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- Thread starter Xu
- Start date
Antisocial
Member
- Joined
- Oct 2, 2003
- Messages
- 50
Hahaha, nice poll. 
I will do this question as I am typing (need to practise series and sequences, anyway).
Test to see if AP or GP, ie. T2 - T1 = T3 - T2.
T2 - T1 = log_2 (1/x) - log_2 (1/x)
Hmm. Remember subtraction of two logs is division...
log_2 (1/x / 1/x) = log_2 (1/x)
Bring the bottom denominator up top, and simplify. Then we work on...
T3 - T2 = log_2 (1/x / 1/x) = log_2 (1/x)
log_2 (1/x) = T2 - T1 = T3 - T2
Therefore it's an AP. Some forward movement now.
It says sum of 10 terms is -440. So, sum of AP.. sn = n/2 [a + (n-1)d].
-440 = 10/2 [2log_x (1/x) + (10 - 1)log_2 (1/x)]
Expand and simplify...
10log_2 (1/x) + 45log_2 (1/x) = -440
Take out HCF...
log_2 (1/x) [10 + 45] = -440
Solve for x.
log_2 (1/x) = -440 / 55
log_2x = 8
x = 2^8
x = 256
That... took longer than expected.
Hope that's the right answer.
I will do this question as I am typing (need to practise series and sequences, anyway).
Test to see if AP or GP, ie. T2 - T1 = T3 - T2.
T2 - T1 = log_2 (1/x) - log_2 (1/x)
Hmm. Remember subtraction of two logs is division...
log_2 (1/x / 1/x) = log_2 (1/x)
Bring the bottom denominator up top, and simplify. Then we work on...
T3 - T2 = log_2 (1/x / 1/x) = log_2 (1/x)
log_2 (1/x) = T2 - T1 = T3 - T2
Therefore it's an AP. Some forward movement now.
It says sum of 10 terms is -440. So, sum of AP.. sn = n/2 [a + (n-1)d].
-440 = 10/2 [2log_x (1/x) + (10 - 1)log_2 (1/x)]
Expand and simplify...
10log_2 (1/x) + 45log_2 (1/x) = -440
Take out HCF...
log_2 (1/x) [10 + 45] = -440
Solve for x.
log_2 (1/x) = -440 / 55
log_2x = 8
x = 2^8
x = 256
That... took longer than expected.
Hope that's the right answer.
Jumbo Cactuar
Argentous Fingers
- Joined
- Sep 8, 2003
- Messages
- 425
- Gender
- Male
- HSC
- 2003
this is a way better solution ...
-440 = log_2 (1/x) + ... + log_2 (1/x^10)
= log_2 ((1/x) * ... * (1/x^10))
= log_2 (1/x^55)
2^-440 = 1/x^55
2^440 = x^55
x = 2^(440/55) = 256
-440 = log_2 (1/x) + ... + log_2 (1/x^10)
= log_2 ((1/x) * ... * (1/x^10))
= log_2 (1/x^55)
2^-440 = 1/x^55
2^440 = x^55
x = 2^(440/55) = 256
RHS=log_2 (1/x) + ... + log_2 (1/x^10)
= log_2 ((1/x) * ... * (1/x^10)) (Log Rule-"the addition rule thing")
Now (1/x) * ... * (1/x^10) = (1/x^55) (Index Law - when multiply we add the powers, i.e 1+2+3......+10 = 55)
Hence the rest! (I think).
= log_2 ((1/x) * ... * (1/x^10)) (Log Rule-"the addition rule thing")
Now (1/x) * ... * (1/x^10) = (1/x^55) (Index Law - when multiply we add the powers, i.e 1+2+3......+10 = 55)
Hence the rest! (I think
).
Jumbo Cactuar
Argentous Fingers
- Joined
- Sep 8, 2003
- Messages
- 425
- Gender
- Male
- HSC
- 2003
fsss the outrage!!!
Well that is the last time I help a fellow ffviii enthusistast, or someone who coincidentally has the name of one of the characters
ssssonicyouth
phonic booth
yes, but u missed so many lines working it was pretty pointless to use it as an attempt to explain something to xu