Example 2.  The form (a + b)(a − b).   The following has the form

(a + b)(a − b):

(x + y + 8)(x + y − 8)

x + y is the first term; 8 is the second.  Therefore, it will produce the difference of two squares:

Example 3.  Factoring by grouping.   x³ + 2x² − 25 x − 50.

The sum or difference of any powers

a⁵ + b⁵ = (a + b)(a⁴ − a³b + a²b² − ab³ + b⁴)

a⁵ − b⁵ = (a − b)(a⁴ + a³b + a²b² + ab³ + b⁴)

Look at the form of these.  A factor of  a⁵ + b⁵  is  (a + b),  while a factor of  a⁵ − b⁵  is  (a − b).

To produce a⁵, the second factor begins a⁴.  The exponent of a then decreases as the exponent of b increases -- but the sum of the exponents in each term is 4.  (We say that the degree of each term is 4.)

In the second factor of  a⁵ + b⁵, the signs alternate.  (If they did not, then on multiplying, nothing would cancel to produce only two terms.)

In the second factor of a⁵ − b⁵, all the signs are + .  (That insures the canceling.)

By multiplying out, the student can verify that these are the factors of the sum and difference of 5th powers.

The difference of even powers

So much for the sum and difference of odd powers.  As for the sum and difference of even powers, only their difference can be factored.  (If you doubt that, then try to factor a² + b² or a⁴ + b⁴.  Verify your attempt by multiplying out.)

If n is even, then we can always recognize the difference of two squares:

a⁴ − b⁴ = (a² + b²)(a² − b²).

But also when n is even,  aⁿ − bⁿ  can be factored either with (a − b) as a factor or (a + b).

a⁴ − b⁴ = (a − b)(a³ + a²b + ab² + b³)

a⁴ − b⁴ = (a + b)(a³ − a²b + ab² − b³)