Question: A person can choose any of five houses, each of which has four upstairs bedrooms. In one of the houses, three bedrooms are empty and one contains an antique chair worth $50, 000. In another house, two bedrooms are empty and one contains $1, 000, and one contains a newly minted nickel. In a third house, each bedroom contains $500. And in the last two houses, two bedrooms contain $1, 500 each, one contains $20, and one contains a person-eating lion which has not been fed recently. If the person is to pick a house and then a bedroom, what are the outcomes and their probabilities?