One day Tony woke up and didn't find his wife in the house.
— Where were you?
— I wanted to work out and just walked around the block. Look at my pedometer.
— What distance does the pedometer show?
— Really Tony? again with your jealousy?
Angry, Tony snatches the pedometer from her and he read a distance traveled of $805$ meters.
— How many laps did you do?
— One lap!
— East or North?
— Are you serious, Tony?
— East or North?
— East!
Tony had been the engineer in charge of paving the block years ago, and he knew that the four streets that made up the block were the same distance from the church where he married his wife. In addition, he remembered that the corners formed the following sequence of angles until he got back to his house: $60°$, $135°$, $85°$, $80°$ and that if his wife went east she must have traveled $200$ meters on the first street before to reach the $60°$- corner, a distance that he also remembered perfectly.
Was the wife lying? Justify your answer.