In this unit I learned about Newton’s 3rd Law and
all the things it can be applied to. Newton’s 3rd Law states that: every action has an equal and opposite reaction.
For example:
If an apple is at rest on a table, the apple pushes down on
the table, and the table pushes up on the apple.
This concept goes a long way in explaining why various
things work. If you have ever gone on a horse-drawn carriage ride, I am sure
you remember it being a fun, and almost magically unique experience. Well, it
is nearly magical how perfectly Newton’s 3rd Law fits into a horse
and buggy system. Without this law of physics, there would be no carriage
rides. You may be wondering how this works…
The horse and buggy pull on each other with equal and opposite
force- the horse pulling on the buggy alone does not cause the buggy to move.
They both, however, exert force on the ground. The horse pushes on the ground
with more force than the buggy so the ground pushes back on the horse with more
force than it pushes on the buggy; thus the horse and buggy move in the horse’s
direction.
This explanation applies to tug of war, and a plethora of
other real life situations.
I also learned about adding vectors. Using the horizontal
and vertical velocities of an object, you can find the actual velocity.
To predict accurately the direction of the actual velocity
vector, you use dotted lines that are parallel to the other vectors and the
arrow of the actual velocity should be drawn through the point where these intersect.
This can be used to find the direction of a boat when the velocity of a current
and the velocity of a paddle are taken into account. It can also be used to
explain why a box slides down a ramp.
The force of the box’s weight must be drawn straight down as
that is how gravity pulls it, and the support force of the ramp is drawn
perpendicular to the ramp itself. When the dotted lines are drawn parallel from
these vectors, a parallel line should be sketched out to show the net force on
the box, showing that the net force pulls the box down the ramp.
A similar concept is applied to tension. If a ball was hung
by two ropes, the force of the ball’s weight would be drawn as a vector
pointing down, then an equal and opposite vector would be drawn upwards from
the ball to show its net force. After drawing lines parallel to the ropes but
which intersect at the tip of the net force vector, you can draw (from the ball
to the point which these dotted lines intersect the ropes) arrows depicting the
force of tension on each rope. The longer arrow shows which rope has a greater
tension.
Thus far, I have talked a lot about force on the Earth.
However, force exists outside of our planet as well. Before considering this,
it is important to know that…
Force is directly proportional to mass: F ~ m
Force is inversely proportional to distance
squared: F ~ 1/d^2
With this in mind, we learned that there is a universal
gravitational force. The formula for this is:
F = G(m1xm2)/d^2
G is equal to (6.67 x 10)^-11. This equation helps us to
find the force of gravity between two object by using their masses (m1 and m2)
and dividing them by the distance between the objects squared. It is very important to square the distance.
Believe it or not, the tides of the ocean are actually connected
to this universal gravitational force. The Earth is so large that the distance
from one end of the ocean to the opposite is great enough for each of these
points to have a significant difference in their distance from the moon. This
difference in distance causes the tides. The moon’s gravity pulls the water
ever so slightly towards it, giving the Earth’s water an oblong shape in
reality. Due to this oblong shape, when it is high tide on the end of the Earth
closest to the moon, it is high tide on the opposite end farthest from the
moon. Likewise, it will be low tide at the top and bottom of the Earth at this
time.
If the moon pulls on point A with 25 N of force, pulls on B
with 5N of force, and pulls on the center of the Earth with 15N of force, how
does all this tide business work? Using simple math, we can see that 25-15= 10
N with which side A is pulled to the Earth. 5-15= -10N with which side B is
pulled to the moon. Like the forces addressed in Newton’s 3rd Law,
these forces are equal and opposite. Therefore the sides are pulled with the
same amount of force in opposite directions, causing the oblong shape and
corresponding tides.
It takes 24 hours for the Earth to rotate once; the length
of one day. There are 2 high tides and 2 low tides in every day- each tide
occurs about 6 hours apart. They change as the world spins and different part
of the world are closer to the moon. However, the moon moves as well. It takes
the moon about a month to complete its orbit around the Earth. Each month, it is
not in the exact same spot on the same days, which causes the tides to be a
little different every time, just as they are a little bit different every day
due to the imprecise and varying location of the moon from day to day. Since
the tides change and the moon’s location changes, there are Spring and Neap
tides at different times of the month. During Spring tide, the moon is either
new or full, being in a line with the Earth and the sun. At this time, the high
tides are higher than normal and the low tides are lower than normal. Low tide
during a Spring tide is a great time to go clamming. At Neap tide, the moon is
neither between the Earth and the sun nor on the other side of the planet in a
line from the sun. It is on either side of the Earth; “on top” or “beneath” the
planet. During Neap tides, the high tide is lower than normal and the low tide
is higher than normal.
You can use the universal gravitational force formula to
talk about tides, but you can also use it to find the force between planets.
You can find the pull between the Earth and the sun, and the Earth and the
moon, alike. The farther two objects are, the weaker the force is between them
because of the relationship force and distance share. However, the sun does not
have a weaker pull on the Earth than the moon does just because of their
distances from the planet. The sun’s mass is so much greater than the moon’s
that its force is greater nonetheless.
Next, I learned about momentum.
Momentum, or inertia in motion, is mass times velocity.
(p=mv)
Change in momentum is simply the final momentum of an object
minus its original momentum. (change in p = p final – p initial). It can also
be written as change in p = mv final – mv initial.
Momentum is also equal to impulse. Impulse is force times a
time interval (J= F x change in time)
All of this information may seem random when presented like
this, but answering one big question can bring it all together: why do airbags
keep us safe?
When a car crashes, it and you go from moving to not moving.
The change in momentum here is the same no matter how you are stopped because
your momentum is changed to zero since change in momentum = p final – p
initial. Change in momentum is equal to impulse (change in p = J), so the
impulse is also the same no matter how you are stopped. Since impulse equals
force times change in time (J = F x change in t), when the time of the impulse
is very long, the force is small, and vice versa. Thus, the airbag is soft and
takes a long time o stop your movement, so the force is less. The smaller the
force, the less you are injured. This is why airbags keep you safe.
This unit, my group made a podcast about momentum, impulse, and the relationship between the two. Here it is, hopefully it adds clarification to the concept:
According to Newton’s 3rd Law, in any collision,
all forces have an equal and opposite force. So what about momentum? If ball A
and ball B are headed towards each other and collide with equal and opposite
forces, the collision could be noted as F(A) = -F(B). J = F x change in t, so
F(A) x t = -F(B) x t, since they both experienced the force for the same amount
of time. This equation can be rewritten as J(A) = -J(B), which can then be
rewritten as change in p of A = - change in p of B (because J= change in p).
Change in p (A) – change in p (B) = 0, since they were equal. Therefore, this
system has no leftover or extra momentum. Momentum is conserved in systems,
meaning there is no net change in
momentum. Collisions like this can be examined using the equation p total before = p total after. This is
rewritten as M(a)V(a) + M(b)V(b) = M(a+b) x V(ab),
which presents the equation in a form to which you can plug in numbers (the
mass and velocities of two different objects). It is important to remember to
make one of the velocities negative since the objects are moving in opposite
directions before they collide. This equation is for objects that collide and
then stick together. It can be reversed to apply to objects that detach in the
interaction. If the objects do not stick together, the equation M(a)V(a) +
M(b)V(b) = M(a)V(a) + M(b)V(b) can be used. This is the most basic form of p total
before = p total after.
If an object bounces before it stops it undergoes two
changes in momentum: when it stops and when it starts moving again. Thus the
object has two impulses and therefore twice the force. Bouncing objects can be
more dangerous.
What I have found difficult about what I have studied is
separating the equations involving force from unit 2 and the equations
involving force from unit 3. F = ma seems like it should be used but it is not
relevant to this unit, so it has been a struggle to keep all the equations
straight in my head in correspondence with the proper concepts.
I overcame this difficulty by reviewing the material and
thinking more closely about what each concept was saying. This clarified the
connection between the information and the equation for me.
I put in a little less effort to the class after
Thanksgiving break; this is partially due to being sick and also because it is
hard to transition back into school after a longer break in the midst of the
end of the semester. I still continued to try and learn everything as
thoroughly as possible, though. I feel very confident about this material as it
makes sense to me and I understand the connections between the concepts
introduced in this unit. My confidence in my knowledge of physics this unit
helped me in all aspects of group collaboration these last few weeks. Whether
discussing with a partner, working together on a lab, or completing a group
project, I felt that I understood what was going on and was able to help others
understand a bit better as well.
My goal for next unit is to find more creative ways to
apply, present, and restate the information. This would help me to deeply learn
the information in a versatile way. It would also make studying more fun.
I thought that the most interesting part of this unit was
tides. I encounter them frequently enough, whenever I visit the beach they
affect my entire time there. The connection between natural disasters and tides
is especially interesting for me. Last fall, a very serious storm hit the
northeast. Hurricane Sandy caused tons of destruction, injury, and chaos. One
of the reasons it was such a bad storm was that it hut during Spring tide.
Using the high high tides of Spring tide, Sandy caused more damage than it
would have if it had hit during Neap or normal tides. This is just how nature
works, though. The seemingly placid day-to-day workings of the world can just
as easily turn events into drastic occurrences. I find this fascinating and I
love that I now know the scientific reasoning behind this. It is also
interesting to me how so much of our lives on Earth are affected by things
outside of the planet itself.
