STA 13

Elementary Statistics

Fall, 2009

Instructor : Debashis Paul

Office : 4222 MSB, Department of Statistics, Ph: (530) 564 0513
Email : debashis (at) wald (dot) ucdavis (dot) edu
Office Hours : MW 4:10-5:00 PM, or by appointment

Meeting times

Lectures : MWF 3:10-4:00 PM in Social Sciences 1100
Discussion : T 8:00-8:50 AM in Wellman 1, T 9:00-9:50 AM in Olson 205, T 3:10-4:00 PM in Olson 147, T 4:10-5:00 PM in Hutchison 115, T 5:10-6:00 PM in Hart 1130, T 6:10-7:00 PM in Hart 1130

**Teaching Assistants**
TA	Office	Email	Office hours
Jung Won Hyun	MSB 1117	jwhyun (at) ucdavis (dot) edu	W 4:10-5:00 PM
Wei-Shan Hsieh	MSB 1117	wshsieh (at) ucdavis (dot) edu	R 9:00-10:00 AM
Lu Wang	MSB 1117	luuwang (at) ucdavis (dot) edu	F 11:00 AM -12:00 Noon
Matt Yang	MSB 1117	matyang (at) ucdavis (dot) edu	MW 9:00-9:50 AM
Xiaoke Zhang	MSB 1117	xkzhang (at) ucdavis (dot) edu	WF 4:10-5:00 PM
Siyuan Zhou	MSB 1117	ucdzhou (at) ucdvais (at) edu	W 12:00-2:00 PM

Final Exam : December 9, from 8:00 to 10:00 AM in the lecture hall.

Text

A First Course in Statistics (10 Edition with MyStatLab) by J. T. McClave and T. Sincich

The package (which includes a text book AND an access kit) can be bought in the bookstore.

In order to register the course on line at www.coursecompass.com , you need the access kit AND the course ID (paul95797).

For detailed information about online registration, click here . This online system is used for homework assignments.

Topics

Data collection and graphical description of data
Numerical summary of data
Bivariate data
Probability : random experiment, probability distribution, conditional probability, Bayes theorem
Population Distributions : Binomial, Normal
Sampling Distributions : sample proportion, sample mean, large sample approximation
Estimation : point and interval estimates
Hypothesis tests for one and two sample problems
Linear regression and correlation

**Discussion Sessions**
Time	Classroom	TA
T 8:00-8:50 AM	Wellman 1	Siyuan Zhou
T 9:00-9:50 AM	Olson 205	Wei-Shan Hsieh
T 3:10-4:00 PM	Olson 147	Wei-Shan Hsieh
T 4:10-5:00 PM	Huthison 115	Jung Won Hyun
T 5:10-6:00 PM	Hart 1130	Xiaoke Zhang
T 6:10-7:00 PM	Hart 1130	Matt Yang

**Course Material**
Date	Lecture Notes	Material Covered	Homework	Due date
September 25	Lecture 1	Course outline and organization
September 28	Lecture 2	Data, Variables, Graphical summary of qualitative variables
September 30	Lecture 3	Graphical summary of quantitative variables : dot plot, stem-and-leaf plot, histogram
October 2	Lecture 4	Numerical summary of data; Measures of center - mean, median, mode	Homework 1	Friday, October 9
October 5	Lecture 5	Measures of dispersion; Range, Standard Deviation
October 7	Lecture 6	Chebyshev's theorem; Empirical rule for quantifying spread
October 9	Variance computation	Percentiles, Quantiles, Box plot	Homework 2	Friday, October 16
October 12	Lecture 7	Graphical and numerical measures for describing bivariate data; Correlation coefficient
October 14	Note on correlation and regression	Linear regression - properies
		Syllabus for Midterm 1 : The materials covered up to and including the lecture on October 14
October 16	Lecture 8	Introduction to probability theory - sample sapce, events	Homework 3	Friday, October 23
		Sample Midterm 1		Solution
October 19	Lecture 9	Calculus of probability; Multiplication Rule; Basics of combinatorics
October 21		Midterm 1 Solution
October 23	Lecture 10	Independence; Conditional probability	Homework 4	Friday, October 30
October 26		Multiplication rule for conditional probability
October 28	Lecture 11	Random variables; Probability Distributions; Expectation
October 30	Lecture 12	Binomial random variable	Homework 5	Friday, November 6
November 2	Lecture 13	Continuous probability distributions; Normal distribution
November 4	Lecture 14	Probability computations using Normal distribution; Assessing the appropriateness of normality assumption
November 6	Lecture 15	Assessing the appropriateness of normality assumption; Sampling distributions	Homework 6	Friday, November 16
November 9	Lecture 16	Sampling Distribution of Sample Mean; Central Limit Theorem
November 13		Application of Central Limit Theorem; Probability computation for sampling distribution of sample mean and sample proportion
		Sample Midterm 2		Solution
November 16	Lecture 17	Introduction to estimation of parameters
		Midterm 2		Solution
November 20		Margin of Error of point estimates	Homework 7	Tuesday, December 1
November 23	Lecture 18	Interval estimation; Large sample confidence intervals for population mean and population proportion

Debashis Paul