The expression (x^14)(x^3)4. What is the value of n?
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.
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.
To find the value of n in the expression (x^14)(x^3)^n, we need to simplify the expression first.
In the expression (x^14)(x^3)^n, we have x raised to the power of 14 and x raised to the power of 3.
When we multiply two numbers with the same base, we add their exponents. So, (x^14)(x^3) can be written as x^(14+3), which simplifies to x^17.
Now, we have the expression x^17^n.
To find the value of n, we would need additional information or an equation involving the expression. Without more information or context, it is not possible to determine the value of n.