Worksheet: General Term in the Binomial Theorem

Find the value of that satisfies

Consider the expansion of in ascending powers of . Given that the coefficient of is equal to the coefficient of , determine the value of .

Find in the expansion of .

Find in the expansion of .

Find the third term in the expansion of .

Find in the expansion of .

Find in the expansion of .

If the coefficient of the third term in the expansion of is , determine the middle term in the expansion.

If the ratio between the fourth term in the expansion of and the third term in the expansion of equals , find the value of .

Consider the binomial expansion of in ascending powers of . Given that when , find the value of .

In the binomial expansion of , is a positive, whole number and is the th term, or the term which contains .

If , what is the value of ?

Find the coefficient of in the expansion of .

Find the coefficient of in the expansion of .

Find the third term in the expansion of .

Consider the binomial expansion of in ascending powers of . What is the seventh term?

In a binomial expansion, where the general term is , determine the position of the term containing .

Find in the expansion of .

Let be the term in the expansion of in increasing powers of . Find all nonzero values of for which .

Given that the sum of the first, middle, and last terms in the expansion of is 42 337, find all possible real values of .

Find in the expansion of .

Find in the expansion of .

Find the second-to-last term in .

Let be the th term in the expansion of in descending powers of . Find all the nonzero values of for which .

Find the general term in .