Final answer:
The equation 1/7n - 4n = 1/3n is not an identity because it is not true for all values of n.
Step-by-step explanation:
To determine whether the equation 1/7n - 4n = 1/3n is an identity, we need to check if it is true for all values of n where n ≠ 0. Let's simplify the equation:
1/7n - 4n = 1/3n
To simplify the left side, we need to find a common denominator for 1/7n. The common denominator is 7n, so the equation becomes:
(1/7n)(7n/7n) - 4n = 1/3n
Simplifying further:
1 - 4n(7n) = 1/3n
1 - 28n^2 = 1/3n
Now let's multiply both sides of the equation by 3n to eliminate the fraction:
3n - 84n^3 = 1
Now we can see that the equation is not true for all values of n because it involves a cubic term (n^3). Therefore, the answer is A) No; it is not true for all values of n.