A Correlation of To the Texas Essential Knowledge and Skills Copyright 2015 Pearson Education, Inc. or its affiliate(s). All rights reserved
A Correlation of, (c) Knowledge and skills. (1) Mathematical process standards. The student uses mathematical processes to acquire and demonstrate mathematical understanding. The student is expected to: (A) apply mathematics to problems arising in everyday life, society, and the workplace; SE/TE: 13-14, 36, 71, 101, 153, 206, 256-257, 335, 386, 387, 444-445, 481-482, 508-509 (B) use a problem-solving model that incorporates analyzing given information, formulating a plan or strategy, determining a solution, justifying the solution, and evaluating the problem-solving process and the reasonableness of the solution; SE/TE: 32-34, 90-91, 120-121, 168-170, 227-228, 274-275, 295-296, 321-323, 353-354, 403-404, 461-463 (C) select tools, including real objects, manipulatives, paper and pencil, and technology as appropriate, and techniques, including mental math, estimation, and number sense as appropriate, to solve problems; SE/TE: 16, 47-48, 68, 120, 123-124, 145, 221, 259, 276, 348, 363, 381, 425, 428, 434-435, 448 (D) communicate mathematical ideas, reasoning, and their implications using multiple representations, including symbols, diagrams, graphs, and language as appropriate; (E) create and use representations to organize, record, and communicate mathematical ideas; SE/TE: 22-30, 38, 46-53, 87-91, 94, 115-116, 119-120, 131, 171-172, 234-235, 287-289, 306-309, 332-334, 407-409, 494-495 SE/TE: 7-13, 16, 46-51, 92-99, 139-145, 164-168, 246-253, 287-290, 294-295, 306-309, 420-422 (F) analyze mathematical relationships to connect and communicate mathematical ideas; and SE/TE: 7-10, 12, 21, 48-53, 89-91, 139-145, 164-168, 248-251, 349-358, 397-402, 458-463, 494-498 (G) display, explain, or justify mathematical ideas and arguments using precise mathematical language in written or oral communication. SE/TE: 7-10, 12, 38-43, 67, 75-81, 125, 134-135, 149, 156-162, 228, 279-281, 363-367, 413-418 2
A Correlation of, (2) Statistical process sampling and experimentation. The student applies mathematical processes to apply understandings about statistical studies, surveys, and experiments to design and conduct a study and use graphical, numerical, and analytical techniques to communicate the results of the study. The student is expected to: (A) compare and contrast the benefits of SE/TE: 219-227, 230-231 different sampling techniques, including random sampling and convenience sampling methods; (B) distinguish among observational studies, surveys, and experiments; (C) analyze generalizations made from observational studies, surveys, and experiments; (D) distinguish between sample statistics and population parameters; (E) formulate a meaningful question, determine the data needed to answer the question, gather the appropriate data, analyze the data, and draw reasonable conclusions; SE/TE: 219-224, 242-246, 248-254 SE/TE: 219-224, 242-246, 248-254, 255-256 SE/TE: 219-224, 242-246, 248-254 SE/TE: 7-12, 32-34, 66-67, 90-91, 219-226, 229-230 (F) communicate methods used, analyses conducted, and conclusions drawn for a data-analysis project through the use of one or more of the following: a written report, a visual display, an oral report, or a multimedia presentation; and SE/TE: 17-19, 39-43, 75-81, 104-112 (G) critically analyze published findings for appropriateness of study design implemented, sampling methods used, or the statistics applied. SE/TE: 19, 43, 81, 112 (3) Variability. The student applies the mathematical process standards when describing and modeling variability. The student is expected to: (A) distinguish between mathematical SE/TE: 2-3, 7-13, 21-31, 46-54, 63-66 models and statistical models; (B) construct a statistical model to describe variability around the structure of a mathematical model for a given situation; SE/TE: 7-13, 46-54, 63-66 3
A Correlation of, (C) distinguish among different sources of variability, including measurement, natural, induced, and sampling variability; and SE/TE: 219-227, 371-372 (D) describe and model variability using population and sampling distributions. SE/TE: 371-377 (4) Categorical and quantitative data. The student applies the mathematical process standards to represent and analyze both categorical and quantitative data. The student is expected to: (A) distinguish between categorical and SE/TE: 20-28, 46-51 quantitative data; (B) represent and summarize data and justify the representation; SE/TE: 7-12, 21-28, 32-35, 46-54, 56-63, 84-91, 95-99 (C) analyze the distribution characteristics of quantitative data, including determining the possible existence and impact of outliers; SE/TE: 46-53, 55-57, 92-93 (D) compare and contrast different graphical or visual representations given the same data set; (E) compare and contrast meaningful information derived from summary statistics given a data set; and (F) analyze categorical data, including determining marginal and conditional distributions, using two-way tables. SE/TE: 21-28, 32-35, 84-89, 91, 371-373, 420-421 SE/TE: 46-53, 55-58, 61-66, 84-90, 92-99 SE/TE: 21-31, 34-35 (5) Probability and random variables. The student applies the mathematical process standards to connect probability and statistics. The student is expected to: (A) determine probabilities, including the SE/TE: 320-328, 332-334 use of a two-way table; (B) describe the relationship between theoretical and empirical probabilities using the Law of Large Numbers; SE/TE: 286, 297-298 4
A Correlation of, (C) construct a distribution based on a technology-generated simulation or collected samples for a discrete random variable; and SE/TE: 347-348 (D) compare statistical measures such as SE/TE: 420-421, 422, 423-424 sample mean and standard deviation from a technology-simulated sampling distribution to the theoretical sampling distribution. (6) Inference. The student applies the mathematical process standards to make inferences and justify conclusions from statistical studies. The student is expected to: (A) explain how a sample statistic and a SE/TE: 371-377, 379-380 confidence level are used in the construction of a confidence interval; (B) explain how changes in the sample size, confidence level, and standard deviation affect the margin of error of a confidence interval; SE/TE: 370-377, 382-385 (C) calculate a confidence interval for the mean of a normally distributed population with a known standard deviation; SE/TE: 427-430 (D) calculate a confidence interval for a population proportion; (E) interpret confidence intervals for a population parameter, including confidence intervals from media or statistical reports; SE/TE: 371-377, 381-385, 458-463 SE/TE: 378-386 (F) explain how a sample statistic provides evidence against a claim about a population parameter when using a hypothesis test; SE/TE: 397-400 (G) construct null and alternative hypothesis statements about a population parameter; SE/TE: 398-400 5
A Correlation of, (H) explain the meaning of the p-value in relation to the significance level in providing evidence to reject or fail to reject the null hypothesis in the context of the situation; (I) interpret the results of a hypothesis test using technology-generated results such as large sample tests for proportion, mean, difference between two proportions, and difference between two independent means; and SE/TE: 409-410, 431-432 SE/TE: 405, 413 (J) describe the potential impact of Type I and Type II Errors. SE/TE: 405-410 (7) Bivariate data. The student applies the mathematical process standards to analyze relationships among bivariate quantitative data. The student is expected to: (A) analyze scatterplots for patterns, SE/TE: 139-147, 155, 164-171, 192-199 linearity, outliers, and influential points; (B) transform a linear parent function to determine a line of best fit; (C) compare different linear models for the same set of data to determine best fit, including discussions about error; (D) compare different methods for determining best fit, including medianmedian and absolute value; SE/TE: 164-171, 174-176, 192-199 SE/TE: 164-171, 177-180, 192-199, 201-204, 205-206 SE/TE: 164-171, 192-196 (E) describe the relationship between influential points and lines of best fit using dynamic graphing technology; and SE/TE: 164-171, 176-177, 196-197 (F) identify and interpret the reasonableness of attributes of lines of best fit within the context, including slope and y- intercept. SE/TE: 164-171 6