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Jan 4th, 2001, 03:07 PM
#1
Thread Starter
Monday Morning Lunatic
Still don't get these, and have my Pure 2 retake next week.
Does anyone know how the equations for these work? I didn't understand most of the references I looked at.
I refuse to tie my hands behind my back and hear somebody say "Bend Over, Boy, Because You Have It Coming To You".
-- Linus Torvalds
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Jan 4th, 2001, 04:11 PM
#2
Frenzied Member
Arithmetic first.
Arithmetic progressions are fairly straight forward. If you forget the formula, you can always work out the answer by making pairs of terms. The simplest arithmetic progression is the first N integers. Suppose you were asked to add up all the integers from one to one thousand. Imagine them paired as follows.- 1 1000
- 2 999
- 3 998
- 4 997
- . . .
It looks like 500 pairs, each of which adds up to 1001. Hence the sum of the series is 500*1001 = 500500.
The text book formula is N * (A + L)/2, where A is first term, L is last term, and N is the number of terms. Applied to the above you get 1000 * (1 + 1000) / 2.
Suppose you had the series: 8, 11, 14, 17, 20, 23, 26.
The formula method is 7 * (8 + 26) / 2 = 119. N = 7 terms, A = 8 is first, L = 26 is last.
Pairing is tuff because there is an odd number of terms, so pair the first 63 pairs, each adding to 31 or 3 * 31 = 93. Then add the last term: 93 + 26 = 119.
There is a formula which uses the difference between terms, and does not use the last term. I try to avoid this formula because I forget it, and it was messier than the above. I always seemed to be able to figure out what the last term was.
Does the above help?
Will see what I can think up about geometric series.
Live long & prosper.
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Eschew obfuscation!
If a billion people believe a foolish idea, it is still a foolish idea!
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Jan 4th, 2001, 04:33 PM
#3
Thread Starter
Monday Morning Lunatic
Thanks Guv, this really helps 
Will try making a program to do it - I always understand things better when I write a program 
I refuse to tie my hands behind my back and hear somebody say "Bend Over, Boy, Because You Have It Coming To You".
-- Linus Torvalds
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Jan 5th, 2001, 04:52 PM
#4
Hyperactive Member
I remember these? (Shame on you who don't!)
To find a specific term
Tn = A + (n-1)d
n is the term you're looking for. A is the first term and d is the difference between terms.
Just a simple Eg. 1;2;3;4;x
You want x which is the 5th term. First find the differene. So that would be T2-T1 which is 2-1=1 (Dah!)
So now your formula is:
T5 = 1 + (5-1)1
T5 = 5
Now the sum formula
from eg above
Sn = (n/2)(2a + (n-1)d)
S5 = (5/2)(2(1) + (4)1)
S5 = 15
Sn = (n/2)(a + L) has already been explained
Geometric
To find a specific term:
Tn = ar^(n-1)
a is the first term and r is the difference.
To find r: T2/T1
To find the sum of terms:
Sn = (a(r^n - 1))/(r-1) NB: if r > 1
Sn = (a(1 - r^n))/(1-r) if r < 1
OR
Sn = (a-r.L)/(1-r)
L is the last term
And finaly to find the sum to infinity:
S = a/(1-r)
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Jan 5th, 2001, 05:35 PM
#5
Thread Starter
Monday Morning Lunatic
Shame on me then
These are really helpful - considering I never got them first time round...that's why I'm retaking my Pure 2 exam  .
I refuse to tie my hands behind my back and hear somebody say "Bend Over, Boy, Because You Have It Coming To You".
-- Linus Torvalds
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Jan 12th, 2001, 06:16 PM
#6
Thread Starter
Monday Morning Lunatic
Thanks a bundle, this was really helpful (just beasted the exam )
I refuse to tie my hands behind my back and hear somebody say "Bend Over, Boy, Because You Have It Coming To You".
-- Linus Torvalds
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Jan 13th, 2001, 08:20 AM
#7
Hyperactive Member
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