Math Problem of the Day

Suppose that the difference between a² + b and b² + a is a prime, where a and b are positive integers.

Let the difference between the two quantities be a prime p. Then:

p = a² + b - (b² + a)
p = a² - b² - (a - b)
p = (a - b)(a + b) - (a - b)
p = (a - b)(a + b - 1)

Since the only factors of p are 1 and p, we must have:

a - b = 1
a + b - 1 = p

Adding, we get:

2a - 1 = p + 1

2a = p + 2

Since the right hand side must be even, p must be even. But the only even prime is p = 2, and hence a = 2, b = 1.

Difference is Prime