if $\angle ecd = 45^{\circ}$ and $\angle bed = 110^{\circ}$ is $\triangle abe \sim \triangle cde$? if so, by what criterion?
a yes, by aa criterion
b yes, by sas criterion
c yes, by ssa criterion
d no, not possible to tell.

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# Brief Explanations:
1. First, find $ \angle ABE $ and $ \angle CED $:
   - Given $ \angle BED = 110^\circ $, so $ \angle CED=180^\circ - 110^\circ = 70^\circ $ (linear pair).
   - In $ \triangle CDE $, $ \angle ECD = 45^\circ $, $ \angle CED = 70^\circ $, so $ \angle D=180^\circ-(45^\circ + 70^\circ)=65^\circ $.
   - We know $ \angle ABE = 65^\circ $ (given) and $ \angle D = 65^\circ $, so $ \angle ABE=\angle D $.
   - Also, $ \angle BAE $ and $ \angle DCE $: Wait, actually, $ \angle AEB $ and $ \angle CED $? No, wait, $ \angle A=\angle ECD $? Wait, no, let's re - check. Wait, $ \angle ABE = 65^\circ $, $ \angle D = 65^\circ $ (so one pair of equal angles). Then, $ \angle AEB $: Wait, $ \angle BED = 110^\circ $, so $ \angle AEB = 180^\circ - 110^\circ=70^\circ $, and $ \angle CED = 70^\circ $ (from earlier). So $ \angle AEB=\angle CED $. So now we have two pairs of equal angles: $ \angle ABE=\angle D = 65^\circ $ and $ \angle AEB=\angle CED = 70^\circ $. By AA (Angle - Angle) similarity criterion, if two angles of one triangle are equal to two angles of another triangle, the triangles are similar. So $ \triangle ABE\sim\triangle CDE $ by AA criterion.
# Answer:
A. yes, by AA criterion

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