Show that there cannot exist three prime numbers, each greater than 3, which are in A.P. with a common difference less than 5.
Let k > 3 be an integer. Show that it is not possible for k prime numbers, each greater than k, to be in A.P. with a common difference less than or equal to (k + 1).
Let k > 3 be an integer. Show that it is not possible for k prime numbers, each greater than k, to be in A.P. with a common difference less than or equal to (k + 1).
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