Name School Date
Lab 4.3Vector Addition and Resolution – The Force Table KEY
“Vectors? I don't have any vectors, I'm just a kid.” – From Flight of the Navigator
Explore the Apparatus/Theory
We’ll use the Force Table Apparatus in this lab activity.
Before starting this activity you need to watch the introductory video located at the address below. You’ll find a link there to open the video. This will give you an introduction to the use of the apparatus as well as an overview of vector addition and resolution, and vector components. You can get quick access help by rolling your mouse over most objects on the screen.
Figure 1 – The Force Table Apparatus
Note:When you’re asked to provide a figure you may sketch it; or you may create it with the force table apparatus, print it out and paste it into the space provided. If the printed figure is too large to fit in the space provided, just attach it at the end of the lab. Make sure you label it to match the number of the figure.Ex. The figure above is Figure 1.
A. Addition of Two Dimensional Vectors
In this part you’ll add two forces to find their resultant using experimental addition, graphical addition, and analytical addition.The two forces you’ll work with are:
F2 = .300 g N at 320°
F4 = .180 g N at 60°
You should know three things about the way these forces are stated from the introductory video.
- The subscripts refer to the hanger numbers.
- “.180 g N” is a short hand for .180 kg × g. So F2 = .180 kg × 9.81 N/kg = 1.77 N.
We’ll refer to the forces using the more convenient .180 g N system just for this apparatus. - .180 g N isthe total weight of the hanger system including the hanger itself. So 130 grams were added.
A1. Experimental Addition
By experimental addition we mean that we will actually apply the forces to an object and measure their total, resultant effect. We'll do that by first finding the equilibrant, E, the force that exactly balances them. When this happens the ring will be centered. The resultant, R, is the single force that exactly balances the equilibrant.
Enable pulleys 2 and 4 and disable pulleys 1 and 3 using their check boxes.
Add massesto hangers 2 and 4 to produce forces F2 and F4and then adjust the angles as specified. Use the purple and blue pointers of the pulley systems, not the strings, to set the angles. You can zoom in to set the angles more precisely.
Enable pulley 3.
Using pulley 3, find the equilibrant, E to just balance (cancel) F2 and F4. You’ll need to adjust the mass on the hanger and the angle until the ring is approximately centered on the central pin. You can add and remove masses to home in on it.
1. Experimental Equilibrant, E: 320 gN, 172°
From your value of E, what should be the resultant of F2 and F4?
2. Predicted Resultant, R: 320 g N, 352°
Disable Pulleys 2 and 4 and enable pulley 1. Experimentally determine the resultant by adjusting the mass on pulley 1 and its angle until it balances the equilibrant. That is, the ring should not move substantially when you change between F2 and F4, and just F1.
3. Experimental Resultant, R: 320 g N, 352°
A2. Graphical Addition
Using the default 2×102 g vector scale, create vector arrows (± 3 grams) for F2, F4. For example, drag the purple vector by its body and drop it when its tail (the square end) is near the central pin. It should snap in place. Then drag the head (tip) of the arrow in the direction of F2 and increase its length until its magnitude is approximately equal to 180 g. Repeat for F4 with the blue arrow.
The resultant, R, is the vector sum of F2 and F4. Add F2 and F4graphically by dragging the body of say, F4until its tail is over the tip of F2 and releasing it. Form the resultant, R, by creating an orange vector from the tail of the first (F2),to the head of the last, (F4). This works the same in either order.
1. Graphical Resultant, R: 320 g N, 352°
The equilibrant, E should be the same magnitude as R, but in the opposite direction. Produce E with the green vector arrow.
2. Graphical Resultant, E: 320 g N, 172°
Draw each of the four vector arrows on Figure 2 OR print out and paste your figure over Figure 2.Label each vector with its total force value. Ex. Label the blue F4 vector .180 g N.
Vectors F2 and F4 should still be in their tail to head arrangement.
Figure 2 /
3: Describe what we mean by the terms resultant and equilibrant in relation tothe forces acting in this experiment?
When two forces are acting together they have some total effect. The resultant of these two forces is the one
force which, acting alone, could provide the same effect. The equilibrant is the one force that could
exactly balance (cancel) the original two forces or the resultant force.
4: From your figures, which two forces, when added would equal zero? Circle two F2 F4 E R E and R5. Show this graphical addition in the space to the right.You’ll want to offset them a bit since they should be on top of one another. /
Figure 3
6. What three vectors, when added would equal zero?
Circle three F2 F4 E R E, F2, and F4
7. Show this graphical addition in the space to the right.
8. Vector E should appear in both Figure 3 and Figure 4. Why?
Vector 3 is the equilibrant which means that it balances
theresultant so it’s equal and opposite.
The resultant is equal to F2 + F3, so the sum of those two
should also just balance the equilibrant. /
Figure 4
Put all four vectors back at the center of the force table with their tails snapped to the central pin. Click the check boxes beside the purple and blue arrows under “Show Components.” This will give you a visual check on your analytical calculations in part A3.
A3. Analyticaladdition with components
1. You’ve found experimentally and graphically that the sum of forces F2 and F4 is equal to the resultant, R.Using the table provided, find the components of F2 and F4 and add them to find the components of R. Use these components of R to determine the magnitude and direction of R. Note that one of the four components will have a negative sign. The components now displayedon the force table should make it clear why.
x-Components / y-ComponentsF2x = .230g N / F2y = -.193g N
F4x = .090g N / F4y = .156g N
Rx = .320g N / Ry = -.037g N
R = .322g N,6.6 °
2. Show all your calculationsleading to your value for Rbelow. Remember, a vector has both a magnitude and a direction.
F2x = F2cos(40°) = 300 g N cos(40°) = .230 g NF2y = F2 sin(40°) = 300 g N sin(40°) = -.193 g NF4x = F cos(60°) = 180 g N cos(60°) = .090 g NF4y = F sin(60°) = 180 g N sin(60°) = .156 g N
Rx = .320 g NRy = -.037 g N
R2 = Rx2 + Ry2
= (.320 g N)2 + (-.037 g N)2 = .104 (g N)2
R = .322 g N
Tan(θ) = Ry/Rx
= .037/.320 = .116
θ = 6.6°
B. Simulation of a slackwire problem.
Let’s model a realistic system similar to what you might find in your homework. Below you see a crude figure of slackwire walker,Elvira, making her way across the wire. She weighs 450 N. (About 100 lbs.) At a certain instant the two sides of the rope are at the angles shown. Only friction allows her to stay in place. The gravitational force is acting to pull here down the ‘hill.’ It’s complicated.
The single rope acts like two separate sections of rope in this situation with different tension forces on either side of her. The steeper rope has the greater tension. To understand this it helps to imagine her at the extreme left where the left section of rope is almost vertical and the right one is much less steep. In this case T3 is providing almost all of the vertical support, while T1 pulls her a little to the right. It helps to just try it. Attach a string between two objects in the room. Leave a little slack in it. Now pull down at various points. You’ll feel the big frictional tug on the more vertical side and less from the more horizontal side.
We want to explore this by letting her move along the rope.
Figure 5 /B1. Experimental Determination of T1 and T2
First send all of your vectors “home” by clicking on each of their four little houses. Then remove all the masses from your four pulleys by clicking in the total mass/mass removal boxes beside each hanger.
Elvira weighs 450 N. We’ll let one gram represent 1 N on our force table and set our vector scale to 4×102 N. We’ll picture our force table as if it were in a vertical plane with 270° downward and 90° upward. We’ll use pulleys 1 and 3 to provide your two tensions, T1 and T3.
1. Prediction: Since θ3 = 2×θ1, do you think T3 will be about twice T1? No
For Elvira, move hanger 2 to 270° and set its total mass to 450 g to represent 450 N.
Move Pulleys 3 and 1 to match the angles in Figure 5.Adjust the masses on each pulley until you achieve equilibrium. It’s best to alternate adding one mass to each side in turn until you get close to equilibrium.
2. T3= 890N at 160°
3. T1= 830N at 10°
How’d that prediction go? If trig functions were linear we wouldn’t need them.
B2. Graphical Check of our Results
Using the vector scale of 4×102 N, create vector arrows for each force, T3, T1, and W (Elvira’s weight).Draw your three vectors on Figure 6 or print out your force table image and paste it on top of the figure.
Figure 6 /
1. How can we graphically check to see if our values for T1 andT3 are reasonably correct? How are T1, T2, and W related? What would happen if any one of them suddenly went away? Elvira would no longer be in Equilibrium .
Thus the three vectors are in equilibrium and must add to equal zero! What would that look like? The sum, resultant, of three vectors is a vector from the tail of the first to the head of the last. If they add up to zero, then the resultant’s magnitude would be zero which means that the tip of the final vector would lie at the tail of the first vector.
Try it. Leave your T1 vector where it is and then add T3 to it. Then add W to the end of T3.
2. What about your new figure says (approximately) that the three forces are in equilibrium?
The three vectors add up to approximately zero. Or their resultant is approximately zero.
3. Again draw your new figure with the three vectors added together on figure 7 or print out your force table image and paste it on top of the figure.Figure 7 /
B3. Analytical Check of Your Results
If our three vectors add up to zero, then what about their components?
1. When you add up the x-components of all three vectors the sum should be zero
2. When you add up the y-components of all three vectors the sum should be zero
3. Test your predictions using the following table.
x-Components / y-ComponentsF1x = 798 N / F1y = 141 N
F3x = -762 N / F3y = 298 N
Wx = 0 N / Wy = -450 N
ΣFx = 36 N / ΣFy = -11 N
2. Show your calculations of the eight values in the table in the space provided below.
F1x = 830 N cos(10°) = 817 NF1y = 830 N sin(10°) = 144 NF3x = 890 N cos(20°) = -836 NF3y = 890 N sin(20°) = 304 N
Wx = 450 N cos(90°) = 0 NWy = 450 N sin(90°) = -450 N
ΣFx = 19 NΣFy = -2 N
Before we continue… Why all the tension?
Why does the tension on each side have to be so much larger than the weight actually being supported? All the extra tension is being supplied by the x-components. Then why not just get rid of it? That would be what we call the boringly slackwire walk and frankly nobody would pay to see such an act, even if they tried calling it “Xtreme Urban Slackwire.”
There’s also the similar situation with traffic lights. A huge amount of tension is required to support a fairly light traffic light. The simpler solution of a pole in the middle of the intersection wasn’t appreciated much more than the Xtreme Urban Slackwire performers.
Next time you see large structures supporting large electrical wires look for places where the wire has to change direction. The support structures in straight stretches don’t have to be really sturdy since they have horizontal forces pulling equally in opposite directions. Thus they just have to support the weight of the wire. The corner structures have to provide these horizontal forces and they have to support it in two different directions. Thus they’re much sturdier and larger to give them a wider base.
C. Simulation of a symmetrical slackwire problem.
Here’s our final situation. Elvira has reached the center. This is where she would be if she rode a unicycle and just let it take her to the “bottom.” The angle values are just guesses. They’d be between the 10° and 20° we had before, but the actual value would depend on the wire.
Figure 8 /Without changing the masses, adjust both angles to 15°.
1. What does the symmetry of the figure suggest about how the tensions T1, and T3 should compare?
They should be equal in magnitude.
2. Similarly what can you say about comparative values of the x-components T1x and T3x? (Ex. T1x = 2× T3x)
They should be equal in magnitude.
3. What can you say about comparative values of the y-components T1y and T3y?
They should be equal in magnitude.
4. Knowing that the weight being supported is 450 N, what can you say about actual values of the y-components T1y and T3y?
They should be equal to 450 N/2 = 225 N
5. T1y = T2y = 225 N
6. T1 = 869 N at 15°
Show the calculation of T1 below.
Sin(15°) = T1y/T1T1 = T1y/sin(15°) = 225 N / sin(15°) = 869 N
7. Change each T to as close as you can get to this amount. Does this produce equilibrium? Yes
8. Create the two vector arrows to match this amount -one for T1 and one for T3. Add T1 + T3 + W graphically. Draw or paste a copy of this graphical addition below.
8. Create the two vector arrows to match this amount - one for T1 and one for T3. Add T1 + T3 + W graphically. Draw or paste a copy of this graphical addition in Figure 9.Figure 9 /
You’ll notice that this figure doesn’t differ much from the previous one. The graphical tool we’re using is not very precise. The same goes for “the real world.” Measuring the tension in a heavy electrical cable or bridge support cable is very difficult. One good method involves whacking it with a hammer and listening for the note it plays!
D. A Quick look at vector subtraction.
Here’s the scenario. We have a three-person kinder, gentler tug-o-war. The goal is to reach consensus, stalemate. Two of our contestants are already at work.
Darryl1 = 800 N at 0°
Darryl2 = 650 N at 240°
The question is - how hard, and in what direction, must Larry3pull to achieve equilibrium?
1. As usual, set up pulleys 1 and 2 to represent these forces using 1 gram/1 newton.
2. Create orange and purple vectors to match using the 4×102 N for your vector scale. Attach them to the central pin.(These won’t appear in Figure 10 in their current form.)
One method of solving the problem is to add the Daryl forces and complete the triangle to find the resultant. Larry’s force would be the equilibrant in the other direction. Here’s another way. The vector equation shown describes the result when the system is in equilibrium.
Σ F = Darryl1 + Darryl2 + Larry3 = 0
We can find Larry3 by subtracting Darryl1 and Darryl2 giving us
Larry3 = –Darryl1 – Darryl2
Remember, these are all vectors.We’re doing vector subtraction. So how do we subtract them? One way is to interpret the negative signs as indications of direction and then add them in the usual manner – tail to head.
So if
Darryl1 = 800 N at 0°
Darryl2 = 650 N at 240°
then the negatives of these are vectors of the same lengths but in the opposite directions. Thus,
–Darryl1 = 800 N at 180°
–Darryl2 = 650 N at 60°
3. Create these two vector arrows radiating from the center of the force table. You’ll do this by just reversing the directions of both arrows.Leaving –Darryl1 pointing at 180°, add –Darryl2 in the usual tail to head fashion.
Larry3 is the sum of these two. Create the green Larry3 vector from the tail of Darryl1 to the head of Darryl2. (Sorry.)
Draw or paste a copy of this graphical addition in Figure 10. Label your three vectors Larry3, –Darryl1, –Darryl2.
Figure 10 /
4. Larry3 (graphical) = 726N 128° (from the length and direction of your green vector)
Move pulley 3 to the position indicated by the direction of Larry3.
Place the necessary mass on hanger three to produce the Larry3 force.
5. Larry3 (experimental) = 720N 132 °
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Lab 4.3 – Vector Addition and Resolution1September 1, 2011