The binomial theorem is a useful formula for determining the algebraic expression that results from raising a binomial to an integral power. It provides one with a quick method for finding the coefficients and literal factors of the resulting expression.

The binomial theorem is stated as follows:

where n! is the factorial function of n, defined as

n! = n (n-1) (n-2) ..... 1

and 0! = 1 by convention.

EX.

The binomial theorem can also be used to find the rth term of the expansion of (a + b)ⁿ.

The first term of this expansion is aⁿ, and the (n+1)th term is bⁿ. By looking at the statement of the binomial theorem, we can see that the literal factors of the rth term are a^n-r+1 · b^r-1, where the sum of the exponents of a and b must be equal to n. Since all terms in the expansion of (a + b)ⁿ can be written as

we can set p = r - 1 so that the literal factors of the above term will be a^n-r+1 · b^r-1 . Thus, the rth term of the expansion of (a + b)ⁿ is

EX. The 7th term of ( x + y )¹³ is computed as