CPM Homework Help : CCG Problem 5-133

Parallel sides are, A D, & B C, Point labeled E between points, A & D, creating triangles, B E C, B A E, & E C D, with labels as follows: Angle A, 40 degrees, angle D, 60 degrees, Sides, A B, & C E, each have 2 arrows, Sides, B E, & C D, each have 1 arrow, Sides, A E, & B C, each have 3 arrows. Examine trapezoid $ABCD$ below.

Find the measures of all the angles in the diagram.
Step 1(a):
The corresponding angles are equal.
Answer 1(a):
Since line $\overline{AB}$ $\Vert$ line $\overline{EC}$ , then corresponding angles $∠BAE=∠CED$ .
So $∠CED=40º$ , mark it on your diagram.
While line $\overline{CD}$ $\Vert$ line $\overline{EB}$ , then corresponding angles $∠CDE=∠BEA$ .
So $∠BEA=60º$ , mark it on your diagram.
Step 2(a):
Use the Triangle Angle Sum Theorem.
Answer 2(a):
Now you know two angles in $ΔABE$ and $ΔCED$ , knowing that one angle is $40º$ and $60º$ .
Calculate the third angle using the equation $40º+60º+\text{missing angle}=180º$ .
So the missing angle is $80º$ . Mark it in your diagram.
Step 3(a):
The angles at E form a straight angle, which is $180º$ .
Answer 3(a):
Since $∠BEA=60º$ and $∠CED=40º$ then $40º+60º+∠CEB=180º$ .
Solve for $∠CEB$ , mark it on your diagram. $∠CEB=80^{\circ}$ .
Step 4(a):
The alternate interior angles are equal.
Answer 4(a):
Since $∠BEA=60º$ and $∠CED=40º$ , then $∠EBC=60º$ and $∠ECB=40º$ because alternate angles are equal. Mark the angles on your diagram.
What is the sum of the angles that make up the trapezoid $ABCD$ ? That is, what is $m∠A+m∠ABC+m∠BCD+m∠D$ ?
Answer (b):
$40º+\left(80º+60º\right)+\left(40º+80º\right)+60º=360º$
Note: Do not add in the angles at $E$ .