The equation represents a mathematical concept called the limit, which describes the behavior of a function as its input approaches a certain value. In this case, it means that the difference between the real part of z and the real part of z0 is less than some small positive number (E) whenever the distance between z and z0 is within a certain range (D).
The concept of a limit is fundamental in calculus and is used to study the behavior of functions, especially as they approach certain values or points. It also has applications in physics, engineering, and other fields.
The absolute value is used to ensure that the difference between the real parts of z and z0 is always positive, regardless of their order. This is important in the definition of a limit, as it allows us to consider both positive and negative values of the difference.
This condition specifies the range of values for the distance between z and z0. It means that the distance must be greater than 0 (to avoid division by 0) and less than some positive number (D).
This condition ensures that the limit is being evaluated at a point (z0) and not at the actual value (z). It also allows us to study the behavior of the function as it gets closer and closer to the point z0, without actually reaching it.