Fun with Quadratics: September 2013

Monday, September 2, 2013

Solve Quadratic Equations using Quadratic Formula

Working out a Quadratic Formula

Here are some examples of how the Quadratic Formula works:

Solve x² + 3x – 4 = 0

This quadratic happens to factor:

x² + 3x – 4 = (x + 4)(x – 1) = 0

...so I already know that the solutions are x = –4 and x = 1. How would my solution look in the Quadratic Formula? Using a = 1, b = 3, and c = –4, my solution looks like this:

Then, as expected, the solution is x = –4, x = 1.

Suppose you have ax² + bx + c = y, and you are told to plug zero in for y. The corresponding x-values are the x-intercepts of the graph. So solving ax² + bx + c = 0 for x means, among other things, that you are trying to find x-intercepts. Since there were two solutions for x² + 3x – 4 = 0, there must then be two x-intercepts on the graph. Graphing, we get the curve below:

As you can see, the x-intercepts (the red dots above) match the solutions, crossing the x-axis at x = –4 and x = 1. This shows the connection between graphing and solving: When you are solving "(quadratic) = 0", you are finding the x-intercepts of the graph. This can be useful if you have a graphing calculator, because you can use the Quadratic Formula (when necessary) to solve a quadratic, and then use your graphing calculator to make sure that the displayed x-intercepts have the same decimal values as do the solutions provided by the Quadratic Formula.
Note, however, that the calculator's display of the graph will probably have some pixel-related round-off error, so you'd be checking to see that the computed and graphed values were reasonably close; don't expect an exact match.

Solve 2x² – 4x – 3 = 0. Round your answer to two decimal places, if necessary.

There are no factors of (2)(–3) = –6 that add up to –4, so I know that this quadratic cannot befactored. I will apply the Quadratic Formula. In this case, a = 2, b = –4, and c = –3:

Then the answer is x = –0.58, x = 2.58, rounded to two decimal places.

Warning: The "solution" or "roots" or "zeroes" of a quadratic are usually required to be in the "exact" form of the answer. In the example above, the exact form is the one with the square roots of ten in it. You'll need to get a calculator approximation in order to graph the x-intercepts or to simplify the final answer in a word problem. But unless you have a good reason to think that the answer is supposed to be a rounded answer, always go with the exact form.

Compare the solutions of 2x² – 4x – 3 = 0 with the x-intercepts of the graph:

Just as in the previous example, the x-intercepts match the zeroes from the Quadratic Formula. This is always true. The "solutions" of an equation are also the x-intercepts of the corresponding graph.

Solving a Quadratic Equation

Quadratic equations can be solved by using three types as,

1. Factoring (or "factorising" in British English),

2. Completing the square, using the quadratic formula,

3. Graphing.

What is a quadratic equation

In mathematics, a quadratic equation is a univariable polynomial equation of the second degree. A general quadratic equation can be written in the form

$ax^2+bx+c=0,$

where x represents a variable or an unknown, and a, b, and c are constants with a not equal to 0. (If a = 0, the equation is a linear equation.)

The constants a, b, and c are called, respectively, the quadratic coefficient, the linear coefficient and the constant or free term. Quadratic equations can be solved by factoring (or "factorising" in British English), completing the square, using the quadratic formula, and graphing.

Solutions to problems equivalent to the equation were known to Babylonians as early as 2000 BC, as well as to early Indian, Chinese and Greek mathematicians. The first explicit solution appeared in India in 628 AD, and was developed into a general solution in Persia and India in the 9th and 10th centuries. It first appeared in its modern form in La Géométrie by René Descartes.