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Expression simplification/ Fraction Decomposition into the simple/ ((p+3)/(p^2-2p))*((4p-8)/(p+3))

How do you ((p+3)/(p^2-2p))*((4p-8)/(p+3)) in partial fractions?

An expression to simplify:

The solution

You have entered [src] 
 p + 3   4*p - 8
--------*-------
 2        p + 3 
p  - 2*p
$$\frac{4 p - 8}{p + 3} \frac{p + 3}{p^{2} - 2 p}$$ 
((p + 3)/(p^2 - 2*p))*((4*p - 8)/(p + 3))
Fraction decomposition [src] 
4/p
$$\frac{4}{p}$$ 
4
-
p
General simplification [src] 
4
-
p
$$\frac{4}{p}$$ 
4/p
Trigonometric part [src] 
-8 + 4*p
--------
 2      
p  - 2*p
$$\frac{4 p - 8}{p^{2} - 2 p}$$ 
(-8 + 4*p)/(p^2 - 2*p)
Combinatorics [src] 
4
-
p
$$\frac{4}{p}$$ 
4/p
Rational denominator [src] 
-8 + 4*p
--------
 2      
p  - 2*p
$$\frac{4 p - 8}{p^{2} - 2 p}$$ 
(-8 + 4*p)/(p^2 - 2*p)
Common denominator [src] 
4
-
p
$$\frac{4}{p}$$ 
4/p
Combining rational expressions [src] 
4
-
p
$$\frac{4}{p}$$ 
4/p
Powers [src] 
-8 + 4*p
--------
 2      
p  - 2*p
$$\frac{4 p - 8}{p^{2} - 2 p}$$ 
(-8 + 4*p)/(p^2 - 2*p)
Numerical answer [src] 
(-8.0 + 4.0*p)/(p^2 - 2.0*p)
(-8.0 + 4.0*p)/(p^2 - 2.0*p)
Assemble expression [src] 
-8 + 4*p
--------
 2      
p  - 2*p
$$\frac{4 p - 8}{p^{2} - 2 p}$$ 
(-8 + 4*p)/(p^2 - 2*p)
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