Question: 62. Determine whether the sequence converges or diverges. If it converges, find the limit.(a). a_(n)=(5)/(n+2)(b). a_(n)=(4n^(2)-3n)/(2n^(2)+1)(c). a_(n)=(n^(4))/(n^(3)-2n)(d). a_(n)=3^(n)7^(-n)(e). a_(n)=e^(-(1)/(sqrt(n)))(f). a_(n)=sqrt((1+4n^(2))/(1+n^(2)))(g).{((2n-1)!)/((2n+1)!)}(h).{n^(2)e^(-n)}

62. Determine whether the sequence converges or diverges. If it converges, find the limit.(a). a_(n)=(5)/(n+2)(b). a_(n)=(4n^(2)-3n)/(2n^(2)+1)(c). a_(n)=(n^(4))/(n^(3)-2n)(d). a_(n)=3^(n)7^(-n)(e). a_(n)=e^(-(1)/(\sqrt(n)))(f). a_(n)=\sqrt((1+4n^(2))/(1+n^(2)))(g).{((2n-1)!)/((2n+1)!)}(h).{n^(2)e^(-n)}

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