Final Answer:
The decimal forms of i and ź as repeating or terminating is:
C) Both i and ź are repeating**
Step-by-step explanation:
The correct classification for the decimal forms of i and ź is that both are repeating. In mathematics, the term "repeating" refers to a decimal that has a recurring pattern, and "terminating" refers to a decimal that ends or terminates after a finite number of digits.
Firstly, let's consider i, which represents the imaginary unit equal to the square root of -1. When i is expressed as a decimal, it becomes 0. i is a non-terminating decimal that repeats in the pattern "0.00..." indefinitely. This repetition indicates that i is a repeating decimal.
Now, moving on to ź, it is essential to understand that ź is not a standard mathematical notation. It seems there might be a typographical error or misunderstanding in the provided options. If we assume that ź should be replaced with a valid mathematical symbol or constant, we can consider Z, which represents the set of integers. In this case, Z as a decimal would be non-terminating and repeating, as it includes all integers without end.
Therefore, the correct answer is C) Both i and ź are repeating, as i is a repeating decimal, and Z (assuming a typographical error) would also be repeating in its decimal representation.Answer: