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A quadratic equation in one variable has as standard form: ax^2 + bx + c = 0.

There are five existing methods to solve quadratic equations: formula, factoring, completing square, graphing and the recent Diagonal Sum Method. (Amazon e-books 2010). So, students are sometimes confused about choosing the best method to proceed.

The first obvious choice is using the quadratic formula since it only requires a simple calculation to get the answer, especially when we can use calculators. But, the goal of learning math is to improve logical thinking and deductive reasoning. That is why, the math teaching process wants students to learn a few other methods, such as the factoring one, to master the solving process.

From my experiences, although 99% (?) of the quadratic equations in real life can not be factored, most of the ones given to students as exercises/problems in books or tests/exams are FACTORABLE!!!

So, before proceed solving you'd better find out if the given equation can be factored? How? In general, it is hard to know at first view if a quadratic equation is factorable. You may calculate the Discriminant D = b^2 - 4ac to see if it is a perfect square. Or, I advise you to use the Diagonal Sum Method to solve it in the first step. It is the fastest and best way to know if the equation can be factored. It usually takes fewer than 3 trials. If it fails to get answer, then the quadratic formula must be used. Here is how this new method works:

Concept of the Diagonal Sum Method.

Direct finding two real roots, in the form of two fractions, knowing their sum (-b/a) and their product (c/a).

The Rule of Sign for Real Roots:

If a and c have opposite signs, the 2 real roots have opposite signs

If a and c have same sign, both roots have same sign:

a. If a and b have opposite signs, both roots are positive.

b. If a and b have same sign, both roots are negative.

Development of the Diagonal Sum Method.

Directly select the probable root-sets, in the form of 2 fractions, that are factor-sets of c and a. The numerators are factor-sets of c. The denominators are factor-sets of a.

Product of roots-set: ( c1/a1) . (c2/a2) = c/a.

Sum of roots-set: (c1/a1) + (c2/a2) = (c1a2 + c2a1)/a1a2 = - b/a.

The sum (c1a2 + c2a1) is called the diagonal sum of the roots-set. Always use mental math to compute the diagonal sum.

Rule for the Diagonal Sum.

The diagonal sum of a TRUE roots-set must be equal to (-b). If it is equal to (b), then the answer is the opposite. If a is negative, the above rule is reversal in sign.

Advantages of the Diagonal Sum Method:

1. The Rule of Sign reduces the number of permutations in HALF as compared with the factoring method. It shows in advance the signs of the 2 roots before proceeding (opposite signs, both are positive, or both are negative).

2. It directly gives the 2 real roots WITHOUT factoring.

3. It sets up simple proceeding steps so that average students can easily perform.

4. It runs perfectly in case a is negative. Just reverse the rule of signs for real roots.

5. Smart students can quickly perform by using mental math. From my experiences, smart students can usually solve quadratic equations in less than 20 seconds!!!

6. In special case when a =1, the solving process becomes very simple. No needs of factoring!!!

7. In complicated cases when a and c are big numbers and contain themselves many factors this new method proceeds with an all-options-line so that no probable roots-sets are omitted. The elimination process then reduces a multi-solving steps-problem to a simplified one.

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Can quadratic systems be solved using elimination and substitution?

You can solve lineaar quadratic systems by either the elimination or the substitution methods. You can also solve them using the comparison method. Which method works best depends on which method the person solving them is comfortable with.


Why is substitution the best method in solving systems of equations?

It is not always the best method, sometimes elimination is the way you should solve systems. It is best to use substitution when you havea variable isolated on one side


How are quadratic equations used in real life?

Many real life physics problems are parabolic in nature. Parabolas can be shown as a quadratic equation. If you have two variables then usually you can use the equation to find the best solution to a problem. Also, it is a beginning in the world of mathematical optimization. Some equations use more than two variables and require the technique used to solve quadratics to solve them. I just ran an optimization of 128 variables. To understand the parameters I needed to set I had to understand quadratics.


What is the special cases of quadratic equation?

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Why is factoring a valuable tool for solving quadratic equations?

In some simple cases, factoring allows you to find solutions to a quadratic equations easily.Factoring works best when the solutions are integers or simple rational numbers. Factoring is useless if the solutions are irrational or complex numbers. With rational numbers which are relatively complicated (large numerators and denominators) factoring may not offer much of an advantage.

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How many ways are there to solve a quadratic equation?

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How are quadratic equations used in real life?

Many real life physics problems are parabolic in nature. Parabolas can be shown as a quadratic equation. If you have two variables then usually you can use the equation to find the best solution to a problem. Also, it is a beginning in the world of mathematical optimization. Some equations use more than two variables and require the technique used to solve quadratics to solve them. I just ran an optimization of 128 variables. To understand the parameters I needed to set I had to understand quadratics.


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Why is factoring a valuable tool for solving quadratic equations?

In some simple cases, factoring allows you to find solutions to a quadratic equations easily.Factoring works best when the solutions are integers or simple rational numbers. Factoring is useless if the solutions are irrational or complex numbers. With rational numbers which are relatively complicated (large numerators and denominators) factoring may not offer much of an advantage.


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