Understanding Rational Expressions and Quadratic Equations

Finding common factors

Adding the numerators

Multiplying the denominators

Subtracting the denominators

To increase the complexity of the equation

To simplify the equation and avoid division by zero

To make the equation longer

To change the equation's variables

Adding a constant to both sides

Multiplying both sides by a common factor

Dividing both sides by a variable

Subtracting a constant from both sides

To simplify solving the equation

To eliminate variables

To change the solution

To make it more complex

Guessing the solution

Using a calculator

Factoring the quadratic expression

Graphing the equation

x = 3 and x = 12

x = 4 and x = 9

x = 5 and x = 8

x = 6 and x = 7

It is not a whole number

It does not satisfy the quadratic equation

It is not a real number

It results in division by zero in the original equation

x = 7

x = 5

x = 4

x = 9

The equation becomes a linear equation

The equation has no solution

The equation becomes undefined

The equation is satisfied

To verify the accuracy of the solution

To find new solutions

To change the equation

To simplify the equation further