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Q: Determine if the sequence below is arithmetic or geometric and determine the common difference/ ratio in simplest form 300,30,3?

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The difference between arithmetic and geometric mean you can find in the following link: "Calculation of the geometric mean of two numbers".

It can be any number. Two numbers do not even determine whether the "sequence" is arithmetic, geometric or other.

The difference between arithmetic and geometric mean you can find in the following link: "Calculation of the geometric mean of two numbers".

The question cannot be answered because two terms are not enough to determine whether the sequence is arithmetic or geometric (or something else).

They refer to different branches of mathematics.

You can see the difference in the following link: "Calculation of the geometric mean of two numbers".

The difference between arithmetic and geometric mean you can find in the following link: "Calculation of the geometric mean of two numbers".

The sequence is neither arithmetic nor geometric.

Arithmetic, common difference 5.5

They differ in formula.

No, it is not.

You can find the differences between arithmetic and geometric mean in the following link: "Calculation of the geometric mean of two numbers".

Geometric

an arithmetic sequeunce does not have the sum to infinty, and a geometric sequence has.

they look like arithmetic and geometric patterns in math

An arithmetic-geometric mean is a mean of two numbers which is the common limit of a pair of sequences, whose terms are defined by taking the arithmetic and geometric means of the previous pair of terms.

1.The Geometric mean is less then the arithmetic mean. GEOMETRIC MEAN < ARITHMETIC MEAN 2.

By working out the geometric length of Pythagoras' hypotenuse to correctly determine which adjacent window is in juxtaposition.

It is an arithmetic sequence (with constant difference 0), or a geometric sequence (with constant ratio 1).

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.

The sequence 216 12 23 is neither arithmetic nor geometric.

how are arithmetic and geometric sequences similar

Any shape tesselates any of its covering spaces.

They are both adjectives. The first relates to geometry and the second to arithmetic.

In geometric growth the ratios of successive terms is the same whereas in arithmetic growth the differences are the same.