I've got a series question that has me really stumped:
"find the value of n if the nth term of the series : -2+ 3/2 -9/8 + .... is equal to -81/128"
heres my working:
Tn=ar^(n-1)
where a=-2
r= -3/4
-81/128 = -2*(-3/4)^(n-1)
81/256= (-3/4)^(n-1)
now taking logs of both sides:
Ln(81/256)= (n-1)* Ln(-3/4) !!!!!!!!!!!!!!!!!!!!!!!!
and this is where i hit a snag, of trying to take the log of a negative number.....
i tried just ignoring the negative and taking r as =2 and i got the correct answer (n=5)... but for some reason it seems like this sholdent be done..
any help?
"find the value of n if the nth term of the series : -2+ 3/2 -9/8 + .... is equal to -81/128"
heres my working:
Tn=ar^(n-1)
where a=-2
r= -3/4
-81/128 = -2*(-3/4)^(n-1)
81/256= (-3/4)^(n-1)
now taking logs of both sides:
Ln(81/256)= (n-1)* Ln(-3/4) !!!!!!!!!!!!!!!!!!!!!!!!
and this is where i hit a snag, of trying to take the log of a negative number.....
i tried just ignoring the negative and taking r as =2 and i got the correct answer (n=5)... but for some reason it seems like this sholdent be done..
any help?
