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How do you find the product of #(n^2+n-2)/(n+2)*(4n)/(n-1)#?

1 Answer

Shwetank Mauria

Mar 31, 2017

#(n^2+n-2)/(n+2)*(4n)/(n-1)=4n#

Explanation:

#(n^2+n-2)/(n+2)*(4n)/(n-1)#

#=(n^2+2n-n-2)/(n+2)*(4n)/(n-1)#

#=(n(n+2)-1(n+2))/(n+2)*(4n)/(n-1)#

#=((n-1)(n+2))/(n+2)*(4n)/((n-1))#

#=(cancel((n-1))cancel((n+2)))/cancel((n+2))*(4n)/(cancel((n-1)))#

#=4n#

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