Quadratic Equations and Their Solutions

Identifying the coefficients

Checking for extraneous solutions

Writing the equation in standard form

Factoring the equation

Y squared

Y to the one-sixth

Y to the one-third

Y to the first

-5 and 2

2 and -5

5 and -2

-2 and 5

Y to the sixth

Y to the first

Y cubed

Y squared

1,000

64

15,625

5

Multiply the solutions

Graph the solutions

Check the solutions in the original equation

Simplify the solutions

To ensure the solutions are positive

To find the exact value

To verify the equation is quadratic

To identify extraneous solutions

Graph the solution

Include it as a possible solution

Recalculate the solution

Exclude it as an extraneous solution

Because it does not satisfy the original equation

Because it results in a complex number

Because the sixth root of a number cannot be negative

Because -2 is not a real number

Even roots are always positive

Odd roots can be negative

Negative numbers have no real roots

Positive numbers have even roots