Answer:
The second one
Step-by-step explanation:
From step 3, that is
x²(x + 2) - 1 (x + 2) ← factor out (x + 2) from each term
= (x + 2)(x² - 1) ← step 4
x² - 1 is a difference of squares and factors as
x² - 1) = (x - 1)(x + 1)
Hence from step 4 we obtain
(x + 2)(x - 1)(x + 1) ← step 5
Answer:
[tex]\left ( x^2-1 \right )\left ( x+2 \right )\\=\left ( x+1 \right )\left ( x-1 \right )\left ( x+2 \right )[/tex]
Step-by-step explanation:
Algebraic expression is an expression consists of variables and constants which are combined using algebraic operations: + , - , × , ÷ .
Here, we are required to simplify algebraic expression: [tex]x^3-x+2x^2-2[/tex]
Three steps are given as :
[tex]x^3-x+2x^2-2\\=x^3+2x^2-x-2\\=x^2\left ( x+2 \right )-1\left ( x+2 \right )[/tex]
We need to find the next two steps:
Next step is [tex]\left ( x^2-1 \right )\left ( x+2 \right )[/tex]
We will use formula: [tex]\left ( a^2-b^2 \right )=\left ( a+b \right )\left ( a-b \right )[/tex] to write [tex]x^2-1[/tex] as [tex]\left ( x+1 \right )\left ( x-1 \right )[/tex]
Therefore, we get next two steps as follows:
[tex]\left ( x^2-1 \right )\left ( x+2 \right )\\=\left ( x+1 \right )\left ( x-1 \right )\left ( x+2 \right )[/tex]
