6.5: Trapezoids and Kites
Learning Objectives
 Define and find the properties of trapezoids, isosceles trapezoids, and kites.
 Discover the properties of midsegments of trapezoids.
 Plot trapezoids, isosceles trapezoids, and kites in the coordinate plane.
Review Queue
 Draw a quadrilateral with one set of parallel lines.
 Draw a quadrilateral with one set of parallel lines and two right angles.
 Draw a quadrilateral with one set of parallel lines and two congruent sides.
 Draw a quadrilateral with one set of parallel lines and three congruent sides.
 Draw a quadrilateral with two sets of congruent sides and no parallel sides.
Know What? A traditional kite, seen at the right, is made by placing two pieces of wood perpendicular to each other and one piece of wood is bisected by the other. The typical dimensions are included in the picture. If you have two pieces of wood, 36 inches and 54 inches, determine the values of \begin{align*}x\end{align*} and \begin{align*}2x\end{align*}. Then, determine how large a piece of canvas you would need to make the kite (find the perimeter of the kite).
Trapezoids
Unlike parallelograms, trapezoids have only one set of parallel lines. The other two sides have no restrictions.
Trapezoid: A quadrilateral with exactly one pair of parallel sides.
Examples look like:
Isosceles Trapezoid: A trapezoid where the nonparallel sides are congruent.
The third trapezoid above is an example of an isosceles trapezoid. Think of it as an isosceles triangle with the top cut off. Isosceles trapezoids also have parts that are labeled much like an isosceles triangle. Both parallel sides are called bases.
Isosceles Trapezoids
Previously, we introduced the Base Angles Theorem with isosceles triangles. The theorem states that in an isosceles triangle, the two base angles are congruent. This property holds true for isosceles trapezoids. The two angles along the same base in an isosceles trapezoid will also be congruent. This creates two pairs of congruent angles.
Theorem 617: The base angles of an isosceles trapezoid are congruent.
Example 1: Look at trapezoid \begin{align*}TRAP\end{align*} below. What is \begin{align*}m \angle A\end{align*}?
Solution: \begin{align*}TRAP\end{align*} is an isosceles trapezoid. So, \begin{align*}m \angle R = 115^\circ\end{align*}, by Theorem 617. To find \begin{align*}m \angle A\end{align*}, set up an equation.
\begin{align*}115^\circ + 115^\circ + m \angle A + m \angle P & = 360^\circ\\ 230^\circ + 2m \angle A & = 360^\circ \rightarrow m \angle A = m \angle P\\ 2m \angle A & = 130^\circ\\ m \angle A & = 65^\circ\end{align*}
Notice that \begin{align*}m \angle R + m \angle A = 115^\circ + 65^\circ = 180^\circ\end{align*}. These angles will always be supplementary because of the Consecutive Interior Angles Theorem from Chapter 3. Therefore, the two angles along the same leg (or nonparallel side) are always going to be supplementary. Only in isosceles trapezoids will opposite angles also be supplementary.
Example 2: Write a twocolumn proof.
Given: Trapezoid \begin{align*}ZOID\end{align*} and parallelogram \begin{align*}ZOIM\end{align*}
\begin{align*}\angle D \cong \angle I\end{align*}
Prove: \begin{align*}\overline{ZD} \cong \overline{OI}\end{align*}
Solution:
Statement  Reason 

1. Trapezoid \begin{align*}ZOID\end{align*} and parallelogram \begin{align*}ZOIM, \ \angle D \cong \angle I\end{align*}  Given 
2. \begin{align*}\overline{ZM} \cong \overline{OI}\end{align*}  Opposite Sides Theorem 
3. \begin{align*}\angle I \cong \angle ZMD\end{align*}  Corresponding Angles Postulate 
4. \begin{align*}\angle D \cong \angle ZMD\end{align*}  Transitive PoC 
5. \begin{align*}\overline{ZM} \cong \overline{ZD}\end{align*}  Base Angles Converse 
6. \begin{align*}\overline{ZD} \cong \overline{OI}\end{align*}  Transitive PoC 
In this example we proved the converse of Theorem 617.
Theorem 617 Converse: If a trapezoid has congruent base angles, then it is an isosceles trapezoid.
Next, we will investigate the diagonals of an isosceles triangle. Recall, that the diagonals of a rectangle are congruent AND they bisect each other. The diagonals of an isosceles trapezoid are also congruent, but they do NOT bisect each other.
Isosceles Trapezoid Diagonals Theorem: The diagonals of an isosceles trapezoid are congruent.
Example 3: Show \begin{align*}TA = RP\end{align*}.
Solution: This is an example of a coordinate proof. Here, we will use the distance formula to show that \begin{align*}TA = RP\end{align*}, but with letters instead of numbers for the coordinates.
\begin{align*}TA & = \sqrt{(xd)^2+(0y)^2} && RP = \sqrt{(xd0)^2+(y0)^2}\\ & = \sqrt{(xd)^2+(y)^2} && \quad \ \ = \sqrt{(xd)^2+y^2}\\ & = \sqrt{(xd)^2+y^2}\end{align*}
Notice that we end up with the same thing for both diagonals. This means that the diagonals are equal and we have proved the theorem.
Midsegment of a Trapezoid
Midsegment (of a trapezoid): A line segment that connects the midpoints of the nonparallel sides.
There is only one midsegment in a trapezoid. It will be parallel to the bases because it is located halfway between them. Similar to the midsegment in a triangle, where it is half the length of the side it is parallel to, the midsegment of a trapezoid also has a link to the bases.
Investigation 65: Midsegment Property
Tools Needed: graph paper, pencil, ruler
 Draw a trapezoid on your graph paper with vertices \begin{align*}A(1, 5), \ B( 2, 5), \ C(6, 1)\end{align*} and \begin{align*}D(3, 1)\end{align*}. Notice this is NOT an isosceles trapezoid.
 Find the midpoint of the nonparallel sides either by using slopes or the midpoint formula. Label them \begin{align*}E\end{align*} and \begin{align*}F\end{align*}. Connect the midpoints to create the midsegment.
 Find the lengths of \begin{align*}AB, \ EF\end{align*}, and \begin{align*}CD\end{align*}. Can you write a formula to find the midsegment?
Midsegment Theorem: The length of the midsegment of a trapezoid is the average of the lengths of the bases, or \begin{align*}EF=\frac{AB+CD}{2}\end{align*}.
Example 4: Algebra Connection Find \begin{align*}x\end{align*}. All figures are trapezoids with the midsegment.
Solution:
a) \begin{align*}x\end{align*} is the average of 12 and 26. \begin{align*}\frac{12+26}{2}=\frac{38}{2}=19\end{align*}
b) 24 is the average of \begin{align*}x\end{align*} and 35.
\begin{align*}\frac{x+35}{2}&=24\\ x+35&=48\\ x&=13\end{align*}
c) 20 is the average of \begin{align*}5x15\end{align*} and \begin{align*}2x8\end{align*}.
\begin{align*}\frac{5x15+2x8}{2}&=20\\ 7x23& =40\\ 7x&=63\\ x&=9\end{align*}
Kites
The last quadrilateral we will study is a kite. Like you might think, it looks like a traditional kite that is flown in the air.
Kite: A quadrilateral with two sets of adjacent congruent sides.
A few examples:
From the definition, a kite is the only quadrilateral that we have discussed that could be concave, as with the case of the last kite. If a kite is concave, it is called a dart.
The angles between the congruent sides are called vertex angles. The otherangles are called nonvertex angles. If we draw the diagonal through the vertex angles, we would have two congruent triangles.
Given: \begin{align*}KITE\end{align*} with \begin{align*}\overline{KE} \cong \overline{TE}\end{align*} and \begin{align*}\overline{KI} \cong \overline{TI}\end{align*}
Prove: \begin{align*}\angle K \cong \angle T\end{align*}
Statement  Reason 

1. \begin{align*}\overline{KE} \cong \overline{TE}\end{align*} and \begin{align*}\overline{KI} \cong \overline{TI}\end{align*}  Given 
2. \begin{align*}\overline{EI} \cong \overline{EI}\end{align*}  Reflexive PoC 
3. \begin{align*}\triangle EKI \cong \triangle ETI\end{align*}  SSS 
4. \begin{align*}\angle K \cong \angle T\end{align*}  CPCTC 
Theorem 621: The nonvertex angles of a kite are congruent.
Theorem 622: The diagonal through the vertex angles is the angle bisector for both angles.
The proof of Theorem 622 is very similar to the proof above for Theorem 621. If we draw in the other diagonal in \begin{align*}KITE\end{align*} we find that the two diagonals are perpendicular.
Kite Diagonals Theorem: The diagonals of a kite are perpendicular.
To prove that the diagonals are perpendicular, look at \begin{align*}\triangle KET\end{align*} and \begin{align*}\triangle KIT\end{align*}. Both of these triangles are isosceles triangles, which means \begin{align*}\overline{EI}\end{align*} is the perpendicular bisector of \begin{align*}\overline{KT}\end{align*} (the Isosceles Triangle Theorem, Chapter 4). Use this information to help you prove the diagonals are perpendicular in the review questions.
Example 5: Find the other two angle measures in the kites below.
a)
b)
Solution:
a) The two angles left are the nonvertex angles, which are congruent.
\begin{align*}130^\circ + 60^\circ + x + x & = 360^\circ\\ 2x & = 170^\circ\\ x & = 85^\circ \qquad \quad \text{Both angles are}\ 85^\circ.\end{align*}
b) The other nonvertex angle is also \begin{align*}94^\circ\end{align*}. To find the fourth angle, subtract the other three angles from \begin{align*}360^\circ\end{align*}.
\begin{align*}90^\circ + 94^\circ + 94^\circ + x & = 360^\circ\\ x & = 82^\circ\end{align*}
Be careful with the definition of a kite. The congruent pairs are distinct. This means that a rhombus and square cannot be a kite.
Example 6: Use the Pythagorean Theorem to find the length of the sides of the kite.
Solution: Recall that the Pythagorean Theorem is \begin{align*}a^2+b^2=c^2\end{align*}, where \begin{align*}c\end{align*} is the hypotenuse. In this kite, the sides are all hypotenuses.
\begin{align*}6^2+5^2& =h^2 && \ 12^2+5^2=j^2\\ 36+25& =h^2 && 144+25=j^2\\ 61& =h^2 && \qquad 169=j^2\\ \sqrt{61} & =h && \qquad \ 13=j\end{align*}
Kites and Trapezoids in the Coordinate Plane
Example 7: Determine what type of quadrilateral \begin{align*}RSTV\end{align*} is. Simplify all radicals.
Solution: There are two directions you could take here. First, you could determine if the diagonals bisect each other. If they do, then it is a parallelogram and you could proceed like the previous section. Or, you could find the lengths of all the sides. Let’s do this option.
\begin{align*}RS & = \sqrt{(52)^2+(76)^2} && ST=\sqrt{(25)^2+(6(3))^2}\\ & = \sqrt{(7)^2+1^2} && \quad \ =\sqrt{(3)^2+9^2}\\ & = \sqrt{50}=5\sqrt{2} && \quad \ = \sqrt{90}=3\sqrt{10}\end{align*}
\begin{align*}RV& =\sqrt{(5(4))^2+(70)^2} && VT=\sqrt{(45)^2+(0(3))^2}\\ & = \sqrt{(1)^2+7^2} && \quad \ =\sqrt{(9)^2+3^2}\\ & = \sqrt{50}=5\sqrt{2} && \quad \ =\sqrt{90}=3\sqrt{10}\end{align*}
From this we see that the adjacent sides are congruent. Therefore, \begin{align*}RSTV\end{align*} is a kite.
Algebra Review: From now on, this text will ask you to “simplify the radical.” From Algebra, this means that you pull all square numbers (1, 4, 9, 16, 25, ...) out of the radical. Above \begin{align*}\sqrt{50}=\sqrt{25 \cdot 2}\end{align*}. We know \begin{align*}\sqrt{25}=5\end{align*}, so \begin{align*}\sqrt{50}=\sqrt{25 \cdot 2}=5\sqrt{2}\end{align*}.
Hint: If you are only given a set of points when determining what type of quadrilateral a figure is, always plot the points and graph. The visual will help you decide which direction to go.
Example 8: Determine what type of quadrilateral \begin{align*}ABCD\end{align*} is. \begin{align*}A(3, 3), \ B(1, 5), \ C(4, 1), \ D(1, 5)\end{align*}. Simplify all radicals.
Solution: First, graph \begin{align*}ABCD\end{align*}. This will make it easier to figure out what type of quadrilateral it is. From the graph, we can tell this is not a parallelogram. Find the slopes of \begin{align*}\overline{BC}\end{align*} and \begin{align*}\overline{AD}\end{align*} to see if they are parallel.
Slope of \begin{align*}\overline{BC}=\frac{5(1)}{14}=\frac{6}{3}=2\end{align*}
Slope of \begin{align*}\overline{AD}=\frac{3(5)}{31}=\frac{8}{4}=2\end{align*}
We now know \begin{align*}\overline{BC} \  \ \overline{AD}\end{align*}. This is a trapezoid. To determine if it is an isosceles trapezoid, find \begin{align*}AB\end{align*} and \begin{align*}CD\end{align*}.
\begin{align*}AB & =\sqrt{(31)^2+(35)^2} && ST = \sqrt{(41)^2+(1(5))^2}\\ & = \sqrt{(4)^2+(2)^2} && \quad \ \ = \sqrt{3^2+4^2}\\ & = \sqrt{20}=2\sqrt{5} && \quad \ \ = \sqrt{25}=5\end{align*}
\begin{align*}AB \neq CD\end{align*}, therefore this is only a trapezoid.
Example 9: Determine what type of quadrilateral \begin{align*}EFGH\end{align*} is.
\begin{align*}E(5, 1), \ F(11, 3), \ G(5, 5), \ H(1, 3)\end{align*}
Solution: To contrast with Example 8, we will not graph this example. Let’s find the length of all four sides.
\begin{align*}EF & = \sqrt{(511)^2+(1(3))^2} && FG = \sqrt{(115)^2+(3(5))^2}\\ & = \sqrt{(6)^2+2^2} && \quad \ = \sqrt{6^2+2^2}\\ & = \sqrt{40}=2\sqrt{10} && \quad \ =\sqrt{40}=2\sqrt{10}\end{align*}
\begin{align*}GH & = \sqrt{(5(1))^2+(5(3))^2} && HE = \sqrt{(15)^2+(3(1))^2}\\ & = \sqrt{6^2+(2)^2} && \quad \ = \sqrt{(6)^2+(2)^2}\\ & = \sqrt{40}=2\sqrt{10} && \quad \ =\sqrt{40}=2\sqrt{10}\end{align*}
All four sides are equal. That means, this quadrilateral is either a rhombus or a square. The difference between the two is that a square has four \begin{align*}90^\circ\end{align*} angles and congruent diagonals. Let’s find the length of the diagonals.
\begin{align*}EG & = \sqrt{(55)^2+(1(5))^2} && FH = \sqrt{(11(1))^2+(3(3))^2}\\ & = \sqrt{0^2+4^2} && \quad \ \ = \sqrt{12^2+0^2}\\ & = \sqrt{16}=4 && \quad \ \ = \sqrt{144}=12\end{align*}
The diagonals are not congruent, so \begin{align*}EFGH\end{align*} is a rhombus.
Know What? Revisited If the diagonals (pieces of wood) are 36 inches and 54 inches, \begin{align*}x\end{align*} is half of 36, or 18 inches. Then, \begin{align*}2x\end{align*} is 36. To determine how large a piece of canvas to get, find the length of each side of the kite using the Pythagorean Theorem.
\begin{align*}18^2+18^2& =s^2 && 18^2+36^2=t^2\\ 324& =s^2 && \qquad 1620=t^2\\ 18\sqrt{2} & \approx 25.5 \approx s && \quad \ \ 18\sqrt{5} \approx 40.25 \approx t\end{align*}
The perimeter of the kite would be \begin{align*}25.5 + 25.5 + 40.25 + 40.25 = 131.5\end{align*} inches or 11 ft, 10.5 in.
Review Questions

\begin{align*}TRAP\end{align*} an isosceles trapezoid. Find:
 \begin{align*}m \angle TPA\end{align*}
 \begin{align*}m \angle PTR\end{align*}
 \begin{align*}m \angle ZRA\end{align*}
 \begin{align*}m \angle PZA\end{align*}

\begin{align*}KITE\end{align*} is a kite. Find:
 \begin{align*}m \angle ETS\end{align*}
 \begin{align*}m \angle KIT\end{align*}
 \begin{align*}m \angle IST\end{align*}
 \begin{align*}m \angle SIT\end{align*}
 \begin{align*}m \angle ETI\end{align*}
 Writing Can the parallel sides of a trapezoid be congruent? Why or why not?
 Writing Besides a kite and a rhombus, can you find another quadrilateral with perpendicular diagonals? Explain and draw a picture.
 Writing Describe how you would draw or construct a kite.
For questions 611, find the length of the midsegment or missing side.
Algebra Connection For questions 1217, find the value of the missing variable(s). Simplify all radicals.
For questions 1821, determine what type of quadrilateral \begin{align*}ABCD\end{align*} is. \begin{align*}ABCD\end{align*} could be any quadrilateral that we have learned in this chapter. If it is none of these, write none.
 \begin{align*}A(1, 2), \ B(7, 5), \ C(4, 8), \ D(2, 5)\end{align*}
 \begin{align*}A(6, 6), \ B(10, 8), \ C(12, 4), \ D(8, 2)\end{align*}
 \begin{align*}A(1, 8), \ B(1, 4), \ C(5, 4), \ D(5, 6)\end{align*}
 \begin{align*}A(5, 1), \ B(9, 4), \ C(6, 10), \ D(3, 5)\end{align*}
 \begin{align*}A(2, 2), \ B(0, 1), \ C(2, 2), \ D(1, 5)\end{align*}
 \begin{align*}A(7, 4), \ B(4, 4), \ C(0, 0), \ D(0, 3)\end{align*}
 \begin{align*}A(3, 3), \ B(5, 1), \ C(7, 0), \ D(5, 4)\end{align*}
 \begin{align*}A(4, 4), \ B(1, 2), \ C(2, 4), \ D(1, 6)\end{align*}
 Write a twocolumn proof of Theorem 622. Given: \begin{align*}\overline{KE} \cong \overline{TE}\end{align*} and \begin{align*}\overline{KI} \cong \overline{TI}\end{align*} Prove: \begin{align*}\overline{EI}\end{align*} is the angle bisector of \begin{align*}\angle KET\end{align*} and \begin{align*}\angle KIT\end{align*}
 Write a twocolumn proof of the Kite Diagonal Theorem. Given: \begin{align*}\overline{EK} \cong \overline{ET}, \ \overline{KI} \cong \overline{IT}\end{align*} Prove: \begin{align*}\overline{KT} \perp \overline{EI}\end{align*} \begin{align*}^\star\end{align*} Use the hint given earlier in this section.
 Write a twocolumn proof of the Isosceles Trapezoid Diagonals Theorem using congruent triangles. Given: \begin{align*}TRAP\end{align*} is an isosceles trapezoid with \begin{align*}\overline{TR} \  \ \overline{AP}\end{align*}. Prove: \begin{align*}\overline{TA} \cong \overline{RP}\end{align*}
 Explain why the segments connecting the midpoints of the consecutive sides in a kite will always form a rectangle.
 Explain why the segments connecting the midpoints of the consecutive sides in an isosceles trapezoid will always form a rhombus.
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