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What is the difference between any two successive terms in a arithmetic sequence?
It is the "common difference".It is the "common difference".It is the "common difference".It is the "common difference".
Can zero be the common difference for arithmetic progression?
yes. A zero common difference represents a constant sequence.
What is a good example of an arithmetic sequence?
An excellent example of an arithmetic sequence would be: 1, 5, 9, 13, 17, in which the numbers are going up by four, thus having a common difference of four. This fulfills the requirements of an arithmetic sequence - it must have a common difference between all numbers.
What is the common difference for these arithmetic sequence?
It is the difference between a term (other than the second) and its predecessor.
What is the 14th term in an arithmetic sequence in which the first term is 100 and the common difference is -4?
What is the 14th term in the arithmetic sequence in which the first is 100 and the common difference is -4? a14= a + 13d = 100 + 13(-4) = 48
What is a sequence in which a common difference separates terms?
arithmetic sequence
What is a common difference?
The common difference is the difference between two numbers in an arithmetic sequence.
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 difference between succeeding terms called?
The difference between succeeding terms in a sequence is called the common difference in an arithmetic sequence, and the common ratio in a geometric sequence.
How do I find the nth term of a decreasing linear sequence?
Whether the sequence is increasing or decreasing makes no difference. The only difference is that the common difference d will be a negative number.
What is the difference between any two successive terms in a arithmetic sequence?
It is the "common difference".It is the "common difference".It is the "common difference".It is the "common difference".
Can zero be the common difference for arithmetic progression?
yes. A zero common difference represents a constant sequence.
What is a good example of an arithmetic sequence?
An excellent example of an arithmetic sequence would be: 1, 5, 9, 13, 17, in which the numbers are going up by four, thus having a common difference of four. This fulfills the requirements of an arithmetic sequence - it must have a common difference between all numbers.
What is the common difference for these arithmetic sequence?
It is the difference between a term (other than the second) and its predecessor.
The common difference in an arithmetic sequence is a positive number?
could also be negative
What is it where you find terms by adding the common difference to the previous terms?
An arithmetic sequence.
What is the uses of arithmetic progression?
When quantities in a given sequence increase or decrease by a common difference,it is called to be in arithmetic progression.
