Here are $6$ different rabbits waiting to go to a home. They are in
a pen in a pet shop. You'll see $2$ brown, $2$ black and $2$ grey.
There is a floppy-eared one and an ordinary one of each
colour.
Let's imagine that rabbits can only be one of these $6$ different
kinds and there are no other kinds of rabbits. Then:
How many, and of what kind, will there be in a pen if all these
statements are true?
There are more brown than any other
colour
There are equal numbers of floppy
browns and ordinary browns
There are three which have floppy
ears
There are twice as many floppy browns
as floppy whites
There are three times as many blacks
as whites
How many, and of what kind, will there
be in the second shop if all these statements are true?
There are the same number of blacks
as browns
There are twice as many floppy browns
as ordinary browns
There are the same number of floppy
browns as floppy greys