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Integrated K‐12 STEM Education: Unpacking
the S, T, E and M in a Hands‐on Design Activity
Dr Bernardo A. Leόn de la Barra and Miss Sarah Lyden (School of Engineering and ICT, http://www.utas.edu.au/stem)
University of TasmaniaAustralia
24 May 2014
In this workshop, participants will be taken through the process of unpacking thescientific, technological, engineering, and mathematical concepts which are relevant tothe design and construction of a simple terrestrial vehicle built using low‐cost materials.
Ways on how to address the integration of trans‐disciplinary knowledge in the areas ofScience, Mathematics and Engineering in the context of this design task will beexplored. Participants will be able to identify the benefits of implementing this sort ofintegration in their own classroom settings.
The presentation will be pitched at the middle school grade levels (5 to 8) butsimplifications for earlier grades and extensions for later grades may also be outlined,respectively.
STEM Integration in K‐12 Education Video (3.5 min), March 2014
https://www.youtube.com/watch?v=AlPJ48simtE&feature=player_embedded
STEM Integration in K‐12 Education Report, March 2014
http://www.nap.edu/catalog.php?record_id=18612
The NGSS represent a commitment to integrate engineering design into the structure ofscience education by raising engineering design to the same level as scientific inquiry whenteaching science disciplines at all levels, from kindergarten to grade 12. There are bothpractical and inspirational reasons for including engineering design as an essential element ofscience education
It is anticipated that the insights gained and interests provoked from studying and engaging inthe practices of science and engineering during their K‐12 schooling should help students seehow science and engineering are instrumental in addressing major challenges that confrontsociety today, such as generating sufficient energy, preventing and treating diseases,maintaining supplies of clean water and food, and solving the problems of globalenvironmental change
Engineering Design in the Next Generation Science Standards (NGSS): Appendix I
http://www.nextgenscience.org/next‐generation‐science‐standards
Engineering Design in the Next Generation Science Standards (NGSS): Appendix I
Providing students a foundation in engineering design allows them to better engage in andaspire to solve the major societal and environmental challenges they will face in the decadesahead
In the K–12 context, “science” is generally taken to mean the traditional natural sciences:physics, chemistry, biology, and (more recently) earth, space, and environmental sciences
We use the term “engineering” in a very broad sense to mean any engagement in a systematicpractice of design to achieve solutions to particular human problems
Likewise, we broadly use the term “technology” to include all types of human‐made systemsand processes—not in the limited sense often used in schools that equates technology withmodern computational and communications devices. Technologies result when engineersapply their understanding of the natural world and of human behaviour to design ways tosatisfy human needs and wants
http://www.nextgenscience.org/next‐generation‐science‐standards
Interdependence of Science, Engineering and Technology Video [5.5 min](as explained by Paul Andersen, High School Science Teacher, Bozeman, USA)
https://www.youtube.com/watch?v=Be3G0IHO_4Y&list=PLllVwaZQkS2rtZG_L7ho89oFsaYL3kUWq
Engineering design process PD video series and educator guides http://www.nasa.gov/audience/foreducators/best/edp.html
“Understanding Car Crashes: It’s Basic Physics” Video [22 min], by Dr Griffith Jones
https://www.youtube.com/watch?v=yUpiV2I_IRI
“Understanding Car Crashes: When Physics Meets Biology” Video [24 min], by Dr Griffith Jones
https://www.youtube.com/watch?v=hi2FEyV2Z2E
http://education.ufl.edu/gjones/files/2013/04/teachers_guidePhysics.pdf
http://education.ufl.edu/gjones/
More Teaching Resources from Dr Griffith Jones’ Homepage at the College of Education, University of Florida
http://education.ufl.edu/gjones/files/2012/09/teachers_guideBioPhysics.pdf
“Understanding Car Crashes: When Physics Meets Biology” Teacher’s guide for grades 9‐12
“Understanding Car Crashes: It’s Basic Physics” Teacher’s guide for grades 9‐12
NSTA’s The Science Teacher, January 2013, pp. 32‐36
http://www.utas.edu.au/__data/assets/pdf_file/0020/358310/stem_program_links_with_australian_curriculum_04_feb_2013.pdf
The hands‐on car crashes activity that will be presented in this workshop has been linked to the Australian Curriculum: Mathematics and Science (version 4.0). Full mapping details are
available online in the following link
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Acceleration
Energy
Force
Friction
Gravity
Impulse
Inertia
Mass
Newton’s laws
Speed
Weight
Key Science Concepts
Angles (in a triangle)
Average
Cosine
Distance
Graph
Hypotenuse
Inclination
Measurement
Outliers
Right angle triangles
Key Mathematics ConceptsParallel and perpendicular
(force) components
Protractor
Pythagoras theorem
Sine
Slope
Speed
Stopwatch
Tangent
Vectors
Weight
Safety Cage
http://www.shattuckauto.com/Oakland‐Berkeley‐auto‐body‐blog/wp‐content/uploads/2012/10/Auto‐safety‐cage.jpg
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Integrated K-12 STEM Education: Unpacking
the S, T, E and M in a Hands-on Design
Activity
Worksheets and supporting materials
Dr Bernardo A. Leόn de la Barra and Miss Sarah Lyden (School of Engineering and ICT,
http://www.utas.edu.au/stem)
University of Tasmania
Australia
24 May 2014
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Egg-crash cars lesson plan (as used by the School of Engineering and ICT STEM Education and
Outreach Team)
TARGET GRADE LEVEL: 4 – 8 To cater for different age groups customise the theoretical focus.
KEY CONCEPTS: - Forces
- Newton’s Laws
- Engineering Design Process
LINKS TO AUSTRALIAN SCIENCE CURRICULUM: Foundation – (Physical Sciences) The way objects move depends on a variety of factors, including
their size and shape
Year 2 - (Physical Sciences) A push or a pull affects how an object moves or changes shape
Year 4 - (Physical Sciences) Forces can be exerted by one object on another through direct contact or
from a distance.
Year 7 - (Physical Sciences) Change to an object's motion is caused by unbalanced forces acting on
the object; Earth's gravity pulls objects towards the centre of the Earth
EQUIPMENT REQUIRED: - Crash Car Ramps & Brackets
- Crash Car Materials
- Eggs (Soft & Hard boiled)
- Balloon Car Materials for building a car/(egg enclosure)
- Example cars and Parachutes
- A big brick or something for the cars to crash into
- Stopwatch
- Glue guns
PREPARATION:
PRE-SESSION PREPARATION:
- Copy the chassis templates
- Ensure sufficient plastic wheels and axles are available
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SETUP AND ROOM ORIENTATION:
Get track set up off to the side where it won’t be in the way. Have example cars & parachutes ready
to show and all relevant car building equipment arranged on the desk at the front of the room. Setup
glue guns at the back of the room.
LESSON PLAN:
INTRODUCTION:
Ask the students what they know about forces. Put up the ideas they present on the whiteboard
and retain until the end of the session. Encourage students to present ideas and record all ideas on
the board.
A force is a push or pull on an object.
Rub your hands together. Do they get warm? Yes! This is because of the friction force.
Ask the students if they can think of any forces, in particular
o Pressure
o Gravity
o Friction
Pressure force – like a balloon – each side of the balloon is pushing in on the air inside the
balloon and forcing it out creating pressure forces.
Friction force – heat produced by two surfaces rubbing on each other. Friction turns kinetic
energy into heat energy.
Gravity force – the force of the earth pulling you in towards the centre.
Ask students what they know about engineering and engineers. Based upon their responses provide
a brief introduction to engineering. Explain that engineers design things to make our lives easier.
Explain the types of engineering that we are involved in. Tell the students that today they are going
to be engineers.
SESSION ACTIVITIES:
PART 1: EGG CRASH CARS
BUILDING THE CAR:
1. Tell the students that today we are going to make a vehicle that will be traveling down a
steep incline. (Indicate the ramp at the back of the room) Their job as engineers today is to
design and construct a car that will protect an egg when travelling down the incline.
2. Ask students to identify some of the safety features in cars that save people in crashes –
such as seatbelts, airbags, crumple zones, etc. (We will be looking at these things in more
detail as the session progresses)
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3. Provide students with the simple templates and get them to get out and construct their car.
If they complete this quickly encourage them to decorate as they go. Also provide them
with 2 green axles and four white wheels to attach to their car at this stage.
THE ENGINEERING DESIGN PROCESS:
1. Explain to students that what we will be doing today will be using some of the steps of the
engineering design process.
2. Draw the engineering design process up on the board and explain to students that we have
identified the problem – protecting the egg and we now need to brainstorm, design, build
and test our solutions.
THE DESIGN CHALLENGE:
1. Tell students that the rules of the design challenge today are:
a. They can use any material that they can find/we can provide them with
b. Wheels must roll, and not slide down the track
c. We need to be able to easily check the egg at the end of the track and remove it
d. Once the car starts down the track you can’t touch or correct its path
2. Ask students to design what they want to do with the car on a piece of paper first then
collect equipment to complete this. Give students approximately 30 – 40 minutes to
complete this task.
TESTING THE CARS:
1. Gather all students around the testing ramp. Test each car going down the ramp. Only
place an egg in each car just before it is going down the ramp and instructors are the only
people to handle the eggs.
2. Record how many eggs break.
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UNDERSTANDING THE MOVEMENT OF THE CARS:
1. Get students to return to the tables and discuss some of the things that worked well and
why. Also get them to identify the forces acting on the car.
Important concepts to convey:
− Concept of force due to gravity and how it generates acceleration down an incline.
The driving force comes from gravity.
− Concept of inertia: an object’s ability to resist a change in linear or angular velocity.
This is the reason we need to wear seatbelts!
2. Newton’s laws: Who has heard of a very famous person called Sir Isaac Newton? He has
three laws which are known all around the world.
• 1) Nothing will happen to an object until a force is acting on it.
• 2) F = ma: [we can talk about this in respect to gravity and propulsion]
• 3) every action has an equal and opposite reaction
3. For older students and more advanced groups consider the force diagram below:
4. Ask the students if they know what energy is.
Energy (comes from Greek) is a physical quantity that describes the amount of work that can be
performed by a force. For instance, if you lift something up then you are doing work, so the object
will gain energy. This is called potential energy. When something is moving it also has energy. This
is called kinetic energy. Other forms of energy are things like sound, heat, etc. Remind them that
energy is only ever converted it is not created or destroyed.
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5. Ask the students what energy changes they think are taking place as the car travels down
the ramp. Draw a picture up on the board and indicate energy changes as the car moves
down.
Basically, the energy change is from potential to kinetic to sound and heat (when the car stops).
Include more detail for older students.
IMPROVING THE CARS:
1. Return to the engineering design process and explain to students that we are now up to the
redesign stage. Engineers may redesign a solution many times until they find the best
solution.
2. Explain that this time we will have a steeper incline and go from a higher point up the ramp,
so everyone will probably need to make some modifications to their car to protect the egg.
Also as an added challenge say that if none of the eggs break going down the track then we
will run an egg down by itself so that they can see what happens.
3. Give students 10 – 20 minutes to redesign.
TESTING THE CARS AGAIN:
1. Once again gather all students around the testing ramp. Test each car going down the ramp.
Only place an egg in each car just before it is going down the ramp and instructors are the
only people to handle the eggs.
2. Record how many eggs break. If no eggs break put a single egg down the ramp by itself to
show the students what happens.
CONCLUDE ACTIVITY:
1. Return to desks and get students to explain what was happening with the cars and the ideas
that worked well. Get them to explain to us what forces are and what energy changes were
taking place. Ask if they have any further questions about their cars, forces, inertia, energy,
etc.
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Links with the Australian Mathematics Curriculum:
Foundation:
Measurement and Geometry
Location and Transformation
o Describe Position and Movement
Year 1:
Measurement and Geometry
Using units of measurement:
o Measure and compare the lengths and capacities of pairs of objects using uniform
information units
Shape:
o Recognise and classify familiar two-dimensional shapes and three-dimensional
objects using obvious features
Year 2:
Measurement and Geometry
Using units of measurement:
o Compare and order several shapes and objects based on length, area, volume and
capacity using appropriate uniform informal units
o Compare masses of objects using balance scales
Shape:
o Describe and draw two-dimensional shapes, with and without digital technologies
o Describe the features of three-dimensional objects
Statistics and Probability
Data representation and interpretation:
o Identify a question of interest based on one categorical variable. Gather data
relevant to the question
o Collect, check and classify data
o Create displays of data using lists, table and picture graphs and interpret them
Year 3:
Measurement and Geometry
Using units of Measurement:
o Measure, order and compare objects using familiar metric units of length, mass and
capacity
Shape:
o Make models of three-dimensional objects and describe key features
Location and Transformation:
o Identify symmetry in the environment
Geometric Reasoning:
o Identify angles as measures of turn and compare angle sizes in everyday situations
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Statistics and Probability
Data Representation and interpretation:
o Identify questions or issues for categorical variables. Identify data sources and plan
methods of data collection and recording
o Collect data, organise into categories and create displays using lists, tables, picture
graphs and simple column graphs, with and without the use of digital technologies
o Interpret and compare data displays
Year 4:
Measurement and Geometry
Using units of Measurement:
o Use scaled instruments to measure and compare lengths, masses, capacities and
temperatures
o Compare objects using familiar metric units of area and volume
Shape:
o Compare the areas of regular and irregular shapes by informal means
Geometric reasoning:
o Compare angles and classify them as equal to, greater than or less than a right angle
Statistics and Probability
Data representation and interpretation:
o Select and trial methods for data collection, including survey questions and recording
sheets
o Construct suitable data displays with and without the use of digital technologies,
from given or collected data. Include tables, column graphs and picture graphs
where one picture can represent many data values
o Evaluate the effectiveness of different displays in illustrating data features including
variability
Year 5:
Measurement and Geometry
Using units of Measurement:
o Choose appropriate units of measurement for length, area, volume, capacity and
mass
o Calculate the perimeter and area of rectangles using familiar metric units
Shape:
o Connect three-dimensional objects with their nets and other two-dimensional
representations
Geometric Reasoning:
o Estimate, measure and compare angles using degrees. Construct angles using a
protractor
Statistics and Probability
Data representation and interpretation:
o Pose questions and collect categorical or numerical data by observation or survey
o Construct displays, including column graphs, dot plots and tables, appropriate for
data type, with and without the use of digital technologies
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o Describe and interpret different data sets in context
Year 6:
Measurement and Geometry
Using units of Measurement:
o Solve problems involving the comparison of lengths and areas using appropriate units
Geometric Reasoning:
o Investigate, with and without digital technologies, angles on a straight line, angles at
a point and vertically opposite angles. Use results to find unknown angles
Statistics and Probability
Data representation and interpretation:
o Interpret and compare a range of data displays, including side-by-side column graphs
for two categorical variables
Year 7:
Measurement and Geometry
Shape:
o Draw different views of prisms and solids formed from combination of prisms
Statistics and Probability
Data representation and interpretation:
o Calculate mean, median, mode and range for sets of data. Interpret these statistics in
the context of data.
o Describe and interpret data displays using median, mean and range
Year 8:
Statistics and Probability
Data representation and interpretation:
o Investigate techniques for collecting data, including census, sampling and observation
o Investigate the effect of individual data values, including outliers, on the mean and
median
Year 9:
Number and Algebra
Linear and non-linear relationships:
o Graph simple non-linear relations with and without the use of digital technologies
and solve simple related problems
Measurement and Geometry
Pythagoras and trigonometry:
o Investigate Pythagoras’ theorem and its application to solving simple problems
involving right angled triangles
o Use similarity to investigate the constancy of the sine, cosine and tangent ratios for a
given angle in right-angled triangles
o Apply trigonometry to solve right-angled triangle problems
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Year 10:
Number and Algebra
Linear and non-linear relationships:
o Solve problems involving linear equations, including those derived from formulas
o Explore the connection between algebraic and graphical representations of relations
such as simple quadratics, circles and exponentials using digital technology as
appropriate
Measurement and Geometry
Pythagoras and trigonometry:
o Solve right-angled triangle problems including those involving direction and angles of
elevation and depression
Statistics and Probability
Data representation and interpretation
o Use scatter plots to investigate and comment on relationships between two
numerical variables