38 units2.
9(No Transcript)
10Example 2 Finding Perimeter and Area in the
Coordinate Plane
Draw and classify the polygon with vertices E(1,
1), F(2, 2), G(1, 4), and H(4, 3). Find the
perimeter and area of the polygon.
Step 1 Draw the polygon.
11Example 2 Continued
Step 2 EFGH appears to be a parallelogram. To
verify this, use slopes to show that opposite
sides are parallel.
12Example 2 Continued
The opposite sides are parallel, so EFGH is a
parallelogram.
13Example 2 Continued
Step 3 Since EFGH is a parallelogram, EF GH,
and FG HE.
Use the Distance Formula to find each side length.
perimeter of EFGH
14Example 2 Continued
To find the area of EFGH, draw a line to divide
EFGH into two triangles. The base and height of
each triangle is 3. The area of each triangle is
The area of EFGH is 2(4.5) 9 units2.
15Check It Out! Example 2
Draw and classify the polygon with vertices H(3,
4), J(2, 6), K(2, 1), and L(3, 1). Find the
perimeter and area of the polygon.
Step 1 Draw the polygon.
16Check It Out! Example 2 Continued
Step 2 HJKL appears to be a parallelogram. To
verify this, use slopes to show that opposite
sides are parallel.
17Check It Out! Example 2 Continued
The opposite sides are parallel, so HJKL is a
parallelogram.
18Check It Out! Example 2 Continued
Step 3 Since HJKL is a parallelogram, HJ KL,
and JK LH.
Use the Distance Formula to find each side length.
perimeter of EFGH
19Check It Out! Example 2 Continued
To find the area of HJKL, draw a line to divide
HJKL into two triangles. The base and height of
each triangle is 3. The area of each triangle is
The area of HJKL is 2(12.5) 25 units2.
20Example 3 Finding Areas in the Coordinate Plane
by Subtracting
Find the area of the polygon with vertices
A(4, 0), B(2, 3), C(4, 0), and D(2, 3).
Draw the polygon and close it in a rectangle.
Area of rectangle
A bh 8(6) 48 units2.
21Example 3 Continued
Area of triangles
The area of the polygon is 48 9 3 9 3
24 units2.
22Check It Out! Example 3
Find the area of the polygon with vertices K(2,
4), L(6, 2), M(4, 4), and N(6, 2).
Draw the polygon and close it in a rectangle.
Area of rectangle
A bh 12(8) 96 units2.
23Check It Out! Example 3 Continued
Area of triangles
b
a
d
c
The area of the polygon is 96 12 24 2 10
48 units2.
24Lesson Quiz Part I
1. Estimate the area of the irregular shape.
25.5 units2
2. Draw and classify the polygon with vertices
L(2, 1), M(2, 3), N(0, 3), and P(1, 0). Find
the perimeter and area of the polygon.
25Lesson Quiz Part II
3. Find the area of the polygon with vertices
S(1, 1), T(2, 1), V(3, 2), and W(2, 2).
A 12 units2