problem solving day: geometry, movement, and free-fall....0t + ½ at2 1 2 3 a.m m/s m/s2 b.m m m/s...
TRANSCRIPT
Problem Solving Day: Geometry, movement,
and Free-fall.
Test schedule
• First mid-term in 2 weeks! 7-10PM; Feb 8, Eiesland Hall.
• Review and practice a little each day!!!
• EMAIL ME THIS WEEK if you have class or athletic conflicts. For other conflicts, please note rules on the syllabus!
• Topics: Chapters 1—3 including:• Units, conversion, and
estimation.• Horizontal kinematics and
free-fall.• Graphing x, v, and a vs. time• Projectile motion (we’ll study
it this week).
Last year’s equation sheet included with exam.
Understanding problem solving and PRACTICE are really what are going to help you do well. Make sure you practice a little
every day and sort out your misunderstandings:
you won’t do well if you wait then cram.
Your equation sheet for your test will look similar if not the same.Problem solving procedure, and PRACTICE are really what are going to help you. Make sure you practice a little every day and sort out your misunderstandings: you won’t do well if you wait then cram.
SOH CAH TOA!For right triangles…
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θs oh
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
hac
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
soh
cah
toa
Opposite
Adjacent
Hypotenuse
θ
Pythagorean Theoremc = hypotenusea2 + b2 = c2
Geometry crash-reminder in one slide. This should NOT be news to you! If any of this is news to you, please do some major brushing up on this before friday.
SOH CAH TOA!For right triangles…
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θs oh
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
hac
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
soh
cah
toa
Opposite
Adjacent
Hypotenuse
θ
Pythagorean Theoremc = hypotenusea2 + b2 = c2
Geometry crash-reminder in one slide. This should NOT be news to you! If any of this is news to you, please do some major brushing up on this before friday.
SOH CAH TOA!For right triangles…
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θs oh
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
hac
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
soh
cah
toa
Opposite
Adjacent
Hypotenuse
θ
Pythagorean Theoremc = hypotenusea2 + b2 = c2
Geometry crash-reminder in one slide. This should NOT be news to you! If any of this is news to you, please do some major brushing up on this before friday.
SOH CAH TOA!For right triangles…
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θs oh
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
hac
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
soh
cah
toa
Opposite
Adjacent
Hypotenuse
θ
Pythagorean Theoremc = hypotenusea2 + b2 = c2
Geometry crash-reminder in one slide. This should NOT be news to you! If any of this is news to you, please do some major brushing up on this before friday.
SOH CAH TOA!For right triangles…
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θs oh
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
hac
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
soh
cah
toa
Opposite
Adjacent
Hypotenuse
θ
Pythagorean Theoremc = hypotenusea2 + b2 = c2
Geometry crash-reminder in one slide. This should NOT be news to you! If any of this is news to you, please do some major brushing up on this before friday.
You’re in Paris, far away from the Eiffel tower. Your friends want to walk to the tower. You know it is 300m tall, and it appears to have
an angular size of ~20 degrees. You want to impress your friends by telling them how far it is, so you remember Physics 101.1 and whip
out your calculator. About how far is the Eiffel Tower?
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θs oh
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
hac
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
θ
A. 110 mB. 800 mC. 1100 mD. 5 kmQ11
No talking please!
I’d like to know how many of you struggle with trig so please don’t talk.Answer: B
Example: Surveying the River (speak to your neighbor)
100 m
river
A surveyor wants to measure the distance across a river. Starting directly across from a big tree on the
opposite bank, he walks 100 m along the riverbank to establish a baseline. Then, he sights across to the tree. The angle from his baseline to the tree is 35 degrees.
How wide is the river? Draw a picture.
Q12
A. 1 mB. 20 mC. 70 m D. 100 m
E. 1 kmAnswer: C For those who didn’t get this, please please practice and review trig!
You can easily measure the size of anything you know the distance to!
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
θ
Physics Life Hack!
Your hand at arm’s length gives excellent indicator of angular size!
θ =
D
h
Here’s an old astronomy trick.The ceiling.Rock wall you want to climb.Empire state building.Height of the big plant you’re hoping will fit in your living room.
You can easily measure the size of anything you know the distance to!
Your hand at arm’s length gives excellent indicator of angular size!
adjacentoppositetan
hypotenuseadjacentcos
hypotenuseoppositesin
=
=
=
θ
θ
θ
t oa
θ
D
hTry this when you go home tonight:
estimate the size of something in town or in your room.
Try it out!
Let’s solve problems!• We’ll breeze through the topics we’ve covered
• For practice and diagnosis :).
• No chatting please.
1. Dimensional analysis, unit conversion.
2. Estimation.3. Graphing.4. “Multi-phase” problems.
Now we’ll go through some practice problems to remind you what you’ll need to know.
Dimensional analysis
Δx = v0t + ½ at21 2 3
A. m m/s m/s2
B. m m m/sC. All are m/sD. All are meters
1 2 3
Q13
What are the SI units of each piece of this equation?
Answer: D.If you’re having trouble with this, please think about what each quantity means, and what units it should have! Also practice treating units as a variable to cancel them out.
Unit conversion
A. 1.0B. 3.28C. 91.44D. 328.0E. 64.6
Q14
How many cm are in 3 feet?
1 m = 3.28 ft
Answer: C
Estimation: Humans to the Moon
The moon is about 2.4 x 105 miles from Earth. If you stacked up adult humans, each standing
on the next one’s head, estimate how many would you need to stack to reach the Moon.
1 mile = 1604 m
A. 100 peopleB. 105 peopleC. 108 peopleD. 1010 peopleE. 1012 peopleQ15
Answer: C
Graphing
Q16
A driver is traveling west. She comes to a stop at a stop sign and then continues traveling in the same direction. If the positive direction is taken
to be east, which velocity vs. time graph could describes this motion?
Answer: A.Practice this by building your intuition, drawing, and conceptual thinking skills for what x, v, and a mean. For instance: - Try to graph different motions you see. - Make flash cards based on my slides from the graphing lectureWhatever suits your learning style!
Multi-stage problems• Make a plan.
• Identify important EVENTS and INFORMATION.
• What variables do you need to deal with?
• What is actually being asked?
• Follow problem-solving strategies for each part of the problem!
Multi-stage problems• Make a plan.
• Identify important EVENTS and INFORMATION.
• What variables do you need to deal with?
• Kinematics: always x, v, a, t
• What is actually being asked?
• Follow problem-solving strategies for each part of the problem!
Kinematics there are only a few things we are really dealing with. If you’re getting stuck, write these down (x,v,a,t) for each important phase of the problem!
A jogger running at 6 mph drops her keys, and then comes to a stop within 2 seconds. She then walks back to get her keys. How far does she need to walk back to get the keys [assume
constant acceleration]?
Practice your tips:1. Identify important parts and information.2. Draw it.3. Make axes.4. KNOWNS and UNKNOWNS.5. Pick the right formula.
Find solution on my website!
Practice Resources
• Book: odd numbered problems have answers in the back!
• Office hours
• T.A. office hours.
http://sarahspolaor.faculty.wvu.edu/home/physics-101/practice-problems