Final answer:
Due to a typo or missing context, the initial equation from the student cannot be solved directly. However, using the binomial theorem, the terms 6^3 and 6^4 can be computed, resulting in 216 and 1296, respectively.
Step-by-step explanation:
The equation in question appears to have a typo or missing context; however, the later part of the student's query can be addressed in terms of the series expansions and binomial theorem, which is a method to expand expressions that raise a binomial to a power. The binomial theorem states that:
(a + b)^n = a^n + n*a^(n-1)*b + n*(n-1)/2! * a^(n-2)*b^2 + ... + b^n
This theorem allows us to find any term in the expansion of a binomial expression. The terms mentioned, such as 6^3 and 6^4, can be computed using exponentiation. For 6^3 (which is 6*6*6), the result is 216, and for 6^4 (6*6*6*6), the result is 1296.