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Write out the form of the partial fraction decomposition of the function. Do not determine the numerical values of the coefficients. (If the partial fraction decomposition does not exist, enter DNE.)

Write out the form of the partial fraction decomposition of the function Do not determine the numerical values of the coefficients If the partial fraction decom class=

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LammettHash
For part (a), you have

[tex]\dfrac x{x^2+x-6}=\dfrac x{(x+3)(x-2)}=\dfrac a{x+3}+\dfrac b{x-2}[/tex]
[tex]x=a(x-2)+b(x+3)[/tex]

If [tex]x=2[/tex], then [tex]2=b(2-3)\implies b=-2[/tex].

If [tex]x=-3[/tex], then [tex]-3=a(-3-2)\implies a=\dfrac35[/tex].

So,

[tex]\dfrac x{x^2+x-6}=\dfrac 3{5(x+3)}-\dfrac 2{x-2}[/tex]

For part (b), since the degrees of the numerator and denominator are the same, you first need to find the quotient and remainder upon division.

[tex]\dfrac{x^2}{x^2+x+2}=\dfrac{x^2+x+2-x-2}{x^2+x+2}=1-\dfrac{x+2}{x^2+x+2}[/tex]

In the remainder term, the denominator [tex]x^2+x+2[/tex] can't be factorized into linear components with real coefficients, since the discriminant is negative [tex](1-4\times1\times2=-7)[/tex]. However, you can still factorized over the complex numbers, so a partial fraction decomposition in terms of complexes does exist.

[tex]x^2+x+2=0\implies x=-\dfrac12\pm\dfrac{\sqrt7}2i[/tex]
[tex]\implies x^2+x+2=\left(x-\left(-\dfrac12+\dfrac{\sqrt7}2i\right)\right)\left(x-\left(-\dfrac12-\dfrac{\sqrt7}2i\right)\right)[/tex]
[tex]\implies x^2+x+2=\left(x+\dfrac12-\dfrac{\sqrt7}2i\right)\left(x+\dfrac12+\dfrac{\sqrt7}2i\right)[/tex]

Then you have

[tex]\dfrac{x+2}{x^2+x+2}=\dfrac a{x+\dfrac12-\dfrac{\sqrt7}2i}+\dfrac b{x+\dfrac12+\dfrac{\sqrt7}2i}[/tex]
[tex]x+2=a\left(x+\dfrac12+\dfrac{\sqrt7}2i\right)+b\left(x+\dfrac12-\dfrac{\sqrt7}2i\right)[/tex]

When [tex]x=-\dfrac12-\dfrac{\sqrt7}2i[/tex], you have

[tex]-\dfrac12-\dfrac{\sqrt7}2i+2=b\left(-\dfrac12-\dfrac{\sqrt7}2i+\dfrac12-\dfrac{\sqrt7}2i\right)[/tex]
[tex]\dfrac32-\dfrac{\sqrt7}2i=-\sqrt7ib[/tex]
[tex]b=\dfrac12+\dfrac3{2\sqrt7}i=\dfrac1{14}(7+3\sqrt7i)[/tex]

When [tex]x=-\dfrac12+\dfrac{\sqrt7}2i[/tex], you have

[tex]-\dfrac12+\dfrac{\sqrt7}2i+2=a\left(-\dfrac12+\dfrac{\sqrt7}2i+\dfrac12+\dfrac{\sqrt7}2i\right)[/tex]
[tex]\dfrac32+\dfrac{\sqrt7}2i=\sqrt7ia[/tex]
[tex]a=\dfrac12-\dfrac3{2\sqrt7}i=\dfrac1{14}(7-3\sqrt7i)[/tex]

So, you could write

[tex]\dfrac{x^2}{x^2+x+2}=1-\dfrac{x+2}{x^2+x+2}=1-\dfrac {7-3\sqrt7i}{14\left(x+\dfrac12-\dfrac{\sqrt7}2i\right)}-\dfrac {7+3\sqrt7i}{14\left(x+\dfrac12+\dfrac{\sqrt7}2i\right)}[/tex]

but that may or may not be considered acceptable by that webpage.

Answer:

exactly what they said, just answering so they can get brainliest maybe.

Step-by-step explanation:

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