10, 12, __, __, __, 60, (?)
Halve the values of these terms:
5, 6, __, __, __, 30, (?)
If the difference between terms is:
1, 3, 5, 7, ....., a sequence of odd numbers,
then the sequence is
5, 6, 9, 14, 21, 30, 41, 54,...
The summation of the series of odd numbers is given by x^2.
The value of each term under investigation for this sequence can be given by:
(5 + x^2) where x >= 0.
The presented sequence however is double this so the expression needs to be:
but the 7th term of this series is 82, and therefore defined.
Division by zero is "undefined".
How to divide the term by zero in terms of the defining x value?
If x=6 then 2(5+x^2) = 82. If a denominator (6-x) is defined and x=0 then the denominator is zero.
Let each term of the sequence be mutiplied by 1, expressed as (6-x)/(6-x) which is defined for all x except 6.
The expression required then is:
2*(6-x)(5+x^2)/(6-x) where x>=0 and x=6 is undefined.
The following sequence:
10, 12, 18, 28, 42, 60, (82?), 108, 138, .......... fulfills the problems requirements.
More generally this sequence can be represented as:
a*(b-x)(c+x^2)/(b-x) where all values are integers.
a is a multiplier which provides an offset from the base sequence - (c+x^2)
c is the first term of the base sequence
x is any integer >= 0
b is the value for which (b+1) is the term which will be "undefined".
Even more generally 'a' can be any multiplier and 'x^2' can be any defining interval.
The important thing is the (b-x) factor as it provides the indeterminate value, ie, (b-x)/(b-x) for b=x!!
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Posted by brianjn
on 2008-03-14 21:15:37 |
A little naughty (??)
