• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

log help (1 Viewer)

Joined
Aug 1, 2007
Messages
1,370
Gender
Male
HSC
2010
solve for x:

i) log base 5 (1/x) = 1/2

ii )log base 2 64 = x +2

iii)log base a (x+5) - log base a (x-3) = 2


for ii)
i get 2^(x+2) = 64
x= 4

but that was from just trial and error..
is there another way ?
 

ajdlinux

Mod: ANU, ATAR/HSC Marks
Joined
Sep 15, 2006
Messages
1,890
Location
Port Macquarie / Canberra
Gender
Male
HSC
2009
This won't be helpful to you, but my 2U and 3U classes have done nothing on logarithms at all this year... is it even in the prelim course?
 

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
1) 5^1/2=1/x
5^1/2=x^-1
1/2.ln(5)=-1ln(x)
-1/2.ln(5)=ln(x)
e^(-1/2.ln(5))=e^ln(x)
x=2.24

2) 2^(x+2)=64
ln(2^(x+2))=ln(64)
(x+2).ln(2)=ln(64)
x+2=ln(64)/ln(2)
x+2=6
x=4

3) a^(x+5)/(x+3) = 2
x+5 = 2x-6
x = 11
 
Last edited:
Joined
Feb 6, 2007
Messages
628
Location
Terrigal
Gender
Male
HSC
2008
i) ln(1/x)/ln5 = 0.5
ln(1/x) = ln(rt5)
1/x= rt5
x= 1/rt5

ii) change the base again
ln64/ln2 =x+ 2

6ln(2)/ln2 =2 +x
x=4
 
Last edited:

lyounamu

Reborn
Joined
Oct 28, 2007
Messages
9,998
Gender
Male
HSC
N/A
xXmuffin0manXx said:
solve for x:

i) log base 5 (1/x) = 1/2

ii )log base 2 64 = x +2

iii)log base a (x+5) - log base a (x-3) = 2


for ii)
i get 2^(x+2) = 64
x= 4

but that was from just trial and error..
is there another way ?
i) log base 5 (1/x) = (ln 1/x)/(ln 5)

i.e. (ln 1/x)/(ln 5) = 1/2
ln 1/x = ln5/2
just work it out from here.

ii) log base 2 64 = ln 64/ln 2

i.e. ln 64/ln 2 = x+2
6 = x+2
x=4

iii) log base a (x+5) - log base a (x-3) = log base a (x+5)/(x-3)
i.e. log base a (x+5)/(x-3) = 2
x+5 = 2x - 6
x = 11
 

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
ajdlinux said:
This won't be helpful to you, but my 2U and 3U classes have done nothing on logarithms at all this year... is it even in the prelim course?
yeah derivatives of logarithms are, i think.
 
Joined
Aug 1, 2007
Messages
1,370
Gender
Male
HSC
2010
ohh..i see

just a few little concepts that i had muddled up..

thanks for all your help !

edit: looks like i got marked wrong for the third one too
 
Last edited:

lolokay

Active Member
Joined
Mar 21, 2008
Messages
1,015
Gender
Undisclosed
HSC
2009
xXmuffin0manXx said:
solve for x:

i) log base 5 (1/x) = 1/2

ii )log base 2 64 = x +2

iii)log base a (x+5) - log base a (x-3) = 2


for ii)
i get 2^(x+2) = 64
x= 4

but that was from just trial and error..
is there another way ?
for ii) you should know your powers of 2, but to solve it without trial and error just put ln 64/ ln 2 into the calculator, which gives you 6

for i) another way to do it would be to use the fact that
log5[1/x] = -log5x
which gives x = 5-1/2
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top