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Thread: Physics -- Part 2

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  1. #1

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    Frenzied Member System_Error's Avatar
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    Physics -- Part 2

    I have another quick question. It looks easy, but for some reason I just don't think I'm doing it right.

    Please check over this:

    "A kid throws a ball straight up into the air. The ball is caught 2.5 seconds later. "

    a) How high did the ball go (from its point of release)?
    b) What was the speed of the ball the moment before it was caught?





    The first thing that threw me off was no initial velocity was given... I assume it's 9.8 m/s?

    My solutions:

    a) x = .5(vi+vf)(t)
    x = .5(9.8)(2.5/2) = 6.125 m

    I divided the time since you can conside both the up and down direction symmetrical.

    I believe that is correct, but not sure about this b part:

    b) vf = vi + at
    vf = 9.8(2.5/2) = 12.25

    What do you do here when there is no initial velocity? Something just doesn't make since about this problem.





    The next question is this:

    "A rock is thrown downward from a bridge with a speed of 15 m/s. If the bridge is 50m above a river, how long will it take for the rock to hit the water?"

    My solution:

    x = vi(t) + .5a(t)^2

    -50 = 15t + .5(-9.8)t^2

    Solve as quadratic (after multiplying by negative one):

    4.9t^2-15t-50 = 0

    formula:

    t = 15 +- sqrt(15^2 - 4(4.9)(-50) )
    --------------------------------------
    9.8

    and you get: 5.07 seconds... Is that correct?




    Any help/clarity would be much appreciated.


    PS: These aren't homework questions. My teacher doesn't give homework and that means I have to do some serious studying to prepare for tests.

  2. #2
    PowerPoster eranga262154's Avatar
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    Wink Re: Physics -- Part 2

    Quote Originally Posted by System_Error
    I have another quick question. It looks easy, but for some reason I just don't think I'm doing it right.

    Please check over this:

    "A kid throws a ball straight up into the air. The ball is caught 2.5 seconds later. "

    a) How high did the ball go (from its point of release)?
    b) What was the speed of the ball the moment before it was caught?





    The first thing that threw me off was no initial velocity was given... I assume it's 9.8 m/s?

    My solutions:

    a) x = .5(vi+vf)(t)
    x = .5(9.8)(2.5/2) = 6.125 m

    I divided the time since you can conside both the up and down direction symmetrical.

    I believe that is correct, but not sure about this b part:

    b) vf = vi + at
    vf = 9.8(2.5/2) = 12.25

    What do you do here when there is no initial velocity? Something just doesn't make since about this problem.

    I think your first part is ok. That the time taken to go up and comming back to the same plase are same.

    I'll try to check the second part.

  3. #3
    PowerPoster eranga262154's Avatar
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    Re: Physics -- Part 2

    I think the second part should be like this. Please check it correct or not.

    I applied the equation to downwards,

    so,

    S = Ut + 0.5*f*(t^2)

    Since I put the equation to downwards,

    S = 50m (not -50m isn't it), U = 15m/s and f = 9.8m/s^2 ( not -9.8 isn't it)

    After sustitution you get the equation,

    9.8*t^2 + 30*t - 100 = 0

    Solve this,

    I got 2.01S,

  4. #4
    vbuggy krtxmrtz's Avatar
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    Re: Physics -- Part 2

    Quote Originally Posted by eranga262154
    I got 2.01S,
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  5. #5
    Frenzied Member zaza's Avatar
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    Re: Physics -- Part 2

    Incidentally, an important point to remember is that you can always resolve these equations into any given direction. As long as you makes sure that all the values you use are with reference to that particular direction (either positive or negative), then they will work. These equations are all basically equivalent - it just depends on the information you are given.

    So, for example, you were wondering about the initial speed of the ball.

    Using s=ut+0.5at^2 and resolving in the vertical direction, taking upwards to be the positive direction:

    u = (s - 0.5at^2)/t ...(rearranging the above)

    s = 0 m (because the ball ends up back where it started, in the boy's hands)
    a = -9.8 ms^-2 (because upwards is positive here)
    t = 2.5 s

    u = 0.5 * 9.8 * 2.5 = 12.25 ms^-1.

    This technique is important to remember, and will enable you to solve pretty much any such question.

    Another typical example is the cannonball question, fired at some angle. You can still resolve this vertically and horizontally - remembering that vertically s=0 and horizontally a=0 - to get all the rest of the parameters.



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    Last edited by zaza; Sep 2nd, 2006 at 09:34 AM.
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    Re: Physics -- Part 2

    Yeh... there are five useful formulas for projectile physics (Zaza stated 1) using the folowing:
    t = time (sec)
    s = distance (m)
    u = initial velocity (m/s)
    v = final velocity (m/s)
    a = acceleration (m/s/s)

    1. s/t = (u+v)/2
    2. v = u+at
    3. 2as = v^2-u^2
    4. s = vt - (1/2)at^2
    5. s = ut + (1/2)at^2

    These can be used and rearranged to find any of the values, there are just a few things to remember; you can always asume a = 9.8 m/s/s (depends on the question), ignoring wind resistance, the motion is usually symetrical (again depends on the equation) and therefore it is usually easier to split the motion in two, velocity and acceleration are vector quantities, meaning that they have a direction. That means if you throw something up, and gravity will be going in the opposite direction which also means that either velocity or acceleration will have a positive value, and the other will have a negative value (in your case the velocity would be positive and the acceleration would be negative).

    Thats about all I can think of.

    When you get horizontal movement as well as vertical movement it gets a bit more interesting. Just remember to split the equation into vertical and horizontal. also calculating the velocity from an angle (the sum of the vector velocity horizontal and vector velocity vetical). But I wont get into that.

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    vbuggy krtxmrtz's Avatar
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    Re: Physics -- Part 2

    To solve moving (point) object problems, the best thing to do is just learn Newton's second law, F = ma where F is the force, m the mass and a the acceleration (second time derivative of the position). Then it all amounts to know the force as a function of the position (which is often given), the velocity or whatever, and solve (integrate) the resulting differential equation whereby all formulae are derived.
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    Re: Physics -- Part 2

    The initial velocity can be calculated from its time in the air...

    If the ball was travelling at 9.8 ms when it was thrown then it would have been airborn for 2 seconds not 2.5. (ball goes up for 1 second and then falls for 1 second)

    Thus the initial (vertical) velocity was (2.5/2) * 9.8 = 12.25m/s

    (Dividing by 2 because its a round trip, throw up and fall down. the ball us under constant accelaration by gravity.)
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    type Woss is new Grumpy; wossname's Avatar
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    Re: Physics -- Part 2

    ps. assuming we are ignoring air resistance, the speed of the ball when it is caught is exactly the same as when it was thrown. since it takes gravity 1.25 seconds to bring the ball to a halt at the top of the trajectory, and then another 1.25 seconds for it to accelerate down back through the same distance before it hits the hand again.
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  10. #10
    vbuggy krtxmrtz's Avatar
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    Re: Physics -- Part 2

    Quote Originally Posted by wossname
    ps. assuming we are ignoring air resistance, the speed of the ball when it is caught is exactly the same as when it was thrown.
    That's right. If T = 2.5 s, then you can calculate the initial velocity from the fact that when the ball reaches its highest point its velocity is zero:

    0 = v = v0 + at = v0 - g(T/2)

    v0 = g(T/2) = 9.8 m/s2 x (2.5 s/2) = 12.25 m/s (this is the intial velocity and that just before the ball is caught, the answer to part b)

    As for the maximum height,

    h = v0t +(1/2)at2 = v0(T/2) -(1/2)g(T/2)2

    Rather than substitute the actual value for v0 we can use g(T/2):

    h = g(T/2)(T/2) -(1/2)g(T/2)2 = (1/2)g(T/2)2 = (1/2) 9.8 m/s2 (2.5 s / 2) = 7.66 m
    Lottery is a tax on people who are bad at maths
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  11. #11
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    Re: Physics -- Part 2

    Quote Originally Posted by System_Error
    The first thing that threw me off was no initial velocity was given... I assume it's 9.8 m/s?
    You cannot assume this...

    You can use the equation vi = vf + at to find the initial and final speed (which will be equal to each other). Since direction matters, vi = -vf, so:

    vi = -vi + at,

    vi + vi = at

    2vi = (9.8 x 2.5)

    vi = 12.25
    .

    You now have vi (and vf) so you can use x = vit + 0.5at2 to get the distance the ball travelled after 1.25 seconds. I get 7.66m.

  12. #12

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    Frenzied Member System_Error's Avatar
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    Re: Physics -- Part 2

    Thanks guys. I haven't had time to ask my teacher if he could look over anything, but I believe Dross' approach for the first problem is correct for part b.


    As for my second problem... I was completely wrong. This morning I worked it a different way and got the same answer as eranga.


    Thanks guys. The help is greatly appreciated!

  13. #13
    PowerPoster eranga262154's Avatar
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    Re: Physics -- Part 2

    or really,

    those people should Long Live
    “victory breeds hatred, the defeated live in pain; happily the peaceful live giving up victory and defeat” - Gautama Buddha

  14. #14
    vbuggy krtxmrtz's Avatar
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    Re: Physics -- Part 2

    Here are a few calculus quotes by famous people:

    I particularly like these 2:

    "For since the fabric of the universe is most perfect and the work of a most
    wise Creator, nothing at all takes place in the universe in which some rule
    of maximum or minimum does not appear."
    L. Euler

    "Everyone who understands the subject will agree that even the basis on
    which the scientific explanation of nature rests, is intelligible only to those
    who have learned at least the elements of the differential and integral calculus,
    as well as of analytical geometry."
    F. Klein
    Lottery is a tax on people who are bad at maths
    If only mosquitoes sucked fat instead of blood...
    To do is to be (Descartes). To be is to do (Sartre). To be do be do (Sinatra)

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