Quadratic Equations1

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=Quadratic Equations=

A quadratic equation is an equation of the form ax2+bx+c=0.

For example, 2x2-7x-15=0.

So, what does it mean to solve a quadratic equation?

Solving a quadratic equation means finding those values of the variable that make the equation true.

For example, solving 6x2+10x+3=7 means finding the values of x that make this equation true.

If x=-2, 6(-2)2+10(-2)+3=7

If x=1/3,6(1/3)2+10(1/3)+3=7

Only these two values of x: -2 and 1/3 make this equation true, so these are the solutions to the equation 6x2+10x+3=7.

How do I find these values of x that make the equation true?

Before we discuss that, there is an important theorem we need to revisit:

If axb=0 then
 * a=0
 * b=o
 * or both a and b are zero.

Now we have reviewed the Zero Factor Principle, we can continue our exploration into solving quadratic equations. We see now that we can solve any factor-equation of the form ab=0.

We will look at a specific example of a factorable quadratic equation 6x2+x-15=0 where a = 6, b = 1 and c = -15. Note:the sign on the number must be included.

Now you have a factor-equation of the form a x b = 0: (2x-3)(3x+5)=0

Here we will use the Zero Factor Principle, so
 * 2x-3 = 0, and so solving for x, x = 3/2
 * 3x+5 = 0, and so solving for x, x = -5/3

Solve the following quadratic equations, using the method shown above:
 * 1) x2-2x-3=0
 * 2) 6x2-x-2=0
 * 3) 2x2-x-6=0

Solutions Step 1: 1 x -3 = -3
 * 1) x2-2x-3=0

Step 2: Factors of -3 that add to -2: 1 and -3

Step 3: x2+x-3x-3=0

Step 4: x(x+1)-3(x+1)=0

(x+1)(x-3)=0

x+1=0 and x-3=0

Therefore, x = -1 and 3

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