Math Foundations Equations Quadratic Equations

Quadratic formula

A clear derivation of the quadratic formula with a detailed explanation of every step. Learn what the discriminant is, where it comes from, and how it tells you how many roots a quadratic equation has.

Key elements:

General root formulas

Discriminant

Quadratic equation roots

Biquadratic equation

Limits of formulas

Solving algorithm

Deriving the quadratic formula

Connections:

Completing the Square

The quadratic formula is derived by completing the square, so you really need to know how that works!

Adding and compensating

Statistics:

Term2

Statement1

Important2

Problem14

Article

Summary

Practice

Quadratic equations

😀

Elementary

Solve the quadratic equation using the quadratic formula:

j^2 - 4j - 60 = 0

Biquadratic equations

😀

Elementary

Solve the biquadratic equation:

j^4 - 20j^2 + 64 = 0

David and Goliath

😀

Elementary

360j^2 - 660j - 2100 = 0

Even coefficient

Method

🤔

Intermediate

Derive a general root formula for a quadratic equation assuming the coefficient B is an even number. Also derive a separate formula for the special case where B is even and A = 1.

Roots with letters

🤔

Intermediate

Derive expressions for the roots of the equations:

x^2 - 7ax + 12a^2 = 0

Sridhara's method

Elegant

🤔

Intermediate

The Indian mathematician Sridhara came up with a way to derive the quadratic formula back in the 8th century, in a method where fractions don't appear until the very last step. His first move is to multiply both sides by 4A. Finish the derivation.

Biquadratic roots formula

🤔

Intermediate

Derive the general root formula for a biquadratic equation:

Ax^4 + Bx^2 + C = 0

Substitution method

🤯

Advanced

Another way to derive the quadratic formula is to make a clever change of variables so that you get the simplest incomplete quadratic equation of the form

u^2 = s

, which is solved instantly. Use this substitution:

x = u - \frac{B}{2A}

Carry out the substitution and finish the derivation of the quadratic formula.

Sneaky discriminant

Elegant

🤯

Advanced

Solve the equation:

x^2 - (\sqrt{2} + 1)x + \sqrt{2} = 0

Trinomial equations

Method

🤯

Advanced

A trinomial equation is any equation that can be reduced to the form:

Af^2(x) + Bf(x) + C = 0

Figure out how to solve equations like this, and try it on:

2x^6 - 3x^3 + 1 = 0

Reciprocal equations

Method

Elegant

🤯

Advanced

Reciprocal equations, also called palindromic or symmetric equations, are equations where the coefficients mirror each other around the equation's “center”:

Figure out how to solve such equations and try it on the one above.