dr. sy-bor wen, assistant professor department of mechanical engineering texas a&m university
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Dr. Sy-Bor Wen, Assistant ProfessorDepartment of Mechanical Engineering
Texas A&M University
James MilenderDel Rio High School
San Felipe-Del Rio C.I.S.D.
Generation of Core/Shell Nanoparticles with Two Pulsed Lasers
Germanium target struck first to create plasma plume
Germanium plasma condenses into Germanium nanoparticles
Copper target is then struck to create a copper plasma plume.
Copper condenses around Germanium nanoparticles to create Ge/Cu Core/Shell nanoparticles
Overview of the Summer Research Project
Initial Idea for Classroom Project
Lasers!Energy beaming ??
http://www.eads.com/1024/en/madebyeads/protection/solar_energy_by_laser.html
Possible Out of budgetNot safe for high school classroom
Laser Energy Beaming
http://www.electricstuff.co.uk/scarylaser.gif
Also possible!
Within Budget!
Safe for classroom use!
Energy Beaming with Spotlight
Many countries are currently designing vehicles that used beamed light in the form of
lasers as their energy source. Some countries are developing methods to beam energy from orbiting satellites to cities on
Earth.
Design a solar powered car that will use beamed light as its power
source.
The Project – Energy Beaming
Using energy in the form of light to accomplish a task.
Core Element of Research Project Bridged into Classroom Project
The student will describe functional relationships in a variety of ways.(A.1) Foundations for functions. The student understands that a function
represents a dependence of one quantity on another and can be described in a variety of ways. The student is expected to
(A) describe independent and dependent quantities in functional relationships;
(B) [gather and record data and] use data sets to determine functional relationships between quantities;
(C) describe functional relationships for given problem situations and write equations or inequalities to answer questions arising from the situations;
(D) represent relationships among quantities using [concrete] models, tables, graphs, diagrams, verbal descriptions, equations, and inequalities; and
(E) interpret and make decisions, predictions, and critical judgments from functional relationships
TAKS Objective 1
Exit Level TAKS Mathematics Information Booklet, March 2007
The student will demonstrate an understanding of the properties and attributes of functions.
(A.2) Foundations for functions. The student uses the properties and attributes of functions. The student is expected to
(B) identify mathematical domains and ranges and determine reasonable domain and range values for given situations, both continuous and discrete;
(C) interpret situations in terms of given graphs [or create situations that fit given graphs];and
(D) [collect and] organize data, [make and] interpret scatterplots (including recognizing positive, negative, or no correlation for data approximating linear situations), and model, predict, and make decisions and critical judgments in problem situations.
TAKS Objective 2
Exit Level TAKS Mathematics Information Booklet, March 2007
The student will demonstrate an understanding of the properties and attributes of functions.
(A.3) Foundations for functions. The student understands how algebra can be used to express generalizations and recognizes and uses the power of symbols to represent situations. The student is expected to
(A) use symbols to represent unknowns and variables; and
(B) look for patterns and represent generalizations algebraically.
TAKS Objective 2
Exit Level TAKS Mathematics Information Booklet, March 2007
The student will demonstrate an understanding of linear functions.(A.5) Linear functions. The student understands that linear functions can be represented
in different ways and translates among their various representations. The student is expected to
(A) determine whether or not given situations can be represented by linear functions; and
(C) use, translate, and make connections among algebraic, tabular, graphical, or verbaldescriptions of linear functions.
(A.6) Linear functions. The student understands the meaning of the slope and intercepts of thegraphs of linear functions and zeros of linear functions and interprets and describes theeffects of changes in parameters of linear functions in real-world and mathematicalsituations. The student is expected to
(A) develop the concept of slope as rate of change and determine slopes from graphs, tables,and algebraic representations;
(B) interpret the meaning of slope and intercepts in situations using data, symbolicrepresentations, or graphs;
TAKS Objective 3
Exit Level TAKS Mathematics Information Booklet, March 2007
TAKS Objective 4The student will formulate and use linear equations and
inequalities.(A.7) Linear functions. The student formulates equations and
inequalities based on linear functions, uses a variety of methods to solve them, and analyzes the solutions in terms of the situation. The student is expected to
(A) analyze situations involving linear functions and formulate linear equations or inequalities to solve problems;
(B) investigate methods for solving linear equations and inequalities using [concrete] models, graphs, and the properties of equality, select a method, and solve the equations and inequalities; and
(C) interpret and determine the reasonableness of solutions to linear equations and inequalities.
Exit Level TAKS Mathematics Information Booklet, March 2007
TAKS Objective 5The student will demonstrate an
understanding of quadratic and other nonlinear functions.
(A.11) Quadratic and other nonlinear functions. The student understands there are situations modeled by functions that are neither linear nor quadratic and models the situations. The student is expected to
(A) use [patterns to generate] the laws of exponents and apply them in problem-solving situations.
Exit Level TAKS Mathematics Information Booklet, March 2007
TAKS Objective 10The student will demonstrate an understanding of the
mathematical processes and tools used in problem solving.(8.14) Underlying processes and mathematical tools. The
student applies Grade 8 mathematics to solve problems connected to everyday experiences, investigations in other disciplines, and activities in and outside of school. The student is expected to
(A) identify and apply mathematics to everyday experiences, to activities in and outside of school, with other disciplines, and with other mathematical topics;
(B) use a problem-solving model that incorporates understanding the problem, making a plan, carrying out the plan, and evaluating the solution for reasonableness;
Exit Level TAKS Mathematics Information Booklet, March 2007
TAKS Objective 10The student will demonstrate an understanding of the
mathematical processes and tools used in problem solving.(8.15) Underlying processes and mathematical tools. The student
communicates about Grade 8 mathematics through informal and mathematical language, representations, and models. The student is expected to
(A) communicate mathematical ideas using language, efficient tools, appropriate units, and graphical, numerical, physical, or algebraic mathematical models.
(8.16) Underlying processes and mathematical tools. The student uses logical reasoning to make conjectures and verify conclusions. The student is expected to
(A) make conjectures from patterns or sets of examples and nonexamples;
Exit Level TAKS Mathematics Information Booklet, March 2007
Algebra II TEKSAlgebra II 11.33
(1) Foundations for functions. The student uses properties and attributes of functions and applies functions to problem situations. The student is expected to:
(A) identify the mathematical domains and ranges of functions and determine reasonable domain and range values for continuous and discrete situations; and
(B) collect and organize data, make and interpret scatterplots, fit the graph of a function to the
data, interpret the results, and proceed to model, predict, and make decisions and critical judgments.
Texas Administrative Code (TAC), Title 19, Part II Chapter 111.33
The project will be done at the beginning of the second six weeks of the school year after the review of real number properties; simplifying and solving linear equations and inequalities; relations and functions; graphing linear equations; finding slope; writing equations of lines; parallel and perpendicular lines; direct variation; scatterplots; correlation; and regression curves.
Project Insertion Into Curriculm
Classroom Project ScheduleDay 1 Day 2 Day 3 Day 4
Pretest.Lecture on Lasers, Power Beaming, & Engineers.Project Announcement.
Internet Information Search for Project.
Group assignments.Presentation of project materials.Initial solar car design on paper.
Continue design of solar cars.
Classroom LibraryComputers
Classroom Classroom
Classroom Project ScheduleDay 5 Day 6 Day 7 Day 8
Solar Car Construction.
Solar Car Construction (Day 2).
Solar Car Trials .Measurements .
Post Test.JAXA Lecture.
Classroom Classroom Classroom Classroom
Assorted lengths of balsa wood (Spars, 3 inch and 4 inch wide sheets)
Small hobby wheels or students make their own out of balsa wood
.032 inch wire and aluminum tubing for axlesTape, glue, scissors, Exacto knife, and rubber
bandsPre-assembled solar panel with solar rated
electric motor TI84Plus calculator with CBLII and Ranger or
CBRIISpotlight (100 Watt)
Materials for Project
Solar Car Trials And Measurements
http://education.ti.com/educationportal/sites/US/productHome/us_product.html
Student groups will use TI84Plus and Ranger technology to measure the car’s position vs. time
Student groups will use TI84Plus, CBL, and Light Sensor to measure light intensity at 6 inch intervals along the car’s route
Student groups will construct scatter plots with reasonable domain and range , calculate speed over different intervals, and fit a function to their scatter plot.
Student groups will make connections between speed and light intensity
Project Goals & Products
Pre and Post Test will be the same test20 Questions Covering the Following:
Engineering and lasersScatterplotsSlopeCorrelationCorrelation CoefficientRegression Curves
Pre and Post Testing
Dr. Sy-Bor Wen, Assistant ProfessorYoung Kyong Jo, Ph. D. StudentTexas A&M UniversityDwight Look College of EngineeringNational Science FoundationE3 Program CoordinatorsE3 ParticipantsMy wife for encouraging me to apply for E3
Acknowledgements