The key to solving this math problem is how to judge who lied, so the elimination method is the simplest way for us to do things (although it is very troublesome, there is no way ⊙ ⊙ B sweat).
Ideas:
Step 1: If the tiger lies and the fox and the rabbit are right, then the fox is second. This is because the tiger lied, so he is definitely not the first, and the rabbit is not the first, because he is right. Then there is an obvious contradiction that no one will be the first, so the idea is wrong.
Step 2: If the fox lies. Then the tiger and the rabbit are right. At this time, the tiger is the first, but the rabbit is not the first, so it is either the second or the third (in fact, the rabbit's words will not play any role in this step), and because the fox lied, he is not the second. At this time, because the tiger is already the first, the fox is the third, and then the rabbit is the second. So the positive solution to this problem is: the fox lies, the tiger comes first, the rabbit comes second, and the fox comes third.
Step three, uh, there is no step three. ...
Hope to adopt