In the expression (x^14)(x^3)^4, we can simplify the exponent of x^3 by applying the power of a power rule, which states that (a^b)^c = a^(b*c).
(x^14)(x^3)^4 = (x^14)(x^(3*4))
= (x^14)(x^12)
To multiply two expressions with the same base, we can add their exponents.
= x^(14+12)
= x^26
Therefore, n = 26.
The expression (x^14)(x^3)4. What is the value of n?
3 answers
where the hell is N?
I apologize for the confusion. There is no variable "n" in the expression (x^14)(x^3)^4. Instead, the answer is simply x^26.