Simplify the sum. d^2-9d+20/d^2-3d-10 plus d^2-2d-8/d^2+4d-32

For this case what you should do is follow the following steps:
1) factorize numerator and denominator of both expressions.
2) cancel similar terms
3) add both fractions by cross product
4) Rewrite the numerator and denominator.
Answer:
See attached image.

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virtuematane virtuematane · Answer 2 · 2019-02-27T10:57:01+01:00

Answer:

Hence, the final result after simplification is:

[tex]\dfrac{2d^2+8d-28}{d^2+10d+16}[/tex]

Step-by-step explanation:

We have to simplify the sum:

d^2-9d+20/d^2-3d-10 plus d^2-2d-8/d^2+4d-32 i.e.

[tex]\dfrac{d^2-9d+20}{d^2-3d-10}+\dfrac{d^2-2d-8}{d^2+4d-32}[/tex]

now we will apply the method of splitting the middle term in each of the polynomial terms in the numerator and denominator to obtain:

[tex]=\dfrac{d^2-5d-4d+20}{d^2-5d+2d-10}+\dfrac{d^2-4d+2d-8}{d^2+8d-4d-32}\\\\\\\\=\dfrac{d(d-5)-4(d-5)}{d(d-5)+2(d-5)}+\dfrac{d(d-4)+2(d-4)}{d(d+8)-4(d+8)}\\\\\\=\dfrac{(d-4)(d-5)}{(d+2)(d-5)}+\dfrac{(d+2)(d-4)}{(d+8)(d-4)}\\\\\\=\dfrac{d-4}{d+2}+\dfrac{d+2}{d+8}\\\\\\=\dfrac{(d-4)(d+8)+(d+2)(d+2)}{(d+2)(d+8)}[/tex]

which on solving gives us the final result as:

[tex]\dfrac{2d^2+8d-28}{d^2+10d+16}[/tex]