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Motion. The basic description of motion is how location (position) changes with time. We call this velocity . Is velocity a vector ? (Does it have magnitude and direction?) YES ! v = (x,y) / t where the sign means “ change in ”, or “ final minus initial ”. Velocity.
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Motion The basic description of motion is how location (position) changes with time. We call this velocity. Is velocity a vector? (Does it have magnitude and direction?) YES! v = (x,y) / t where the sign means “change in”, or “final minus initial” .
Velocity Now the question becomes: how do you divide a vector by a scalar? Since multiplication is simply multiple additions (3*2 means 2+2+2), and since we can add vectors nicely in rectangular form (add the components), we should be able to multiply a vector by a scalar by just multiplying the vector’s components by the scalar.
Velocity And since division is simply the inverse of multiplication, we can divide a vector by a scalar by just dividing the components of the vector by the scalar. Hence v = (vx , vy) = (x,y) / t, and vx = x/ t and vy = y / t .
Velocity • Note that the MKS units of velocity are m/s. • This definition of velocity indicates that position changes over time. This is really, then, a calculation of an AVERAGE VELOCITY. • Is there such a thing as an INSTANTANEOUS VELOCITY?
Velocity According to the calculus, in the limit as t approaches zero (and so (x,y) also approaches zero), the expression vx-avg = x / t becomes vx = dx/dt where x is a function of t. This is the mathematical way of saying we do have a way of finding instantaneous velocity!
Average versus Instantaneous,Discrete versus Continuous,Values versus Functions When dealing with discrete values, we can find values for averages. vx-avg = x / t . In dealing with the continuous case, we use functions. When you take the derivative of a function, you get a function. This means that x(t)[this means that x is a function of t] and so v(t)[v is a function of t]in the instantaneous case.
Acceleration But velocity is not the whole story of motion. Sometimes (often) we are interested in how the velocity changes with time! This leads to the notion of ACCELERATION: a = (ax , ay) = (vx,vy) / t and ax-avg = vx/ t , and ax = dvx/dt . Note that acceleration is a vector (it has components, it has magnitude and direction, we have to work in rectangular components). Note that the units of acceleration are (m/s) / s or more commonly: m/s2 . Question: what is a square s (s2) ?
Where do we stop? • Is there a name for the change of acceleration with time? • Why haven’t most people heard of it, when most people have heard of velocity and of acceleration?
Jerk! • To answer the first question, the change in acceleration with respect to time is called Jerk! jx = ax/Dt . • To answer the second question, the reason most people have not heard of jerk is because it is not normally useful. This is due to reasons we’ll see in Part II of the course.
Signs (+ or -) for position Position: Usually we have some reference point that we call zero position. For horizontal positions, plus usually means to the right, and minus means to the left. For vertical positions, plus usually means above (up) and minus means below (down). Warning: these are only the usual conventions; they can be reversed if that is more convenient.
Signs (+ or -) for velocity For horizontal motion, moving to the right usually means a positive velocity component, and moving to the left means a negative velocity component. For vertical motion, moving up usually means a positive velocity component, and moving down means a negative velocity component. Warning:if the usual conventions for position are switched, then the sign conventions for the velocity will also be switched. For example, if down is called a positive position, then moving down will be considered a positive velocity. Note: we can have a positive position with either a positive or negative velocity, and we can have a negative position with either a positive or negative velocity.
Signs (+ or -) for Acceleration If the velocity is increasing in the positive direction, the acceleration is positive, and if the velocity is decreasing in the positive direction, the acceleration is negative. Warning: the case of negative velocities is more tricky & counter-intuitive! If the velocity is becoming more negative (going faster in the negative direction), the acceleration is negative, and if the velocity is becoming less negative (getting slower in the negative direction), the acceleration is positive.
Signs (+ and -) for AccelerationLanguage problems in the vertical If we are going faster in the up direction, we say we are speeding up (and going up). No problem. Is this acceleration positive or negative? If we are going slower in the up direction, we say we are slowing down (but going up). See the language problem? Is this acceleration positive or negative? If we are going faster in the down direction, we say we are speeding up (but going down). See the language problem here? Is this acceleration + or - ? If we are going slower in the down direction, we say we are slowing down (and going down). Is this acceleration + or - ?
Signs (+ and -) for AccelerationLanguage problems in the vertical If we are going faster in the up direction, we say we are speeding up (and going up). No problem. This acceleration is positive. If we are going slower in the up direction, we say we are slowing down (but going up). See the language problem? This acceleration is negative. Warning: these next two are counter-intuitive: If we are going faster in the down direction, we say we are speeding up (but going down). See the language problem here? This acceleration is negative. If we are going slower in the down direction, we say we are slowing down (and going down). This acceleration is positive .
Motion We now have two useful definitions (relations): vx-avg = x / t , or vx(t) = dx(t)/dt ax-avg = vx/ t , or ax(t) = dvx(t)/dt . If we know position and time, we can calculate velocity; if we know velocity and time, we can calculate acceleration.
Discrete Case - an example Given the following data, find vx and ax: x(in meters) at t(in seconds) -2 0 +10.5 +61 +41.5 02 can you picture this?
Discrete case: a picture Note: the time (Δt) for each arrow (which is the change in position, Δx) is 0.5 seconds.-2 m 0 sec 1 m 0.5 sec 6 m 1.0 sec 4 m 1.5 sec 0 m 2.0 sec -2 0 2 4 6 x
Discrete Case - an example Since we know the position at 0 sec and 1 sec, we can find the average velocity in this interval: vx-average= x / t -2 m 0 sec vx-avg (between 0 and 1 sec)) = 1 m 0.5 sec (+1 m - -2 m) / (0.5 sec - 0 sec) 6 m 1.0 sec = +6 m/s. 4 m 1.5 sec Since this is the velocity between 0 m 2.0 sec 0 and 0.5 seconds, we can say that this probably is close to the speed at 0.25 seconds.
Discrete Case - an example Can you figure out the value for the other times: x(in meters) at t(in sec.) vx (in m/s) -2 0 0.25 +6 +10.5 0.75 +61 1.25 +41.5 1.75 02
Discrete Case - an example Doing similar calculations for the other times: x(in meters) at t(in sec.) vx (in m/s) -2 0 0.25 +6 +10.5 0.75 +10 +61 1.25 -4 +41.5 1.75 -8 02
Discrete Case - an example For acceleration we do the same thing: Since we know the approximate velocity at 0.25 sec and 0.75 sec, we can find an approx. average acceleration in this interval: ax-average= vx/ t ax-avg (between 0.25 and 0.75 sec) = (+10 m/s - +6 m/s) / (.75 sec - .25 sec) = +8 m/s2. Since this is the acceleration between .25 and .75 seconds, we can say that this probably is close to the acceleration at 0.5 seconds.
Discrete Case - an example Doing similar calculations for the other times: x(in meters) at t(in sec.) vx (in m/s) ax(in m/s2) -2 0 0.25 +6 +10.5 +8 0.75 +10 +61 -28 1.25 -4 +41.5 -8 1.75 -8 02
Motion Often we do NOT know position and time, but rather something else and we wish to predict what the position versus time will be! Can we go backwards as well as forwards in these relations? (That is, knowing acceleration and time, can we figure out what the velocity will be?)
Going backwards:the discrete case vx-avg = x / t and ax-avg = vx/ t Since the above definitions involve division, the inverse of division is multiplication. In the calculus (for functions), the inverse of the derivative is the integral. Knowing the AVERAGE velocity and the time interval, we can find the CHANGE IN position: x= vx-avg* t.
Going backwards:the discrete case x= vx-avg* t , or xfinal = xinitial + vx-avg*Dt Note that the velocity in this formula is the AVERAGE velocity. If the velocity is constant, then this equation works exactly. However, if the velocity changes, then we need to know the real average velocity. The real average velocity is not necessarily the sum of the initial and final divided by 2! final = 4 Using just the endpoints, avg = (2+4)/2 = 3. initial = 2 avg = 3 avg < 3 avg > 3
Going Backwards Knowing the AVERAGE acceleration and the time interval, we can find the CHANGE IN velocity: vx = ax-avg * t . If the acceleration is constant, so that the average acceleration is equal to the acceleration at all times, then we have the formula: vxfinal = vxinitial + ax*t
Example - discrete case x (m) t(sec) v (m/s) a (m/s2) 0 0.8 +3 1.6 -1 2.4 -2 3.2
Example - discrete case Knowing the acceleration at t=0.8 sec, we can use the definition of acceleration: a = v/t to get: v = a*t . Since the accelerations are given in 0.8 second intervals, let’s choose t = 0.8 sec. This leads to: v(t=1.2 sec) - v(t=0.4 sec) = (3 m/s2) * 0.8 sec, or v(t=1.2 sec) = v(t=0.4 sec) + (3 m/s2) *0.8 sec However, unless we know one of these two v’s, we can’t solve this. Let’s say that we do know the velocity at t=0.4 sec is v(t=0.4 sec) = +5 m/s. v(t=1.2 sec) = +5 m/s + (3 m/s2) * 0.8 sec = +7.4 m/s.
Example - discrete case x (m) t(sec) v (m/s) a (m/s2) 0 0.4 +5.0 0.8 +3 1.2 +7.4 1.6 -1 2.0 2.4 -2 2.8 3.2
Example - discrete case We now proceed as before to get the next velocities: v(t=2.0 sec) = v(t=1.2 sec) + (-1 m/s2) * 0.8 sec ; from the previous calculation, we know v(t=1.2 sec) = 7.4 m/s, so v(t=2.0 sec) = 7.4 m/s + (-1 m/s2) * 0.8 sec = 6.6 m/s. Proceeding: v(t=2.8 sec) = v(t=2.0 sec) + (-2 m/s2) * 0.8 sec gives v(t=2.8 sec) = 6.6 m/s + (-2 m/s2) * 0.8 sec = 5 m/s.
Example - discrete case x (m) t(sec) v (m/s) a (m/s2) 0 0.4 +5.0 0.8 +3 1.2 +7.4 1.6 -1 2.0 +6.6 2.4 -2 2.8 +5.0 3.2
Example - discrete case To get position, we now go backwards from velocity: Knowing the velocity at t=0.4 sec, we can use the definition of velocity: v = x/t to get: x = v*t . Since the velocities are given in 0.8 second intervals, let’s choose t = 0.8 sec. This leads to: x(t=0.8 sec) - x(t=0 sec) = (5 m/s) * 0.8 sec , or x(t=1 sec) = x(t=0 sec) + (5 m/s) * 0.8 sec However, unless we know one of these x’s, we can’t solve this. Let’s say that we do know the position at t=0 sec is x(t=0 sec) = -2 m. x(t=1 sec) = -2 m + (5 m/s) * 0.8 sec = +2.0 m.
Example - discrete case x (m) t(sec) v (m/s) a (m/s2) -2.0 0 0.4 +5.0 +2.0 0.8 +3 1.2 +7.4 1.6 -1 2.0 +6.6 2.4 -2 2.8 +5.0 3.2
Example - discrete case We now proceed as before to get the next positions: x(t=1.6 sec) = x(t=0.8 sec) + (+7.4 m/s) * 0.8 sec ; from the previous calculation, we know x(t=1 sec) = 2.0 m, so x(t=1.6 sec) = 2.0 m + (+7.4 m/s) * 0.8 sec = 7.92 m. Proceeding: x(t=2.4 sec) = 7.92 m + (+6.6 m/s) * 0.8 sec = 13.2 m x(t=3.2 sec) = 13.2 m/s + (+5 m/s) * 0.8 sec = 17.2 m.
Example - discrete case x (m) t(sec) v (m/s) a (m/s2) - 2.0 0 0.4 +5.0 + 2.0 0.8 +3 1.2 +7.4 + 7.92 1.6 -1 2.0 +6.6 +13.2 2.4 -2 2.8 +5.0 +17.2 3.2
Example - discrete case Note: In going backwards, we needed to know the acceleration, but we also needed to know where to start, both for the velocity and for the position. These starting points are called “initial conditions”. In going forward, we had no need for such initial conditions.
Continuous Case(derivations based on calculus) In dealing with the continuous case (equations instead of values), we again start with the definitions: v(t) = dx(t)/dt and a(t) = dv(t)/dt where x, v, and a are all functions of time. We can go “forward” if we know the function of position, x, with time: x(t) – we simply differentiate. We can go “backward” if we know the function of acceleration, a, with time: a(t) – do the inverse of differentiation: integration: vo∫v dv = 0∫ta(t) dt and xo∫x dx = 0∫t v(t) dt .
Special Case:Constant Acceleration If the acceleration is constant, then we get two equations from our two starting definitions: vxfinal = vx-initial + ax*t . and xfinal = xinitial + vx-initial *t + (1/2)*ax*t2. Since there is acceleration, the velocity does not remain constant and so the formula for x with constant velocity does not hold.
Falling(without air resistance) In the case of something falling, the acceleration due to gravity near the earth’s surface is approximately constant, if we can also neglect the effects of air resistance. In this special case, we can use the equations for constant acceleration. [In part two we will investigate what it means to be “near” the earth.]
Falling (without air resistance) If we treat up as +y, then we have these two equations: y = yo + vyo *t + (1/2)*g*t2and vy = vyo + g*t where g = -9.8 m/s2 . Here, we have simply used y for yfinal and we have used yo for yinitial. The same notation is also used for v.
Solving Problems Note that when we have identified a problem as being one of constant acceleration, we have two equations: • y = yo + vyo*t + (1/2)*a*t2and • vy = vyo + a*t . Note that in these two equations we have six quantities: y, yo, v, vo, a, and t. This means we have to identify four of the six in order to use the two equations to solve for the other two quantities.
Solving Problems Reading the description of a problem involves several steps: • Identify the problem type: does this problem have constant acceleration? If so, we know we have the two equations to work with. • Identify what you know: does this problem involve falling under the influence of gravity? If so, we know a = g = -9.8 m/s2.
Solving Problems (list continued from previous slide) • We can usually pick out where to start from (if gravity, the ground is usually where y=0 is). This is important for identifying y and yo. Sometimes we are given information about yo, sometimes about y. • Special words: The word “stop” or “stationary” means that at this time v=0. This may apply to either v or vo.
Solving Problems (list continued from previous slide) • Make sure you know what negative signs mean. For y, positive usually means above ground, negative will mean below ground. For v, positive usually means going up (or forward), negative will mean going down (or backwards).
Solving Problems List continued from previous page • Note that in the y equation for constant acceleration, there is a t2 term: y = yo + vyo*t + (1/2)*a*t2. That means that, when solving for time, there may be two solutions. Can you identify in the problem what the two solutions would be for? The computer homework assignment on Quadratic Equations should provide a review in this area.
Example of a falling problem To find the height of a tree, a person throws a baseball up so that it just reaches the height of the tree. The person then uses a stopwatch to time the fall of the ball from the highest point (the height of the tree) to the ground. If the time on the stopwatch is 3.4 seconds, how high is the tree?
Example of a falling problem Draw a diagram to help define the situation: yo = ? vo = ? (to=0 sec.) a = g = -9.8 m/s2 y = ?, v = ?, t = 3.4 seconds
Example of a falling problem We will assume that air resistance is negligible, and that the tree is not too high to consider gravity constant. In this case we then have the constant acceleration situation and so can use the two equations: • y = yo + vyo*t + (1/2)*a*t2and • vy = vyo + a*t .
Example of a falling problem We can assume that the ground is where y=0. Then from the statement of the problem, we are looking for yo (which would correspond to the height of the tree), and we know the time for y=0. Thus we know three quantities and have one unknown so far:
Example of a falling problem • yo = ? • yfinal = y = 0 m • a = -9.8 m/s2 • t = 3.4 seconds That leaves the initial and final velocity. To solve the problem, we need to know four things and can have two unknowns (since we have two equations).
