Understanding Equations and Functions

The function must be continuous.

The function itself must be zero.

The derivative of the function must be zero.

The second derivative must be zero.

Because it simplifies the equation.

Because it does not affect the numerator.

Because it is always zero.

Because it cannot be zero.

Let u equal x squared.

Let u equal x.

Let u equal x cubed.

Let u equal x to the fourth.

It introduces more fractions.

It changes the solution.

It does not eliminate square roots.

It makes the equation more complex.

Divide both sides by the square root.

Multiply both sides by the square root.

Take the square root of both sides.

Square both sides of the equation.

It doubles.

It disappears.

It becomes a fraction.

It remains unchanged.

A quadratic equation.

A linear equation.

A polynomial equation.

A cubic equation.

The cube root of 27.

The fourth root of 27.

27 to the power of four.

The square root of 27.

Because x is a length and cannot be negative.

Because it is not a real number.

Because negative solutions are not allowed.

Because it does not satisfy the original equation.

Ignore square roots.

Avoid using derivatives.

Always use a calculator.

Be careful with algebraic manipulations.