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38.5: Shapes on the Coordinate Plane

  • Page ID
    40825
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    Lesson

    Let's use the coordinate plane to solve problems and puzzles.

    Exercise \(\PageIndex{1}\): Figuring Out The Coordinate Plane

    1. Draw a figure in the coordinate plane with at least three of following properties:
      • 6 vertices
      • 1 pair of parallel sides
      • At least 1 right angle
      • 2 sides the same length
    2. Is your figure a polygon? Explain how you know.

    Exercise \(\PageIndex{2}\): Plotting Polygons

    Here are the coordinates for four polygons. Move the slider to choose the polygon you want to plot. Move the points, in order, to their locations on the coordinate plane. Sketch each one before changing the slider.

    1. Polygon 1: \((-7,4), (-8,5), (-8,6), (-7,7), (-5, 7), (-5,5), (-7,4)\)
    2. Polygon 2: \((4,3), (3,3), (2,2), (2,1), (3,0), (4,0), (5,1), (5,2), (4,3)\)
    3. Polygon 3: \((-8,-5), (-8,-8), (-5,-8), (-5,-5), (-8,-5)\)
    4. Polygon 4: \((-5,1), (-3,-3), (-1,-2), (0,3), (-3,3), (-5,1)\)

    Are you ready for more?

    Find the area of Polygon D in this activity.

    Exercise \(\PageIndex{3}\): Four Quadrants of A-Maze-ing

    1. The following diagram shows Andre’s route through a maze. He started from the lower right entrance.
    clipboard_e0ec4af4309d04cef9e97b49bf9a85e3a.png
    Figure \(\PageIndex{1}\)
    1. What are the coordinates of the first two and the last two points of his route?
    2. How far did he walk from his starting point to his ending point? Show how you know.
    1. Jada went into the maze and stopped at \((-7,2)\).
    1. Plot that point and other points that would lead her out of the maze (through the exit on the upper left side).
    2. How far from \((-7,2)\) must she walk to exit the maze? Show how you know.

    Summary

    We can use coordinates to find lengths of segments in the coordinate plane.

    clipboard_e078e0818ce16babc7de953184f32299a.png
    Figure \(\PageIndex{2}\): Coordinate plane, origin O, axes labeled by ones. Segments connecting, in order, (negative 2 comma 2), (4 comma 2), (4 comma negative 1), (1 comma negative 1), (1 comma negative 4), (negative 2 comma negative 4), (negative 2 comma 2).

    For example, we can find the perimeter of this polygon by finding the sum of its side lengths. Starting from \((-2,2)\) and moving clockwise, we can see that the lengths of the segments are 6, 3, 3, 3, 3, and 6 units. The perimeter is therefore 24 units.

    In general:

    • If two points have the same \(x\)-coordinate, they will be on the same vertical line, and we can find the distance between them.
    • If two points have the same \(y\)-coordinate, they will be on the same horizontal line, and we can find the distance between them.

    Glossary Entries

    Definition: Quadrant

    The coordinate plane is divided into 4 regions called quadrants. The quadrants are numbered using Roman numerals, starting in the top right corner.

    clipboard_e4b97eb06ad2fd5bca9b70a35616eb423.png
    Figure \(\PageIndex{3}\)

    Practice

    Exercise \(\PageIndex{4}\)

    The coordinates of a rectangle are \((3,0), (3,-5), (-4,0)\) and \((-4,-5)\)

    1. What is the length and width of this rectangle?
    2. What is the perimeter of the rectangle?
    3. What is the area of the rectangle?

    Exercise \(\PageIndex{5}\)

    Draw a square with one vertex on the point \((-3,5)\) and a perimeter of 20 units. Write the coordinates of each other vertex.

    clipboard_ef36423fd4e987f8ab55ceed6987310b1.png
    Figure \(\PageIndex{4}\)

    Exercise \(\PageIndex{6}\)

    1. Plot and connect the following points to form a polygon.

    \((-3,2), (2,2), (2,-4), (-1,-4), (-1,-2), (-3,-2), (-3,2)\)

    clipboard_eed1e9d48909bd75a51acc4c770261ae9.png
    Figure \(\PageIndex{5}\)
    1. Find the perimeter of the polygon.

    Exercise \(\PageIndex{7}\)

    For each situation, select all the equations that represent it. Choose one equation and solve it.

    1. Jada’s cat weighs 3.45 kg. Andre’s cat weighs 1.2 kg more than Jada’s cat. How much does Andre’s cat weigh?

    \(x=3.45+1.2\qquad x=3.45-1.2\qquad x+1.2=3.45\qquad x-1.2=3.45\)

    1. Apples cost $1.60 per pound at the farmer’s market. They cost 1.5 times as much at the grocery store. How much do the apples cost per pound at the grocery store?

    \(y=(1.5)\cdot (1.60)\qquad y=1.60\div 1.5\qquad (1.5)y=1.60\qquad \frac{y}{1.5}=1.60\)

    (From Unit 6.1.4)


    38.5: Shapes on the Coordinate Plane is shared under a CC BY 4.0 license and was authored, remixed, and/or curated by LibreTexts.

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