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Logs- please help im so lost (1 Viewer)

Tams

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hey guys and gals...um well i have a maths exam tomoro
and ive been studying and all and now ive come to logs
and im so stuck
call me stupid but how on earth do u do "change of base" on a calculator?
if ur sposed to do it on a calculator at all?
say u have
log (lil 9) big 243 - (i cant write it properly)
how are u sposed to work it out?
help would be most appreciated
xxoo
 

pc_wizz

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when you have something like:

log b
a


it is the same as (ln b)/(ln a)

for ur question just put it as (ln 243)/(ln 9)

:)
 

sammeh

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change of base rule is:

log_a x = (log_b x)/(log_b a)

to do this on your calculator, u first have to change to either base 10 or base e, then evaluate.

gl2u ^^
 

Slidey

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pc_wizz said:
for ur question just put it as (ln 243)/(ln 9)

:)
It would be a lot easier to note that 243=3^5=9^(5/2). So you have log<sub>9</sub>9<sup>(5/2)</sup>, which is (5/2)log<sub>9</sub>9, which is 5/2*1.

So the answer is 5/2.
 

sammeh

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hehe slide rule has what is probly the answer they would be looking for - but u asked for the chang eof base rule, so its there.
 

pc_wizz

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Slide Rule said:
It would be a lot easier to note that 243=3^5=9^(5/2). So you have log<sub>9</sub>9<sup>(5/2)</sup>, which is (5/2)log<sub>9</sub>9, which is 5/2*1.

So the answer is 5/2.
getting a bit complex there :p

she asked how to use the change of base rule on the calc ... i showed :D
 

JamiL

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Slide Rule said:
It would be a lot easier to note that 243=3^5=9^(5/2). So you have log<sub>9</sub>9<sup>(5/2)</sup>, which is (5/2)log<sub>9</sub>9, which is 5/2*1.

So the answer is 5/2.
sorry mate not many pl no that (59049)^.5= 243
and not many ppl no that 9^5= 59049 (without using a caluculator)
so sorry, not its not obvious
 

Slidey

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JamiL said:
sorry mate not many pl no that (59049)^.5= 243
Thanks for stating the obvious, but you misunderstood my working. There's no need to actually compute what 9^5 is. If you know your index laws, which you definitely should, then the way I suggested is the most efficient way.

and not many ppl no that 9^5= 59049 (without using a caluculator)
I didn't even know that. The fact that you think this is a necessary step indicates you misunderstood my working.

If you have 3^x, than this is also 9^(x/2), because 9^(x/2) is really (sqrt(9))^x. And that is 3^x. So when one notes that 3^5 = 243, it follows that 9^(5/2) = 243.

so sorry, not its not obvious
I never stated it was obvious. I said it was easier, assuming you notice that 243 = 3^5.

The reason I supplied my solution was to alert the thread starter that change of base is not always the only or most efficient way to solve a question - and you can bet that since the question came out so nicely, that the examiner certainly expects some students to be able solve it without change of base.
 

silvermoon

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geez, dont get so snarky guys - its just maths!!!! personally, i think u both rock - ur both heaps smarter than me! they're BOTH good methods and im sure its a good idea 2 know both ways 2 do it. i guess we're all a little stressed round now, but geez, calm down! :)
 

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