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The method usually applied for fitting a binomial distribution is known as
- a)method of least square.
- b)method of moments.
- c)method of probability distribution.
- d)method of deviations.
Correct answer is option 'B'. Can you explain this answer?
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The method usually applied for fitting a binomial distribution is know...
Method of Moments for Fitting a Binomial Distribution
The method usually applied for fitting a binomial distribution is known as the method of moments. This method involves equating the sample moments of the distribution to their corresponding population moments.
Steps Involved in Applying the Method of Moments for Fitting a Binomial Distribution:
1. Determine the Sample Moments:
The first step is to determine the sample moments of the distribution. For a binomial distribution, the first two sample moments are the sample mean and the sample variance. These can be calculated from the data.
2. Determine the Population Moments:
The next step is to determine the corresponding population moments. For a binomial distribution, the first two population moments are the population mean and the population variance.
3. Equate the Sample and Population Moments:
The final step is to equate the sample and population moments. This will result in a set of equations that can be solved for the parameters of the binomial distribution.
When applying the method of moments to a binomial distribution, the parameter p is estimated by equating the sample mean to the population mean, and the parameter n is estimated by equating the sample variance to the population variance.
Limitations of the Method of Moments:
1. The method of moments may not always provide accurate estimates of the parameters of a distribution, especially for small sample sizes.
2. The method assumes that the distribution is well-behaved and has finite moments.
3. The method does not take into account the shape of the distribution, and may not be appropriate for distributions with multiple modes or skewness.
Conclusion:
In conclusion, the method of moments is a commonly used method for fitting a binomial distribution. It involves equating the sample moments to their corresponding population moments, and solving for the parameters of the distribution. However, the method has its limitations and should be used with caution, especially for small sample sizes.
The method usually applied for fitting a binomial distribution is known as the method of moments. This method involves equating the sample moments of the distribution to their corresponding population moments.
Steps Involved in Applying the Method of Moments for Fitting a Binomial Distribution:
1. Determine the Sample Moments:
The first step is to determine the sample moments of the distribution. For a binomial distribution, the first two sample moments are the sample mean and the sample variance. These can be calculated from the data.
2. Determine the Population Moments:
The next step is to determine the corresponding population moments. For a binomial distribution, the first two population moments are the population mean and the population variance.
3. Equate the Sample and Population Moments:
The final step is to equate the sample and population moments. This will result in a set of equations that can be solved for the parameters of the binomial distribution.
When applying the method of moments to a binomial distribution, the parameter p is estimated by equating the sample mean to the population mean, and the parameter n is estimated by equating the sample variance to the population variance.
Limitations of the Method of Moments:
1. The method of moments may not always provide accurate estimates of the parameters of a distribution, especially for small sample sizes.
2. The method assumes that the distribution is well-behaved and has finite moments.
3. The method does not take into account the shape of the distribution, and may not be appropriate for distributions with multiple modes or skewness.
Conclusion:
In conclusion, the method of moments is a commonly used method for fitting a binomial distribution. It involves equating the sample moments to their corresponding population moments, and solving for the parameters of the distribution. However, the method has its limitations and should be used with caution, especially for small sample sizes.
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The method usually applied for fitting a binomial distribution is known asa)method of least square.b)method of moments.c)method of probability distribution.d)method of deviations.Correct answer is option 'B'. Can you explain this answer?
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