Mustafa has a Magic 8 -Ball, which is a toy used for fortune-telling or seeking advice. To consult the ball, you ask the ball a question and shake it. One of 5 different possible answers then appears at random in the ball. Mustafa sensed that the ball answers ''Ask again later'' too frequently. He used the ball 4 times and in all of them he got "Ask again later." Let's test the hypothesis that each answer has an equal chance of 20% of appearing in the Magic 8 -Ball versus the alternative that ''Ask again later'' has a greater probability. Assuming the hypothesis is correct, what is the probability of getting "Ask again later" 4 times out of 4? Round your answer, if necessary, to the nearest tenth of a percent. Let's agree that if the observed outcome has a probability less than 1% under the tested hypothesis, we will reject the hypothesis. What should we conclude regarding the hypothesis?