yr2 chap 3 sequences + series
Cards (10)
- formula for an arithmetic sequence:Un = a + (n-1)d
- formulae for sum of an arithmetic sequence:Sn = n/2 (2a + (n-1)d)Sn = n/2 (a+l)
- formula for a geometric sequence:Un = ar^(n-1)
- formula for sum of a geometric sequence:Sn = a(1-r^n)/1-r
- the three types of sequence are arithmetic, geometric and iterative
- formulae for an iterative sequence:U(n) = U(n-1) + dU(n) = rU(n-1)
- in sigma notation, the number on the top represents the number of terms
- in sigma notation, the number on the bottom with r = ... represents the first number that you substitute in for the first term
- in sigma notation, the part after the sigma is the nth term of the sequence, it is what you substitute the numbers into to get the terms
- to prove the formula Sn = n/2 (2a + (n-1)d):
- write out the first two and last two terms
- write out the sum using + ... + to show the other terms, label this equation 1
- write out the sum again backwards using + ... + to show the other terms, label this equation 2
- add equation 1 and equation 2 together to get 2Sn, show 2 identical terms then + ... + then 2 identical terms
- collect the identical terms together using a multiple of n
- divide both sides by 2 to get Sn