1. We need to perform a division by multiplying the dividend with the reciprocal of the divisor. We can apply this rule:
- [tex](\frac{A}{B})/(\frac{C}{D} )=(\frac{A}{B}) (\frac{C}{D})[/tex]
In the problem... [tex]2(x^4 +9)/x(x^2 +1)[/tex]
- A = [tex]2(x^4+9)[/tex]
- B = 1
- C =[tex]x(x^2+1)[/tex]
- D = 1
[tex]2(x^4 +9)/x(x^2 +1)[/tex] changes to [tex](2(x^4+9))(\frac{1}{x(x^2+1)}[/tex]
2. We need to get rid of all the parenthesis in this term. [tex](2(x^4+9))(\frac{1}{x(x^2+1)}[/tex]
- All negative factors will change the sign.
- In the problem [tex](2(x^4+9))(\frac{1}{x(x^2+1)}[/tex] there isn't any negative factors. So the sign will not change.
[tex](2(x^4+9))(\frac{1}{x(x^2+1)}[/tex] is now [tex]2(x^4+9)(\frac{1}{x(x^2+1)}[/tex]
3. Lastly, we need to perform a multiplication.
- We can use this rule: [tex]\frac{A}{B} C=\frac{AC}{B}[/tex]
- In the problem [tex]2(x^4+9)(\frac{1}{x(x^2+1)}[/tex] the new factors on the numerator are: [tex]2, (x^4+9), 1[/tex]
- Notice that all non-fraction factors are placed in the numerator.
- The new factors in the denominator are: [tex]x, (x^2+1),[/tex]
Therefore, the answer is: [tex]\frac{2(x^4+9)}{x(x^2+1)}[/tex]
