TBIL-Precal Distance and Midpoint (EQ3)

Section 1.3 Distance and Midpoint (EQ3)

Objectives

Given two points, determine the distance between them and the midpoint of the line segment connecting them.
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Subsection 1.3.1 Activities

Activity 1.3.1.

The points \(A \) and \(B \) are shown in the graph below. Use the graph to answer the following questions:

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(a)

Draw a right triangle so that the hypotenuse is the line segment between points \(A\) and \(B \text{.}\) Label the third point of the triangle \(C\text{.}\)

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Answer.

Point \(C\) should be at the point \((2,2)\text{.}\)

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(b)

Find the lengths of line segments \(AC \) and \(BC \text{.}\)

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Answer.

\(AC\) is \(4\) units long. \(BC\) is \(2\) units long.

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Make sure students pay attention to the scale.

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(c)

Now that you know the lengths of \(AC \) and \(BC \text{,}\) how can you find the length of \(AB \text{?}\) Find the length of \(AB\text{.}\)

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Answer.

Students should see that they can use the Pythagorean Theorem to find the length of side \(AB\) (which is \(\sqrt{20}\) or approximately \(4.5\)).

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Remark 1.3.3.

Using the Pythagorean Theorem \((a^2+b^2=c^2)\) can be helpful in finding the distance of a line segment (as long as you create a right triangle!).

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Activity 1.3.4.

Suppose you are given two points \((x_{1},y_{1})\) and \((x_{2},y_{2})\text{.}\) Let’s investigate how to find the length of the line segment that connects these two points!

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(a)

Draw a sketch of a right triangle so that the hypotenuse is the line segment between the two points.

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Answer.

Students may need help in their drawing. Make sure the hypotenuse is the line segment that connects the two points.

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(b)

Find the lengths of the legs of the right triangle.

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Answer.

The lengths of the legs of the triangle should be \(y_{2}-y_{1}\) and \(x_{2}-x_{1}\) (or \(y_{1}-y_{2}\) and \(x_{1}-x_{2}\) depending on how students created their drawing).

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(c)

Find the length of the line segment that connects the two original points.

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Answer.

Students should see the connection to the previous activity and apply the Pythagorean Theorem. They should get either \(\sqrt{(x_{2}-x_{1})^2+(y_{2}-y_{1})^2}\) or \(\sqrt{(x_{1}-x_{2})^2+(y_{1}-y_{2})^2}\) to represent the length of the side that connects the two points.

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Definition 1.3.5.

The distance, \(d\text{,}\) between two points, \((x_{1},y_{1})\) and \((x_{2}, y_{2})\text{,}\) can be found by using the distance formula:

\begin{equation*} d=\sqrt{(x_{2}-x_{1})^2+(y_{2}-y_{1})^2} \end{equation*}

Notice that the distance formula is an application of the Pythagorean Theorem!

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Activity 1.3.6.

Apply Definition 1.3.5 to calculate the distance between the given points.

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(a)

What is the distance between \((4,6)\) and \((9,15)\text{?}\)

\(\displaystyle 10.2\)

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\(\displaystyle 10.3\)

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\(\displaystyle \sqrt{106}\)

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\(\displaystyle \sqrt{56}\)

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Answer.

B and C

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(b)

What is the distance between \((-2,5)\) and \((-7,-1)\text{?}\)

\(\displaystyle \sqrt{11}\)

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\(\displaystyle 7.8\)

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\(\displaystyle 3.3\)

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\(\displaystyle \sqrt{61}\)

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Answer.

B and D

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(c)

Suppose the line segment \(AB\) has one endpoint, \(A\text{,}\) at the origin. For which coordinate of \(B\) would make the line segment \(AB\) the longest?

\(\displaystyle (3,7)\)

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\(\displaystyle (2,-8)\)

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\(\displaystyle (-6,4)\)

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\(\displaystyle (-5,-5)\)

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Answer.

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Remark 1.3.7.

Notice in Activity 1.3.6, you can give a distance in either exact form (leaving it with a square root) or as an approximation (as a decimal). Make sure you can give either form as sometimes one form is more useful than another!

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Remark 1.3.8.

A midpoint refers to the point that is located in the middle of a line segment. In other words, the midpoint is the point that is halfway between the two endpoints of a given line segment.

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Activity 1.3.9.

Two line segments are shown in the graph below. Use the graph to answer the following questions:

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(a)

What is the midpoint of the line segment \(AB\text{?}\)

\(\displaystyle (16,4)\)

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\(\displaystyle (8,4)\)

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\(\displaystyle (8,8)\)

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\(\displaystyle (10,2)\)

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Answer.

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(b)

What is the midpoint of the line segment \(AC\text{?}\)

\(\displaystyle (6,0)\)

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\(\displaystyle (4,4)\)

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\(\displaystyle (6,4)\)

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\(\displaystyle (5,2)\)

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Answer.

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(c)

Suppose we connect the two endpoints of the two line segments together, to create the new line segment, \(BC\text{.}\) Can you make an educated guess to where the midpoint of \(BC\) is?

\(\displaystyle (10,8)\)

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\(\displaystyle (6,4)\)

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\(\displaystyle (5,4)\)

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\(\displaystyle (5,2)\)

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Answer.

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(d)

How can you test your conjecture? Is there a mathematical way to find the midpoint of any line segment?

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Answer.

Not all students may get to the midpoint formula, but the idea is to get them in that general direction.

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Definition 1.3.11.

The midpoint of a line segment with endpoints \((x_{1},y_{1})\) and \((x_{2}, y_{2})\text{,}\) can be found by taking the average of the \(x\) and \(y\) values. Mathematically, the midpoint formula states that the midpoint of a line segment can be found by:

\begin{equation*} \left(\dfrac{x_{1}+x_{2}}{2},\dfrac{y_{1}+y_{2}}{2}\right) \end{equation*}

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Activity 1.3.12.

Apply Definition 1.3.11 to calculate the midpoint of the following line segments.

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(a)

What is the midpoint of the line segment with endpoints \((-4,5)\) and \((-2,-3)\text{?}\)

\(\displaystyle (3,1)\)

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\(\displaystyle (-3,1)\)

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\(\displaystyle (1,1)\)

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\(\displaystyle (1,4)\)

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Answer.

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(b)

What is the midpoint of the line segment with endpoints \((2,6)\) and \((-6,-8)\text{?}\)

\(\displaystyle (-3,-1)\)

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\(\displaystyle (-2,0)\)

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\(\displaystyle (-2,-1)\)

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\(\displaystyle (4,7)\)

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Answer.

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(c)

Suppose \(C\) is the midpoint of \(AB\) and is located at \((9,8)\text{.}\) The coordinates of \(A\) are \((10,10)\text{.}\) What are the coordinates of \(B\text{?}\)