chicken
Why belong exponential family for poisson distribution
Yes, all geometric sequences are a specific type of exponential sequence. In a geometric sequence, each term is obtained by multiplying the previous term by a constant ratio, which can be expressed in the form ( a_n = a_1 \cdot r^{(n-1)} ), where ( a_1 ) is the first term and ( r ) is the common ratio. This structure aligns with the definition of exponential functions, where the variable is in the exponent. However, not all exponential sequences are geometric, as they can have varying bases or growth rates.
Yes. Anything that multiplies repeatedly like that is exponential, also sometimes referred to as geometric.
Geometric lines have length and depth that can be endless. A line is typically used when computing linear geometry equations.
chicken
Why belong exponential family for poisson distribution
i want an example of geometric linear equations
Algebraic equations, trigenometric equations, linear equations, geometric equations, partial differential equations, differential equations, integrals to name a few.
Yes, all geometric sequences are a specific type of exponential sequence. In a geometric sequence, each term is obtained by multiplying the previous term by a constant ratio, which can be expressed in the form ( a_n = a_1 \cdot r^{(n-1)} ), where ( a_1 ) is the first term and ( r ) is the common ratio. This structure aligns with the definition of exponential functions, where the variable is in the exponent. However, not all exponential sequences are geometric, as they can have varying bases or growth rates.
Poisson distribution or geometric distribution
Yes. Anything that multiplies repeatedly like that is exponential, also sometimes referred to as geometric.
Mean of the growth of a population, investments, etc. Rule of thumb for geometric mean: THE FORMULA INVOLVES GROWTH, i.e. is exponential in nature.
Geometric lines have length and depth that can be endless. A line is typically used when computing linear geometry equations.
Exponential distribution is a function of probability theory and statistics. This kind of distribution deals with continuous probability distributions and is part of the continuous analogue of the geometric distribution in math.
The study of numbers, equations, functions, and geometric shapes (see geometry) and their relationships.
Solomon Lefschetzah has written: 'Differential equations: Geometric theory'