This article describes the use of regression in middle school grades and Algebra 1 settings to connect algebraic functions to real-world contexts. It is suggested that using data sets will intrigue and motivate students.
This article describes the use of regression in middle school grades and Algebra 1 settings to connect algebraic functions to real-world contexts. It is suggested that using data sets will intrigue and motivate students.
This article examines two essential questions in making a good model from data - describing the pattern of variation and explaining the proportion of the variation by using functions.
The purpose of this article is to document the efforts of an ongoing collaboration between a cohort of middle school mathematics teachers and a university professor in defining statistics instruction for students. In the process, our goals for statistics instruction changed from that of creating the correct graph or calculation of measures of center to that of answering the meaningful questions on the basis of the exploration of trends and patterns in data.
In this article, we describe how middle and high school teachers and students analyze data using TinkerPlots, especially in how they express and support their analyses, and the conceptual issues about data and distributions that their explorations illuminate.
This article describes how graphing calculators can help make statistical concepts more accessible and understandable through the use of simulations. Examples of simulations are given on the Law of Large Numbers, Normal Probability Plots, Central Limit Theorem, Confidence Intervals, and Significance Testing.
This article describes a learning environment used in a college preparatory high school class which incorporated investigative lab activities.
This article presents several activities and programs for a graphing calculator that can help students deal with misconceptions about expecting short runs to reflect closely the theoretical probability or the long-term behavior.
This article explores the complementarity of statistical reasoning and mathematical thinking in the mathematical sciences. The difference between the two is illustrated by critically examining some items used to test students' understanding in data analysis and statistics.
This article highlights some of the differences between statistics and mathematics and suggests some implications of these differences for teachers and students. Our aim is to provoke thought and to presents ideas that will guide classroom practice.
This article describes a collaborative effort at the university level between statisticians and mathematics educators as well as two initiatives of the American Statistical Association (ASA): Statistics Teacher Education: Assessment, Methods, Strategies (TEAMS) conference, and Guidelines in Assessment and Instruction for Statistical Education (GAISE).