# 8x 8 3ax 5ax 2a

This is a mathematical equation that can be used to solve for unknown variables. It is a quadratic equation, which means that it has two solutions. It is often used to solve problems in algebra and calculus. In this equation, 8x is the coefficient of the squared variable, 3ax is the coefficient of the linear variable, and 5ax is the constant term. The 2a is the coefficient of the squared variable.

To solve this equation, you will need to first identify the two solutions. To do this, you will need to use the quadratic formula. This formula will give you the two solutions of the equation. Using the quadratic formula, you can find the values of x that make the equation equal to zero. The quadratic formula is as follows:

x = -b +-√b^2 – 4ac/2a

## How To Use The Quadratic Formula

To use the quadratic formula, you will need to plug in the appropriate values for a, b, and c. In this case, a is 2, b is 3, and c is 5. Plugging these numbers into the equation, you will get the following: x= -3 ± √9 – 20/4. This equation simplifies to x = -3 ± √-11/4. Simplifying further, you will get the two solutions of x = 5 and x = -2.

## Interpreting The Solutions

The two solutions of x = 5 and x = -2 tell you that when you plug in either of these values into the equation, the equation will equal zero. This means that if you plug in either of these values into the equation, the equation will be true. The equation 8x 8 3ax 5ax 2a is equal to 0 when x is equal to 5 or -2. This means that the equation has been solved.