Quadratic Equations- Definition, Formula And How To Solve Them

Quadratics can be defined as a polynomial equation of a second degree, which implies that it comprises a minimum of one term that is squared. It is also called quadratic equations. The general form of the quadratic equation is: ax² + bx + c = 0, where x is an unknown variable and a, b, c are numerical coefficients. Here, a ≠ 0 because if it equals zero then the equation will not remain quadratic anymore and it will become a linear equation, such as: bx+c=0. Thus, this equation cannot be called a quadratic equation. The terms a, b and c are also called quadratic coefficients.The solutions to the quadratic equation are the values of the unknown variable x, which satisfy the equation.

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These solutions are called roots or zeros of quadratic equations. The roots are the solutions for the given equation. In addition, you can also download our free E-book for learning more about quadratic equations- download now for free.

 

What is Quadratic Equation?

The polynomial equation whose highest degree is two is called a quadratic equation or sometimes just quadratics. It is expressed in the form of:

ax² + bx + c = 0

where x is the unknown variable and a, b and c are the constant terms.

Since the quadratic include only one unknown term or variable, thus it is called univariate. The power of variable x are always non-negative integers, hence the equation is a polynomial equation with highest power as 2.

The solution for this equation is the values of x, which are also called zeros. Zeros of the polynomial are the solution for which the equation is satisfied. In the case of quadratics, there are two roots or zeros of the equation. And if we put the values of roots or x in the Left-hand side of the equation, it will equal to zero. Therefore, they are called zeros.

 

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Quadratics Formula

The formula for a quadratic equation is used to find the roots of the equation. Since quadratics have a degree equal to two, therefore there will be two solutions for the equation. Suppose, ax² + bx + c = 0 is the quadratic equation, then the formula to find the roots of this equation will be:

x = [-b±√(b2-4ac)]/2

The sign of plus/minus indicates there will be two solutions for x. 

 

Examples of Quadratics

Beneath are the illustrations of quadratic equations of the form (ax² + bx + c = 0)

• x² –x – 9 = 0

• 5x² – 2x – 6 = 0

• 3x² + 4x + 8 = 0

• -x² +6x + 12 = 0

Examples of a quadratic equation with the absence of a ‘ C ‘- a constant term.

• -x² – 9x = 0

• x² + 2x = 0

• -6x² – 3x = 0

• -5x² + x = 0

• -12x² + 13x = 0

• 11x² – 27x = 0

Following are the examples of a quadratic equation in factored form

• (x – 6)(x + 1) = 0  [ result obtained after solving is x² – 5x – 6 = 0]

• –3(x – 4)(2x + 3) = 0  [result obtained after solving is -6x² + 15x + 36 = 0]

• (x − 5)(x + 3) = 0  [result obtained after solving is x² − 2x − 15 = 0]

• (x – 5)(x + 2) = 0  [ result obtained after solving is x² – 3x – 10 = 0]

• (x – 4)(x + 2) = 0  [result obtained after solving is x² – 2x – 8 = 0]

• (2x+3)(3x – 2) = 0  [result obtained after solving is 6x² + 5x – 6]

Below are the examples of a quadratic equation with an absence of linear co – efficient ‘ bx’

• 2x² – 64 = 0

• x² – 16 = 0

• 9x² + 49 = 0

• -2x² – 4 = 0

• 4x² + 81 = 0

• -x² – 9 = 0

How to Solve Quadratic Equations?

There are basically four methods of solving quadratic equations. They are:

1. Factoring
2. Completing the square
3. Using Quadratic Formula
4. Taking the square root

Factoring of Quadratics

• Begin with a equation of the form ax² + bx + c = 0
• Ensure that it is set to adequate zero.
• Factor the left-hand side of the equation by assuming zero on the right-hand side of the equation.
• Assign each factor equal to zero.
• Now solve the equation in order to determine the values of x.

Suppose if the main coefficient is not equal to one then deliberately, you have to follow a methodology in the arrangement of the factors.

 

Example:

2x²-x-6=0

(2x+3)(x-2)=0

2x+3=0

x=-3/2

x=2

 

Completing the Square Method

Let us learn this method with example.

Example: Solve 2x2 – x – 1 = 0.

First, move the constant term to the other side of the equation.

2x2 – x = 1

Dividing both sides by 2.

x2 – x/2 = ½

Add the square of half of the coefficient of x, (b/2a)2, on both the sides, i.e., 1/16

x2 – x/2 + 1/16 = ½ + 1/16

Now we can factor the right side,

(x-¼)2 = 9/16 = (¾)2

Taking root on both sides;

X – ¼ = ±3/4

Add ¼ on both sides

X = ¼ ± ¾

Therefore,

X = ¼ + ¾ = 4/4 = 1

X = ¼ – ¾ = -2/4 = -½ 

 

Solved Problems on Quadratics

Example 1: Solve x2 – 6 x = 16.

Solution: x2 – 6 x = 16.

 x2 – 6 x – 16 = 0

By factorisation method, 

( x – 8)( x + 2) = 0

Therefore,

x = 8 and x = -2

 

Example 2: Solve x2 – 16 = 0. And check if the solution is correct.

Solution: x2 – 16 = 0.

x2 – 42 = 0  [By algebraic identities]

(x-4) (x+4) = 0

x = 4 and x = -4

Check:

Putting the values of x in the LHS of the given quadratic equation

If x = 4

X2 – 16 = (4)2 – 16 = 16 – 16 = 0

If x = -4,

X2 – 16 = (-4)2 – 16 = 16 – 16 = 0

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