Learn on PengienVision, Mathematics, Grade 6Chapter 2: Integers and Rational Numbers

Lesson 6: Represent Polygons on the Coordinate Plane

In this Grade 6 lesson from enVision Mathematics Chapter 2, students learn how to find side lengths of polygons plotted on a coordinate plane by adding or subtracting the absolute values of vertex coordinates. The lesson covers calculating the perimeter of rectangles and irregular polygons using coordinates, and applying distance to determine whether triangles are isosceles. Real-world contexts such as archaeological dig sites and ranch fencing problems give students practice with standards 6.NS.C.8 and 6.G.A.3.

Section 1

Find the Perimeter of a Rectangle on the Coordinate Plane

Property

The perimeter of a rectangle is the sum of its four side lengths. For a rectangle with horizontal and vertical sides, the lengths can be found using the coordinates of its vertices. The perimeter $P$ is calculated by adding the lengths of the two horizontal sides and the two vertical sides.

P = \text{side}_1 + \text{side}_2 + \text{side}_3 + \text{side}_4

Examples

A rectangle has vertices at $(-2, 3)$ , $(4, 3)$ , $(4, -1)$ , and $(-2, -1)$ . The horizontal sides have length $|4 - (-2)| = 6$ units. The vertical sides have length $|3 - (-1)| = 4$ units. The perimeter is $P = 6 + 6 + 4 + 4 = 20$ units.
A square has vertices at $(1, 1)$ , $(5, 1)$ , $(5, 5)$ , and $(1, 5)$ . All sides have length $|5 - 1| = 4$ units. The perimeter is $P = 4 + 4 + 4 + 4 = 16$ units.

Explanation

To find the perimeter of a rectangle on a coordinate plane, first determine the lengths of its horizontal and vertical sides. Use the absolute value of the difference in the x-coordinates for horizontal lengths and the y-coordinates for vertical lengths. Since a rectangle has two pairs of equal-length sides, you will calculate one horizontal length and one vertical length. Finally, add all four side lengths together to find the total perimeter of the rectangle.

Section 2

Find the Perimeter of a Polygon on the Coordinate Plane

Property

The perimeter, $P$ , of a polygon on the coordinate plane is the sum of the lengths of all its sides. For a polygon with $n$ sides of lengths $s_1, s_2, ..., s_n$ , the perimeter is calculated as:

P = s_1 + s_2 + ... + s_n

The lengths of horizontal and vertical sides are found by calculating the distances between their vertices.

Examples

Find the perimeter of a polygon with vertices $A(-2, 1)$ , $B(3, 1)$ , $C(3, -3)$ , and $D(-2, -3)$ .

The side lengths are $AB = |3 - (-2)| = 5$ , $BC = |1 - (-3)| = 4$ , $CD = |3 - (-2)| = 5$ , and $DA = |-3 - 1| = 4$ .
The perimeter is $P = 5 + 4 + 5 + 4 = 18$ units.

Find the perimeter of a polygon with vertices $P(1, 4)$ , $Q(5, 4)$ , $R(5, 2)$ , $S(3, 2)$ , $T(3, 1)$ , and $U(1, 1)$ .

The side lengths are $PQ=4$ , $QR=2$ , $RS=2$ , $ST=1$ , $TU=2$ , $UP=3$ .
The perimeter is $P = 4 + 2 + 2 + 1 + 2 + 3 = 14$ units.

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Chapter 2: Integers and Rational Numbers

Back to enVision, Mathematics, Grade 6

Lesson 1
Lesson 1: Understand Integers
Learn Practice
Lesson 2
Lesson 2: Represent Rational Numbers on the Number Line
Learn Practice
Lesson 3
Lesson 3: Absolute Values of Rational Numbers
Learn Practice
Lesson 4
Lesson 4: Represent Rational Numbers on the Coordinate Plane
Learn Practice
Lesson 5
Lesson 5: Find Distances on the Coordinate Plane
Learn Practice
Lesson 6Current
Lesson 6: Represent Polygons on the Coordinate Plane
Learn Practice

Lesson overview

Expand to review the lesson summary and core properties.

Expand

Section 1

Find the Perimeter of a Rectangle on the Coordinate Plane

Property

P = \text{side}_1 + \text{side}_2 + \text{side}_3 + \text{side}_4

Examples

A rectangle has vertices at $(-2, 3)$ , $(4, 3)$ , $(4, -1)$ , and $(-2, -1)$ . The horizontal sides have length $|4 - (-2)| = 6$ units. The vertical sides have length $|3 - (-1)| = 4$ units. The perimeter is $P = 6 + 6 + 4 + 4 = 20$ units.
A square has vertices at $(1, 1)$ , $(5, 1)$ , $(5, 5)$ , and $(1, 5)$ . All sides have length $|5 - 1| = 4$ units. The perimeter is $P = 4 + 4 + 4 + 4 = 16$ units.

Explanation

Section 2

Find the Perimeter of a Polygon on the Coordinate Plane

Property

The perimeter, $P$ , of a polygon on the coordinate plane is the sum of the lengths of all its sides. For a polygon with $n$ sides of lengths $s_1, s_2, ..., s_n$ , the perimeter is calculated as:

P = s_1 + s_2 + ... + s_n

The lengths of horizontal and vertical sides are found by calculating the distances between their vertices.

Examples

Find the perimeter of a polygon with vertices $A(-2, 1)$ , $B(3, 1)$ , $C(3, -3)$ , and $D(-2, -3)$ .

The side lengths are $AB = |3 - (-2)| = 5$ , $BC = |1 - (-3)| = 4$ , $CD = |3 - (-2)| = 5$ , and $DA = |-3 - 1| = 4$ .
The perimeter is $P = 5 + 4 + 5 + 4 = 18$ units.

Find the perimeter of a polygon with vertices $P(1, 4)$ , $Q(5, 4)$ , $R(5, 2)$ , $S(3, 2)$ , $T(3, 1)$ , and $U(1, 1)$ .

The side lengths are $PQ=4$ , $QR=2$ , $RS=2$ , $ST=1$ , $TU=2$ , $UP=3$ .
The perimeter is $P = 4 + 2 + 2 + 1 + 2 + 3 = 14$ units.

Book overview

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Chapter 2: Integers and Rational Numbers

Back to enVision, Mathematics, Grade 6

Lesson 1
Lesson 1: Understand Integers
Learn Practice
Lesson 2
Lesson 2: Represent Rational Numbers on the Number Line
Learn Practice
Lesson 3
Lesson 3: Absolute Values of Rational Numbers
Learn Practice
Lesson 4
Lesson 4: Represent Rational Numbers on the Coordinate Plane
Learn Practice
Lesson 5
Lesson 5: Find Distances on the Coordinate Plane
Learn Practice
Lesson 6Current
Lesson 6: Represent Polygons on the Coordinate Plane
Learn Practice

Overview

Lesson overview

Review the lesson summary and core properties without leaving the current page.

Overview

Section 1

Find the Perimeter of a Rectangle on the Coordinate Plane

Property

P = \text{side}_1 + \text{side}_2 + \text{side}_3 + \text{side}_4

Examples

A rectangle has vertices at $(-2, 3)$ , $(4, 3)$ , $(4, -1)$ , and $(-2, -1)$ . The horizontal sides have length $|4 - (-2)| = 6$ units. The vertical sides have length $|3 - (-1)| = 4$ units. The perimeter is $P = 6 + 6 + 4 + 4 = 20$ units.
A square has vertices at $(1, 1)$ , $(5, 1)$ , $(5, 5)$ , and $(1, 5)$ . All sides have length $|5 - 1| = 4$ units. The perimeter is $P = 4 + 4 + 4 + 4 = 16$ units.

Explanation

Section 2

Find the Perimeter of a Polygon on the Coordinate Plane

Property

The perimeter, $P$ , of a polygon on the coordinate plane is the sum of the lengths of all its sides. For a polygon with $n$ sides of lengths $s_1, s_2, ..., s_n$ , the perimeter is calculated as:

P = s_1 + s_2 + ... + s_n

The lengths of horizontal and vertical sides are found by calculating the distances between their vertices.

Examples

Find the perimeter of a polygon with vertices $A(-2, 1)$ , $B(3, 1)$ , $C(3, -3)$ , and $D(-2, -3)$ .

The side lengths are $AB = |3 - (-2)| = 5$ , $BC = |1 - (-3)| = 4$ , $CD = |3 - (-2)| = 5$ , and $DA = |-3 - 1| = 4$ .
The perimeter is $P = 5 + 4 + 5 + 4 = 18$ units.

Find the perimeter of a polygon with vertices $P(1, 4)$ , $Q(5, 4)$ , $R(5, 2)$ , $S(3, 2)$ , $T(3, 1)$ , and $U(1, 1)$ .

The side lengths are $PQ=4$ , $QR=2$ , $RS=2$ , $ST=1$ , $TU=2$ , $UP=3$ .
The perimeter is $P = 4 + 2 + 2 + 1 + 2 + 3 = 14$ units.

Book overview

Jump across lessons in the current chapter without opening the full course modal.

Continue this chapter

Chapter 2: Integers and Rational Numbers

Back to enVision, Mathematics, Grade 6

Lesson 1
Lesson 1: Understand Integers
Learn Practice
Lesson 2
Lesson 2: Represent Rational Numbers on the Number Line
Learn Practice
Lesson 3
Lesson 3: Absolute Values of Rational Numbers
Learn Practice
Lesson 4
Lesson 4: Represent Rational Numbers on the Coordinate Plane
Learn Practice
Lesson 5
Lesson 5: Find Distances on the Coordinate Plane
Learn Practice
Lesson 6Current
Lesson 6: Represent Polygons on the Coordinate Plane
Learn Practice

Lesson 6: Represent Polygons on the Coordinate Plane

Property

Examples

Explanation

Property

Examples

Chapter 2: Integers and Rational Numbers

Lesson 1: Understand Integers

Lesson 2: Represent Rational Numbers on the Number Line

Lesson 3: Absolute Values of Rational Numbers

Lesson 4: Represent Rational Numbers on the Coordinate Plane

Lesson 5: Find Distances on the Coordinate Plane

Lesson 6: Represent Polygons on the Coordinate Plane

Lesson overview

Property

Examples

Explanation

Property

Examples

Chapter 2: Integers and Rational Numbers

Lesson 1: Understand Integers

Lesson 2: Represent Rational Numbers on the Number Line

Lesson 3: Absolute Values of Rational Numbers

Lesson 4: Represent Rational Numbers on the Coordinate Plane

Lesson 5: Find Distances on the Coordinate Plane

Lesson 6: Represent Polygons on the Coordinate Plane

Lesson 1: Understand Integers

Lesson 2: Represent Rational Numbers on the Number Line

Lesson 3: Absolute Values of Rational Numbers

Lesson 4: Represent Rational Numbers on the Coordinate Plane

Lesson 5: Find Distances on the Coordinate Plane

Lesson 6: Represent Polygons on the Coordinate Plane