Understanding how to calculate square roots is essential when dealing with various types of mathematical problems. A square root of a number is a value that, when multiplied by itself, gives the original number. To put it simply, if you have a number like 36, you want to find a number which, when you multiply it by itself (or square it), you get back 36. The mathematical symbol for square root is \( \sqrt{} \) and the square root of 36 is written as \( \sqrt{36} \).

In the context of the given exercise, we calculate the square root of 36. Since \(6 \times 6 = 36\), six is the square root of 36, or \( \sqrt{36} = 6 \). Remember that square root functions typically return the non-negative root, known as the principal square root. However, every positive number actually has two square roots: the principal square root and its negative counterpart. In this case, the negative square root would be \( -6 \), which directly ties into our exercise.

In the world of mathematics, real numbers consist of all the numbers on the endless number line. This includes all rational and irrational numbers; integers, fractions, and numbers with endless non-repeating decimals. The real numbers are divided into positive numbers, negative numbers, and zero. This range allows for a comprehensive spectrum of values, but when we're working with square roots, there's an important distinction to be made.

For example, square roots of positive numbers are always real numbers. However, the square root of a negative number is not a real number—it's what's known as an imaginary number. This is a crucial point in our textbook exercise, which may lead some to incorrectly believe that our solution, \( -\sqrt{36} \) is not real. However, the negative sign here does not affect the 'square-rooted' value (which is positive) but rather the entire square root expression, thereby giving us the negative of a real number—which is still a real number.

When we evaluate mathematical expressions, we simplify them into their most basic form. This process involves performing all the operations like addition, subtraction, multiplication, division, and finding roots, following the order of operations. The exercise \( -\sqrt{36} \) is a simple example of this.

To properly evaluate this expression, first, calculate the square root of 36, which is 6. Then, apply the negative sign to the square root calculated. In mathematical terms, you are essentially multiplying the square root, which is 6, by -1, which yields \( -6 \). Remember that the order in which you perform these operations matters. The negative sign applies to the square root value, not to the 36 before finding its square root. It's this meticulous attention to order and process that ensures expressions are evaluated correctly and common misconceptions are avoided.