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What is the difference between a geometric sequence and a recursive formula?
what is the recursive formula for this geometric sequence?
How do arithmetic and geometric sequences compare to continuous functions?
an arithmetic sequeunce does not have the sum to infinty, and a geometric sequence has.
What is the sequence of numbers that are both geometric and arithmetic?
It is called arithmetico-geometric sequence. I have added a link with some nice information about them.
What is the recursive function for the sequence 516273849?
To define a recursive function for the sequence 516273849, we first identify the pattern or rule governing the sequence. However, the sequence does not exhibit a clear arithmetic or geometric progression, making it challenging to express as a simple recursive function without additional context or rules. If it's meant to be a specific pattern or derived from a particular mathematical operation, please provide more details for a precise recursive expression. Otherwise, we might need to treat each term as an individual case or define it based on its position.
Is 20 12 62 a geometric or arithmetic sequence?
It is neither.
What is the difference between a geometric sequence and a recursive formula?
what is the recursive formula for this geometric sequence?
Can a recursive formula produce an arithmetic or geometric sequence?
arithmetic sequence * * * * * A recursive formula can produce arithmetic, geometric or other sequences. For example, for n = 1, 2, 3, ...: u0 = 2, un = un-1 + 5 is an arithmetic sequence. u0 = 2, un = un-1 * 5 is a geometric sequence. u0 = 0, un = un-1 + n is the sequence of triangular numbers. u0 = 0, un = un-1 + n(n+1)/2 is the sequence of perfect squares. u0 = 1, u1 = 1, un+1 = un-1 + un is the Fibonacci sequence.
Which explains why the sequence 216 12 23 is arithmetic or geometric?
The sequence 216 12 23 is neither arithmetic nor geometric.
How do arithmetic and geometric sequences compare to continuous functions?
an arithmetic sequeunce does not have the sum to infinty, and a geometric sequence has.
Is the following sequence arithmetic or geometric and what is the common difference (d) or the common ration (r) the common ratio (r) of the sequence π2π3π22π?
The sequence is neither arithmetic nor geometric.
What is the recursive formula for this geometric sequence 4-1236-108...?
4, -1236, -108 is not a geometric system.
What are mathamatical patterns?
Mathematical patterns are lists number that follows a certain rule and have different types. Some of these are: Arithmetic sequence, Fibonacci sequence and Geometric sequence.
Is -4 -8 -16 -32 arithmetic geometric both or neither?
It is a geometric sequence.
What is the difference between an arithmetic sequence and a geometric sequence?
In an arithmetic sequence the same number (positive or negative) is added to each term to get to the next term.In a geometric sequence the same number (positive or negative) is multiplied into each term to get to the next term.A geometric sequence uses multiplicative and divisive formulas while an arithmetic uses additive and subtractive formulas.
What is the sequence of numbers that are both geometric and arithmetic?
It is called arithmetico-geometric sequence. I have added a link with some nice information about them.
What is the recursive function for the sequence 516273849?
To define a recursive function for the sequence 516273849, we first identify the pattern or rule governing the sequence. However, the sequence does not exhibit a clear arithmetic or geometric progression, making it challenging to express as a simple recursive function without additional context or rules. If it's meant to be a specific pattern or derived from a particular mathematical operation, please provide more details for a precise recursive expression. Otherwise, we might need to treat each term as an individual case or define it based on its position.
Is the sequence 2 4 16 arithmetic or geometric?
neither
