To demonstrate that the expression is negative

To show that the expression is equal to zero

To find the exact value of the expression

To prove that the expression is positive

Because it is too complex

Because it can lead to circular reasoning

Because it is mathematically incorrect

Because it makes the proof too long

Using logarithms

Using squares

Using trigonometry

Using calculus

To make the expression more complex

To simplify the expression for easier calculation

To identify common factors

To eliminate variables

Both factors are zero

One factor is zero and the other is positive

One factor is positive and the other is negative

Both factors are negative or both are positive

To ensure the proof is concise

To avoid logical errors

To make the proof more complex

To reduce the number of steps

The final conclusion

The expression itself

A random assumption

The conditions given in the problem