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What is the geometric shape of a car antenna?
Cylinder with a very large ratio of length to radius.
What is the common ratio of the geometric progression?
The common ratio is the ratio of the nth term (n > 1) to the (n-1)th term. For the progression to be geometric, this ratio must be a non-zero constant.
In a geometric sequence the between consecutive terms is constant.?
Ratio
What is the common ratio in this geometric sequence 3 12 48?
The ratio is 4.
What is the change from one number to the next in a geometric sequence called?
The common ratio.
What is a geometric rule for pattern?
Not sure about this question. But, a geometric sequence is a sequence of numbers such that the ratio of any two consecutive numbers is a constant, known as the "common ratio". A geometric sequence consists of a set of numbers of the form a, ar, ar2, ar3, ... arn, ... where r is the common ratio.
Is -1 -36 216 a geometric sequence and what is its ratio?
No it is not.
How is scale factor related to a ratio?
A scale factor is the ratio of corresponding linear measures of two objects.A scale factor is the ratio of corresponding linear measures of two objects.A scale factor is the ratio of corresponding linear measures of two objects.A scale factor is the ratio of corresponding linear measures of two objects.
How do you determine if a sequence is geometric?
A sequence is geometric if each term is found by mutiplying the previous term by a certain number (known as the common ratio). 2,4,8,16, --> here the common ratio is 2.
Can common ratio be 1 in geometric progression?
Yes, the common ratio in a geometric progression can be 1. In a geometric progression, each term is obtained by multiplying the previous term by a constant factor, known as the common ratio. When the common ratio is 1, each term is equal to the previous term, resulting in a sequence of repeated values. This is known as a constant or degenerate geometric progression.
How do fractals relate to geometric sequences?
Fractals exhibit self-similarity and complex patterns that emerge from simple geometric rules, often involving recursive processes. Geometric sequences, characterized by a constant ratio between successive terms, can manifest in the scaling properties of fractals, where each iteration of the fractal pattern can be seen as a geometric transformation. For example, in the construction of fractals like the Koch snowflake, each stage involves multiplying or scaling by a fixed ratio, reflecting the principles of geometric sequences in their iterative growth. Thus, both concepts explore the idea of infinite complexity arising from simple, repeated processes.
Which ratio measures the firms degree of indebtness?
debt ratio
