Linear Regression definition

Linear Regression means the determination, in analytical chemistry, of the best linear equation for calibration data to generate a calibration curve. The concentrate of an analyte in a sample can then be determined by comparing a measurement of the unknown to the calibration curve. A linear regression uses the following equation: y = mx + b; where m = slope, b = intercept.
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Linear Regression means a mathematical procedure for finding the best fitting line to a given set of data-points by minimizing the difference between the actual data points and the regressed data points shown on the line.
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Linear Regression means the determination, in analytical chemistry, of the best linear equation for calibration data to generate a calibration curve. The concentrate of an analyte in a sample can then be determined by
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Examples of Linear Regression in a sentence

  • Linear regression models for both height metrics were developed for this project.

  • Linear regression 20 models were constructed to make predictions of the considered SW3 metric from either the 21 wGT3X+/LFE or the wGT3X+/N method, in the PAD and the healthy older participants 22 separately.

  • Linear regression analyses were performed to assess phenotypic associations between sociodemographic variables, SES indicators, and depression symptoms.

  • Linear regression models describing affinity as well as TPP2 activity will be shared in the collaboration as well as *pdb files for hypothetical molecules.

  • The sequence for the management of information in this process is represented in figure 1 below: Illustration 1 – Sequence of activities in the process of assessment Theoretical reasons of the assessment process: The current compensation utilizes two methods to assess the crude oil: ▪ Distillation Cuts ▪ Linear regression of the API Y % S (Bulk Properties) Distillation Cuts: This method utilizes distillation in the lab that models the behavior of each one of the refining processes (the “Distillation Cut”).

  • Linear regression analysis on these factors established a discomfort model on which the ®lter characteristics were based.

  • Linear regression between the measurements obtained by BIA and DXA showed good correlation for ALM (R2=0.92).

  • Linear regression of absolute differences in measurements between imaging modalities was used to investigate whether patient characteristics impact measurement bias.

  • Table 9: Linear regression results for the French case, without constant and without winter 2016-2017.

  • Has en- hanced options Australia ED presentation; emergen- cy call data Signal detection met- hodology No Ambulance dis- patch system IBS sys- tem87 Syndromic surveillance System using ambu- ▇▇▇▇▇ dispatch data New York Ambulance dispatch calls Linear regression of ILI rate No ED surveillance system IBS sys- tem 89 Syndromic surveillance (drop-in) Near real time ED surveillance system tested for Rugby World Cup Australia Free text transformed to 26 syndromes.

Related to Linear Regression

  • InterMTA Traffic means traffic to or from WSP’s network that originates in one MTA and terminates in another MTA (as determined by the geographic location of the cell site to which the mobile End User is connected).

  • Digital Signal Level 0 (DS-0) means the lowest-level signal in the time division multiplex digital hierarchy, and represents a voice-grade channel operating at either the 56 Kbps or 64 Kbps transmission bit rates. There are twenty-four (24) DS-0 channels in a DS-1.

  • Traffic control signal means a device, whether manually, electrically, or mechanically operated, by which traffic is alternately directed to stop and permitted to proceed.

  • Flocculation means a process to enhance agglomeration or collection of smaller floc particles into larger, more easily settleable particles through gentle stirring by hydraulic or mechanical means.

  • Nominal tomographic section thickness means the full width at half-maximum of the sensitivity profile taken at the center of the cross-sectional volume over which x-ray transmission data are collected.