Linear regression using least

Linear regression using least squares was used to determine the correlation and the equation of the best-fit line between the 16S rRNA gene percent identity and the shared proteins measure, and between the 16S rRNA gene percent identity and the average unique proteins measure. Preliminary results showed that genera having many very closely related isolates (such as many

isolates of the same species) had much higher correlations between 16S rRNA gene percent identity and the two proteomic similarity measures than genera having fewer very closely related isolates. Further analysis revealed that this phenomenon was caused by pairs

of these closely related isolates www.selleckchem.com/products/ew-7197.html “”anchoring”" the regression line, leading to an artificially good linear relationship. To avoid this bias, we initially tried excluding pairs of isolates from the same species. This approach was problematic, however, because the nomenclature for some pairs of isolates classifies them as belonging to different species even though their 16S rRNA genes are nearly identical. For example, the 16S rRNA gene of B. anthracis strain Sterne is 99.85% identical to that of Bacillus cereus strain ATCC 14579. Thus, we instead included pairs of isolates in the analysis only if their 16S rRNA genes were less than 99.5% identical, regardless of their www.selleckchem.com/products/MDV3100.html accepted species naming. To further compare 16S rRNA gene similarity EGFR inhibitor with our two proteomic similarity measures, we generated three phylogenetic trees, each of which was based on a different distance metric. The distance metric used for the first tree was 16S rRNA gene similarity. 16S rRNA gene alignments were created by downloading sequences from the RDP10 website that were pre-aligned based on secondary structure [49]. The evolutionary history was inferred using the maximum likelihood neighbour-joining method [50] within the Molecular

Evolutionary Genetics Analysis (MEGA) program [51]. Within MEGA, a bootstrap test with 1000 replicates was used. The second tree used the same metric employed Cell press by Snel et al. [13], which is 1 – S/P, where S is the number of shared proteins between two isolates and P is the size of the smaller proteome. The metric used for the third tree was simply the average unique proteins measure described above. For the protein-based distance metrics, trees were created using the unweighted pair group method with arithmetic mean (UPGMA). Graphical representations of the complete trees were created using Geneious [52], while those of the collapsed trees were created using MEGA [51].

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