SOLUTION: Please help me solve this. I need to put it in standard form then solve for x using the quadratic equation which should give me a complex number as an answer. The problem is:{{{x

Question 155348This question is from textbook College Algebra
: Please help me solve this. I need to put it in standard form then solve for x using the quadratic equation which should give me a complex number as an answer. The problem is:. Thanks. This question is from textbook College Algebra

Found 2 solutions by checkley77, nerdybill:
Answer by checkley77(12844) (Show Source): You can put this solution on YOUR website!
Don't fully understand the need for the standard form & the use of the quadratic equation solution when there is a more direct approach as follows:
x^3-8=0
x^3=8
x=cubert8
x=2
Answer by nerdybill(7384) (Show Source): You can put this solution on YOUR website!
Notice that your equation:

is a "difference of two cubes"
That is, both terms have cube roots:
the cube root of x^3 is x
the cube root of 8^3 is 2
.
This site describes these "special cases":
http://www.purplemath.com/modules/specfact2.htm
.
Bottom-line:
If you see a situation of a "difference of two cubes", you can factor thus:
a^3 � b^3 = (a � b)(a^2 + ab + b^2)
.
In our case:
a is x
b is 2
.
Therefore, we can rewrite:

as

.
Finally, to solve, we set each factor on the left to zero:
First term:
(x-2) = 0
x = 2 (Here's one "real" solution)
.
Second term:
(x^2 + 2x + 4)=0
Here's where we need to apply the "quadratic equation":
Note: you will find that there are no real solutions, only 2 imaginary ones:

Solved by pluggable solver: SOLVE quadratic equation with variable

Quadratic equation (in our case ) has the following solutons:

For these solutions to exist, the discriminant should not be a negative number.

First, we need to compute the discriminant : .

The discriminant -12 is less than zero. That means that there are no solutions among real numbers.

If you are a student of advanced school algebra and are aware about imaginary numbers, read on.

In the field of imaginary numbers, the square root of -12 is + or - .

The solution is

Here's your graph:

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