In the expansion of the expression xy10, we can look for the different terms that arise from its expansion using the binomial theorem. However, this particular expression isn’t a binomial in the traditional sense of having two addends. It consists of two variables: x and y.
For the sake of expansion, if we consider xy10 as a single term being multiplied, there are no additional terms created from this as it stands alone. It represents a single term in which y is raised to the tenth power while x is simply the first power.
If we were to consider terms that could appear in a more complex expansion where xy10 might be part of a larger expression (for example, something like (x + y)10), we would find many combinations of these variables raised to various powers. But in this straightforward expression, we only see the products of their powers.
Thus, the only term we can identify directly from xy10 is the term itself: ax1y10, where a is any real constant that can multiply the expression.