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38.4: Distances on a Coordinate Plane

  • Page ID
    40826
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    Lesson

    Let's explore distance on the coordinate plane.

    Exercise \(\PageIndex{1}\): Coordinate Patterns

    Plot points in your assigned quadrant and label them with their coordinates.

    Exercise \(\PageIndex{2}\): Signs of Numbers in Coordinates

    1. Write the coordinates of each point.
    • \(A=\)
    • \(B=\)
    • \(C=\)
    • \(D=\)
    • \(E=\)
    1. Answer these questions for each pair of points.
    • How are the coordinates the same? How are they different?
    • How far away are they from the y-axis? To the left or to the right of it?
    • How far away are they from the x-axis? Above or below it?
    1. \(A\) and \(B\)
    2. \(B\) and \(D\)
    3. \(A\) and \(D\)

    Pause here for a class discussion.

    1. Point \(F\) has the same coordinates as point \(C\), except its \(y\)-coordinate has the opposite sign.
    1. Plot point \(F\) on the coordinate plane and label it with its coordinates.
    2. How far away are \(F\) and \(C\) from the \(x\)-axis?
    3. What is the distance between \(F\) and \(C\)?
    1. Point \(G\) has the same coordinates as point \(E\), except its \(x\)-coordinate has the opposite sign.
      1. Plot point \(G\) on the coordinate plane and label it with its coordinates.
      2. How far away are \(G\) and \(E\) from the \(y\)-axis?
      3. What is the distance between and ?
    2. Point \(H\) has the same coordinates as point \(B\), except both of its coordinates have the opposite signs. In which quadrant is point \(H\)?

    Exercise \(\PageIndex{3}\): Finding Distances on a Coordinate Plane

    1. Label each point with its coordinates.
    2. Find the distance between each of the following pairs of points.
      1. Point \(B\) and \(C\)
      2. Point \(D\) and \(B\)
      3. Point \(D\) and \(E\)
    3. Which of the points are 5 units from \((-1.5,-3)\)?
    4. Which of the points are 2 units from \((0.5,-4.5)\)?
    5. Plot a point that is both 2.5 units from \(A\) and 9 units from \(E\). Label that point \(F\) and write down its coordinates.

    Are you ready for more?

    Priya says, “There are exactly four points that are 3 units away from \((-5,0)\).” Lin says, “I think there are a whole bunch of points that are 3 units away from \((-5,0)\).”

    Do you agree with either of them? Explain your reasoning.

    Summary

    The points \(A=(5,2), B=(-5,2), C=(-5,-2),\) and \(D=(5,-2)\) are shown in the plane. Notice that they all have almost the same coordinates, except the signs are different. They are all the same distance from each axis but are in different quadrants.

    clipboard_ee3708c4feec23f3bee0122fe14a83932.png
    Figure \(\PageIndex{1}\)

    Notice that the vertical distance between points \(A\) and \(D\) is 4 units, because point \(A\) is 2 units above the horizontal axis and point \(D\) is 2 units below the horizontal axis. The horizontal distance between points \(A\) and \(B\) is 10 units, because point \(B\) is 5 units to the left of the vertical axis and point \(A\) is 5 units to the right of the vertical axis.

    We can always tell which quadrant a point is located in by the signs of its coordinates.

    \(x\) \(y\) quadrant
    positive positive I
    negative positive II
    negative negative III
    positive negative IV
    Table \(\PageIndex{1}\)
    clipboard_eae552a82357273a795d0c57f85e1433d.png
    Figure \(\PageIndex{2}\)

    In general:

    • If two points have \(x\)-coordinates that are opposites (like 5 and -5), they are the same distance away from the vertical axis, but one is to the left and the other to the right.
    • If two points have \(y\)-coordinates that are opposites (like 2 and -2), they are the same distance away from the horizontal axis, but one is above and the other below.

    When two points have the same value for the first or second coordinate, we can find the distance between them by subtracting the coordinates that are different. For example, consider \((1,3)\) and \((5,3)\):

    clipboard_ec17fcfeb25e2e39554965c3ede65a356.png
    Figure \(\PageIndex{3}\)

    They have the same \(y\)-coordinate. If we subtract the \(x\)-coordinates, we get \(5-1=4\). These points are 4 units apart.

    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 \(\PageIndex{4}\)

    Practice

    Exercise \(\PageIndex{4}\)

    Here are 4 points on a coordinate plane.

    clipboard_e23aafa34b3602e2c957126a584a243e6.png
    Figure \(\PageIndex{5}\)
    1. Label each point with its coordinates.
    2. Plot a point that is 3 units from point \(K\). Label it \(P\).
    3. Plot a point that is 2 units from point \(M\). Label it \(W\).

    Exercise \(\PageIndex{5}\)

    Each set of points are connected to form a line segment. What is the length of each?

    1. \(A=(3,5)\) and \(B=(3,6)\)
    2. \(C=(-2,-3)\) and \(D=(-2,-6)\)
    3. \(E=(-3,1)\) and \(F=(-3,-1)\)

    Exercise \(\PageIndex{6}\)

    On the coordinate plane, plot four points that are each 3 units away from point \(P=(-2,-1)\). Write the coordinates of each point.

    clipboard_e5afb40555ec7cf0479e824cc98ce1038.png
    Figure \(\PageIndex{6}\)

    Exercise \(\PageIndex{7}\)

    Noah’s recipe for sparkling orange juice uses 4 liters of orange juice and 5 liters of soda water.

    1. Noah prepares large batches of sparkling orange juice for school parties. He usually knows the total number of liters, \(t\), that he needs to prepare. Write an equation that shows how Noah can find \(s\), the number of liters of soda water, if he knows \(t\).
    2. Sometimes the school purchases a certain number, \(j\), of liters of orange juice and Noah needs to figure out how much sparkling orange juice he can make. Write an equation that Noah can use to find \(t\) if he knows \(j\).

    (From Unit 6.4.1)

    Exercise \(\PageIndex{8}\)

    For a suitcase to be checked on a flight (instead of carried by hand), it can weigh at most 50 pounds. Andre’s suitcase weighs 23 kilograms. Can Andre check his suitcase? Explain or show your reasoning. (Note: 10 kilograms \(\approx\) 22 pounds)

    (From Unit 3.2.3)


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

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