It is not possible to explain because you have not specified the nature of the sequence.
A sequence can be an arithmetic, or geometric progression, increasing or decreasing. Or it can be a polynomial or power progression, again increasing or decreasing. Or it can be a sequence of random numbers.
33332344444
well I do not know
your website is stupet im mad
20, 21, 22, 23, 24, 25, 26, 27, 28, 29
1 This is a repeating pattern you will get if you add the digits of the squares of integers. For cubes the pattern is 189189189 Fourth power is 179449719 Fifth power is 159729489 Sixth power is 119119119 Seventh power is 129459789 (Which is where the patterns begin to repeat. If you replaced 3 and 6 in this sequence you would have 123456789 which is the pattern of numbers to the first power. Since the sum of the digits of any number divisible by 3 is always 9 you never get back to the first power pattern.)
33332344444
well I do not know
your website is stupet im mad
20, 21, 22, 23, 24, 25, 26, 27, 28, 29
Yes, in fact many sequences. The easiest would be 2005, 2006, 2007, 2008, 2009, 2010, 2011 3012, 2013, 2014.
There are no letters in that sequence. The progression of numbers can beextended according to the rule shown by appending '26' as the fifth term.
It can be almost any pattern. For example, Un = 120+n or Un = 115+2n or Un = 110+3n etc. Or, (1/25)*5^n or (1/78125)^5^2n etc.
The one after "third" but before "fifth" in a sequence.
It is 30; the first, third, and fifth numbers form the sequence 12, 18, 24. The second, fourth, and sixth numbers follow the sequence 11, 14, 17. Logically, the seventh number must be 24 + 6, so 30.
The fourth prime is 7 and the fifth is 11.
1 This is a repeating pattern you will get if you add the digits of the squares of integers. For cubes the pattern is 189189189 Fourth power is 179449719 Fifth power is 159729489 Sixth power is 119119119 Seventh power is 129459789 (Which is where the patterns begin to repeat. If you replaced 3 and 6 in this sequence you would have 123456789 which is the pattern of numbers to the first power. Since the sum of the digits of any number divisible by 3 is always 9 you never get back to the first power pattern.)
5th1/5