- Jul 23, 2001
- 5,589
- 1
- 81
hi.
just got a couple questions to clarify some limit stuff haven't done in a while.
first up is sequence An= lim as n goes to infin of cos(nPi)/n
i figured since cos(np) alternates b/t -1,1 that the sequence would diverge, but book says answer is 0...so for alternating stuff cases would i just use squeeze theorem say something like since the lim|An| = 0 due to -1/n<|cos(npi)|<1/n thus lim An = 0
and then for this one where An = (-pi)^n/5^n, just say same thing..abs value of lim = normal limit so it'd be small over big = 0
also would seq An = (1/4)^n _ 3^n/2 div as lim goes to infin? ..(1/4)^n goes to 0 and then the n/2 would go to infin so just div..
An = n^100/e^n would = 0 since e^n will grow quicker
and how would you show that An= (1 +2/n)^n/2 is = e
is e = to lim as n goes to infin (1+1/n)^n so i assume you just say the 2 doesn't matter due to it going to infin.
just got a couple questions to clarify some limit stuff haven't done in a while.
first up is sequence An= lim as n goes to infin of cos(nPi)/n
i figured since cos(np) alternates b/t -1,1 that the sequence would diverge, but book says answer is 0...so for alternating stuff cases would i just use squeeze theorem say something like since the lim|An| = 0 due to -1/n<|cos(npi)|<1/n thus lim An = 0
and then for this one where An = (-pi)^n/5^n, just say same thing..abs value of lim = normal limit so it'd be small over big = 0
also would seq An = (1/4)^n _ 3^n/2 div as lim goes to infin? ..(1/4)^n goes to 0 and then the n/2 would go to infin so just div..
An = n^100/e^n would = 0 since e^n will grow quicker
and how would you show that An= (1 +2/n)^n/2 is = e
is e = to lim as n goes to infin (1+1/n)^n so i assume you just say the 2 doesn't matter due to it going to infin.
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