SOLUTION: please help me understand and solve the equation x^3 + 2x^2 + x + 2 = 0, if -2 is a root.

Question 92193This question is from textbook Algebra and Trigonometry
: please help me understand and solve the equation x^3 + 2x^2 + x + 2 = 0, if -2 is a root. This question is from textbook Algebra and Trigonometry

Answer by jim_thompson5910(35256) (Show Source): You can put this solution on YOUR website!
If -2 is a root, then -2 is a test zero. So that means we can use synthetic division

Now set up the synthetic division table by placing the test zero in the upper left corner and placing the coefficients of the numerator to the right of the test zero.

-2	\|	1	2	1	2
	\|

Start by bringing down the leading coefficient (it is the coefficient with the highest exponent which is 1)

-2	\|	1	2	1	2
	\|
		1

Multiply -2 by 1 and place the product (which is -2) right underneath the second coefficient (which is 2)

-2	\|	1	2	1	2
	\|		-2
		1

Add -2 and 2 to get 0. Place the sum right underneath -2.

-2	\|	1	2	1	2
	\|		-2
		1	0

Multiply -2 by 0 and place the product (which is 0) right underneath the third coefficient (which is 1)

-2	\|	1	2	1	2
	\|		-2	0
		1	0

Add 0 and 1 to get 1. Place the sum right underneath 0.

-2	\|	1	2	1	2
	\|		-2	0
		1	0	1

Multiply -2 by 1 and place the product (which is -2) right underneath the fourth coefficient (which is 2)

-2	\|	1	2	1	2
	\|		-2	0	-2
		1	0	1

Add -2 and 2 to get 0. Place the sum right underneath -2.

-2	\|	1	2	1	2
	\|		-2	0	-2
		1	0	1	0

Since the last column adds to zero, we have a remainder of zero. This means is a factor of

Now lets look at the bottom row of coefficients:

The first 3 coefficients (1,0,1) form the quotient

So

You can use this online polynomial division calculator to check your work

Basically factors to

Now lets break down further

Let's use the quadratic formula to solve for x:

Starting with the general quadratic

the general solution using the quadratic equation is:

So lets solve (note: since the polynomial does not have an "x" term, the 2nd coefficient is zero. In other words, b=0. So that means the polynomial really looks like notice , , and )

Plug in a=1, b=0, and c=1

Square 0 to get 0

Multiply to get

Combine like terms in the radicand (everything under the square root)

Simplify the square root (note: If you need help with simplifying the square root, check out this solver)

Multiply 2 and 1 to get 2

After simplifying, the quadratic has roots of

or

===========================================================
Answer:

So the polynomial has roots

, and (the last two are the imaginary roots)
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