- Proof of geometric series formula - Mathematics Stack Exchange
Proof of geometric series formula Ask Question Asked 4 years, 3 months ago Modified 4 years, 3 months ago
- statistics - What are differences between Geometric, Logarithmic and . . .
Now lets do it using the geometric method that is repeated multiplication, in this case we start with x goes from 0 to 5 and our sequence goes like this: 1, 2, 2•2=4, 2•2•2=8, 2•2•2•2=16, 2•2•2•2•2=32 The conflicts have made me more confused about the concept of a dfference between Geometric and exponential growth
- terminology - Is it more accurate to use the term Geometric Growth or . . .
For example, there is a Geometric Progression but no Exponential Progression article on Wikipedia, so perhaps the term Geometric is a bit more accurate, mathematically speaking? Why are there two terms for this type of growth? Perhaps exponential growth is more popular in common parlance, and geometric in mathematical circles?
- What is the difference between arithmetic and geometrical series?
Geometric and arithmetic are two names that are given to different sequences that follow a rather strict pattern for how one term follows from the one before An arithmetic sequence is characterised by the fact that every term is equal to the term before plus some fixed constant, called the difference of the sequence For instance, $$ 1,4,7,10,13,\ldots $$ is an arithmetic sequence with
- How to model 2 correlated Geometric Brownian Motions?
How to model 2 correlated Geometric Brownian Motions? Ask Question Asked 3 years, 11 months ago Modified 2 years, 1 month ago
- Arithmetic or Geometric sequence? - Mathematics Stack Exchange
A geometric sequence is one that has a common ratio between its elements For example, the ratio between the first and the second term in the harmonic sequence is $\frac {\frac {1} {2}} {1}=\frac {1} {2}$
- algebra precalculus - Is the geometric mean of two numbers always . . .
Is the given exercise incorrect? Disregarding the parethentical mis-definition (it is falsely implying that $2$ is a geometric mean of $-1$ and $-4,$ and that $-2$ is a geometric mean of $1$ and $4),$ the main exercise itself is perfectly fine
- Rate of growth of a geometric sequence - Mathematics Stack Exchange
Since the geometric series, or their partner the continuous exponential have varying rates of change, it is nice to find something consistant within them we can call a constant rate The actual rate of change is the derivative $ df dx $ which is discrete in the sense of a series These rates of change constantly change The rate in the series in not the rate of change, it is called the rate of
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