How many terms will you have if (x+5)^5 is expanded?
A binomial raised to a power n has n+1 terms.
To find the number of terms in the expansion of (x+5)^5, we can use the Binomial Theorem. According to the theorem, when a binomial expression (a + b)^n is expanded, the number of terms in the expansion is given by (n + 1).
In this case, the binomial expression is (x + 5)^5, where a = x and b = 5. Therefore, the number of terms in the expansion will be (5 + 1), which is equal to 6.
So, if (x + 5)^5 is expanded, it will have 6 terms.