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Estimation of the Physical Quantities01:05

Estimation of the Physical Quantities

4.3K
On many occasions, physicists, other scientists, and engineers need to make estimates of a particular quantity. These are sometimes referred to as guesstimates, order-of-magnitude approximations, back-of-the-envelope calculations, or Fermi calculations. The physicist Enrico Fermi was famous for his ability to estimate various kinds of data with surprising precision. Estimating does not mean guessing a number or a formula at random. Instead, estimation means using prior experience and sound...
4.3K
Distributions to Estimate Population Parameter01:26

Distributions to Estimate Population Parameter

4.1K
The accurate values of population parameters such as population proportion, population mean, and population standard deviation (or variance) are usually unknown. These are fixed values that can only be estimated from the data collected from the samples. The estimates of each of these parameters are sample proportion, the sample mean, and sample standard deviation (or variance). To obtain the values of these sample statistics, data are required that have particular distribution and central...
4.1K
Quantitative Analysis01:12

Quantitative Analysis

300
Quantitative analysis is a technique for measuring the amount of specific constituents in a sample. When the sample's composition is unknown, qualitative analysis is performed first to identify its components, which ensures that the correct substances are measured during the quantitative phase.
In quantitative analysis, two key measurements are made: the sample quantity and a property proportional to the amount of the analyte (the substance being analyzed). This forms the basis of the...
300
Uncertainty: Confidence Intervals00:54

Uncertainty: Confidence Intervals

4.1K
The confidence interval is the range of values around the mean that contains the true mean. It is expressed as a probability percentage. The interpretation of a 95% confidence interval, for instance, is that the statistician is 95% confident that the true mean falls within the interval. The upper and lower limits of this range are known as confidence limits. The confidence limits for the true mean are estimated from the sample's mean, the standard deviation, and the statistical factor...
4.1K
Mechanistic Models: Compartment Models in Algorithms for Numerical Problem Solving01:29

Mechanistic Models: Compartment Models in Algorithms for Numerical Problem Solving

54
Mechanistic models play a crucial role in algorithms for numerical problem-solving, particularly in nonlinear mixed effects modeling (NMEM). These models aim to minimize specific objective functions by evaluating various parameter estimates, leading to the development of systematic algorithms. In some cases, linearization techniques approximate the model using linear equations.
In individual population analyses, different algorithms are employed, such as Cauchy's method, which uses a...
54
Estimating Population Mean with Unknown Standard Deviation01:22

Estimating Population Mean with Unknown Standard Deviation

7.7K
In practice, we rarely know the population standard deviation. In the past, when the sample size was large, this did not present a problem to statisticians. They used the sample standard deviation s as an estimate for σ and proceeded as before to calculate a confidence interval with close enough results. However, statisticians ran into problems when the sample size was small. A small sample size caused inaccuracies in the confidence interval.
William S. Gosset (1876–1937) of the...
7.7K

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相关实验视频

Updated: Jul 2, 2025

Quantifying Cytoskeleton Dynamics Using Differential Dynamic Microscopy
06:37

Quantifying Cytoskeleton Dynamics Using Differential Dynamic Microscopy

Published on: June 15, 2022

3.6K

使用QuantDiffForecast的普通微分方程模型用量化的不确定性进行参数估计和预测:一个MATLAB工具箱和教程.

Gerardo Chowell1, Amanda Bleichrodt1, Ruiyan Luo1

  • 1Department of Population Health Sciences, School of Public Health, Georgia State University, Atlanta, Georgia, USA.

Statistics in medicine
|February 20, 2024
PubMed
概括
此摘要是机器生成的。

本研究介绍了QuantDiffForecast,这是一个用于估计参数和预测来自普通微分方程 (ODE) 模型的时间序列数据的 MATLAB 工具箱. 它量化了预测中的不确定性,帮助科学假设评估和系统状态预测.

关键词:
一个ODE模型工具箱.常规微分方程 常规微分方程参数估计的参数估计.实时预测和业绩表现.这是一个自学教程.

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Development of an Individual-Tree Basal Area Increment Model using a Linear Mixed-Effects Approach
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Development of an Individual-Tree Basal Area Increment Model using a Linear Mixed-Effects Approach

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A Method of Trigonometric Modelling of Seasonal Variation Demonstrated with Multiple Sclerosis Relapse Data
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A Method of Trigonometric Modelling of Seasonal Variation Demonstrated with Multiple Sclerosis Relapse Data

Published on: December 9, 2015

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相关实验视频

Last Updated: Jul 2, 2025

Quantifying Cytoskeleton Dynamics Using Differential Dynamic Microscopy
06:37

Quantifying Cytoskeleton Dynamics Using Differential Dynamic Microscopy

Published on: June 15, 2022

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Development of an Individual-Tree Basal Area Increment Model using a Linear Mixed-Effects Approach
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Development of an Individual-Tree Basal Area Increment Model using a Linear Mixed-Effects Approach

Published on: July 3, 2020

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A Method of Trigonometric Modelling of Seasonal Variation Demonstrated with Multiple Sclerosis Relapse Data
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A Method of Trigonometric Modelling of Seasonal Variation Demonstrated with Multiple Sclerosis Relapse Data

Published on: December 9, 2015

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科学领域:

  • 数学建模的数学建模
  • 动态系统分析 动态系统分析
  • 计算生物学是一种计算生物学.

背景情况:

  • 普通微分方程 (ODEs) 对于科学中复杂系统的建模至关重要.
  • 准确的参数估计和预测与量化不确定性对于ODE模型应用至关重要.
  • 现有的工具可能缺乏ODE参数估计和预测的全面功能.

研究的目的:

  • 为了介绍QuantDiffForecast,一个灵活的MATLAB工具箱用于使用ODE模型进行参数估计和预测.
  • 提供一个用户友好的资源,提供详细的指导和软件,用于预测中的不确定性量化.
  • 支持包括学生在内的各种用户在科学调查中应用开放式开发模型.

主要方法:

  • 开发一个 MATLAB 工具箱 (QuantDiffForecast) 用于 ODE 模型分析.
  • 实施参数引导用于预测中的不确定性量化.
  • 将工具箱应用于使用1918年流感大流行数据的流行病模型.

主要成果:

  • 使用QuantDiffForecast工具箱,可以从ODE模型中进行可靠的参数估计和短期预测.
  • 该软件量化了预测不确定性,提高了模型可靠性.
  • 教程和示例应用程序展示了工具箱的实用性和易用性.

结论:

  • 量子差预测提供了一个全面的解决方案,用于参数估计和预测与ODEs.
  • 该工具箱有助于评估假设和预测具有量化不确定性的系统状态.
  • 该资源广泛适用于利用动态系统建模的科学学科.