Basic arithmetic involves understanding the four fundamental operations: addition, subtraction, multiplication, and division. These operations form the foundation of all mathematics.
In this exercise, the focus is on division, which is used to split a quantity into equal parts. When we talk about division, we deal with a dividend (the number to be divided) and a divisor (the number by which we divide).
Understanding basic arithmetic is essential because it not only helps in solving simple problems but also lays the groundwork for tackling more complex algebraic equations.

Substitution is a method used in mathematics to replace variables with known values. This is particularly useful when dealing with algebraic expressions, as it allows us to evaluate these expressions with actual numbers.
In this context, the given expression is \( \frac{65}{a} \). Since we know that \(a\) equals 5, substitution allows us to replace \(a\) with 5, turning the expression into \( \frac{65}{5} \).
This step is crucial, as it simplifies the problem-solving process, making it possible to compute a specific numerical result.

Division is one of the core operations in basic arithmetic, instrumental for evaluating expressions like \( \frac{65}{a} \).
After substitution, we convert the original expression to \( \frac{65}{5} \). Now, division comes into play. To divide, we determine how many times the divisor (5 in this case) fits into the dividend (65).
To perform the division:

• First, identify how many times 5 divides into 65.
• This results in a quotient of 13, as 5 goes into 65 exactly 13 times without any remainder.

Dividing numbers accurately is key to solving many mathematical problems, allowing us to calculate precise results.

Evaluating expressions involves determining the value of an algebraic expression by performing operations and applying given values to variables.
In this exercise, evaluating the expression \( \frac{65}{a} \) means calculating its value for a specific value of \(a\).
Through substitution and basic arithmetic operations, we simplify the expression to \( \frac{65}{5} \) and then further to 13.
To evaluate expressions effectively:

• Ensure that you substitute variables with their assigned values accurately.
• Perform arithmetic operations methodically to avoid errors.

This approach ensures that mathematical expressions are evaluated accurately, contributing to a better understanding of problem-solving techniques in algebra.