Real numbers include all the numbers except complex numbers and have the following five subsets:

1. Natural numbers: Includes counting objects and start from 1. 
2. Whole numbers: Includes the set of natural numbers along with 0.
3. Integers: Z = Includes numbers that are not fraction (positive and negative whole numbers)
4. Rational numbers: Includes the numbers which can be written in the form of $\frac{p}{ q}$ where p and q are integers, $q\ne 0$.
5. Irrational numbers: Includes numbers that cannot be written in the form of $\frac{p}{ q}$ where p and q are integers, $q\ne 0$.

1. Natural numbers: $\left\{1,2,3,4,...\right\}$

2. Whole numbers: $\left\{0,1,2,3,4,...\right\}$

3. Integers: Measurement of debts, temperatures, etc., fall under the set of integers $\left\{...,-3,-2,-1,0,1,2,3,...\right\}$

4. Rational numbers: If we cut a cake into equal pieces, then we may have a piece that represents a fraction like $\frac{5}{6},1.5\left(=\frac{3}{2}\right),\frac{6}{9},\frac{8}{3}$

5. Irrational numbers: The numbers that are square roots of positive rational numbers, cube roots of rational numbers, etc., such as $\sqrt{2},\sqrt[3]{5},-\sqrt{3}$

Consider the given real number 

We can rewrite it using the square root property as:

Now we will check each subset of real numbers:

1. Natural numbers: They are positive and start from 1. So, $-\sqrt{64}$ being negative is not a natural number.
2. Whole numbers: They are natural numbers including 0. So, $-\sqrt{64}$ being negative is not a whole number.
3. Integers: They are numbers that are not fraction. Since $-\sqrt{64}=-8$, it is an integer.
4. Rational numbers: They can be written in the form $\frac{p}{ q}$ where p and q are integers, $q\ne 0$. Since $-\sqrt{64}=-\frac{8}{1}$, it is a rational number.
5. Irrational numbers: They cannot be written in the form $\frac{p}{ q}$ where p and q are integers, $q\ne 0$. Since from the above point, $-\sqrt{64}$ can be written in the form $\frac{p}{ q}$, it is not an irrational number.

Therefore, the real number $-\sqrt{64}$ belongs to the sets of integers and rational numbers.