Download presentation
1
Warmup
2
Affects on Velocity and Acceleration
Force Affects on Velocity and Acceleration
3
Force Causes Change in Velocity
Oh! Skeeter! Ha, ha, good one This one time at band camp…
4
Force and Motion Newton’s First Law
At rest – Stays at rest (until force is applied) In motion – Stays in motion (until force is applied) Force causes change in velocity Force causes acceleration Force causes a change in direction
6
Warm-up A blue one with a nubbin was moving at 5m/s straight down when the problem started. The difference between the bottom and the top is 3 times the height of a trans-atlantic 10m building. This nubbin sporting thing is earthbound. (include units)
7
Types of Fundamental Force
Gravitational Force Force we use in this section Electromagnetic Force Includes the contact forces we work with in this section Nuclear Force Weak Force (summarize)
8
Electromagnetic Force
Contact Forces Normal Friction Static: friction when the object is not in motion Sliding: friction when the object is in motion Tension Spring (Use article to organize with topic oval)
9
Force Newton’s Third Law
Every action has an opposite and equal reaction.
10
Force Experiment with force sensors. equal and opposite
11
Key Vocab Net force (Fnet) Vector addition/subtraction 5 N + 7N
The resultant is the net force 5N N = 12N
13
Newton’s Second Law Two men pull a 50-kg box with forces 19.7 N and 15.6 N in the directions shown below. Find the net force of the box. 19.7 N N or -19.7N
14
Force The pound-force or simply pound (abbreviations: lb, lbf, or lbf) is a unit of force 1N=0.225lb; 1lb=4.45N Normal plus lift (Fnet) Weight from force gauge. Upward force must be greater than gravity to have upward acceleration. HW: 16,17, (pg 97), Example problem 2 pg 99 with elevator 3 times with a = 2.50, 3.00, 15.0m/s^2 and t=1.50, 3.25, 3.00s 19, 20, 22, 25 (pg 100 & 101) Demo
15
Force Newton’s Second Law………...........
Weight is a Force……………… Defined with the universal constant ‘G’. 1 lbf ≈ N
16
Force and Gravity
17
Key Vocab Normal Force Force due to gravity and mass is referred to as a normal force or ‘the normal vector’. Normal vector also refers to a vector that intersects at 90 degrees. (also stated as: A vector that is perpendicular to the tangent line at the interface)
18
Newton’s Second Law Two men pull a 50-kg box with forces 19.7 N and 15.6 N in the directions shown below. Find the resultant acceleration of the box and the direction in which the box moves. 19.7 N N or -19.7N
19
Practice - A large helicopter is used to lift a heat pump to the roof of a new building. The mass of the helicopter is 7.0x10^3 kg and the mass of the heat pump is 1700 kg. a. How much force must the air exert on the helicopter to lift the heat pump with an acceleration of 1.2 m/s^2? b. Two chains connected to the load each can withstand 95,000 N. Can the load be safely lifted at 1.2 m/s^2?
20
Air Drag Force: exerted by a fluid on an object moving through the fluid. Terminal Velocity: drag force is equal to force of gravity
21
Friction Static friction Ff,s
Friction Coefficients: Table 5.1 pg 129 Static friction Ff,s Friction when there is no motion between the objects. Ff,s <= usFN Sliding friction (or kinetic friction) Ff,k Friction when surfaces are rubbing against each other (in motion). Ff,k = ukFN
22
Friction A wood block on a wood plank. m= kg us = 0.5 uk = 0.2 FN = N
Normal A wood block on a wood plank. m= kg us = 0.5 uk = 0.2 FN = N Friction
23
Review Elevator Example
Fnet = FE + (-Fg) Fnet = ma (represents the force on the system as a whole) FE = Fnet + Fg
24
Tension Force exerted by pulling (usually a string or rope).
For now, consider strings, ropes and pulleys (also called sheaves or blocks) to be massless and frictionless. Provide a change in direction of force.
25
Tension Problem The blocks shown are placed on a smooth horizontal surface and connected by a piece of string. If a 8.8-N force is applied to the 8.8-kg block, what is the tension in the string? 6.1N
26
Tension Three blocks A, B, and C are connected by two massless strings passing over smooth pulleys as shown below, with the 3.4-kg block on a smooth horizontal surface. Calculate the tension in the strings connecting A and B, and B and C. 54N 48N
27
Tension
28
Tension Practice
29
Sketch Problem 68N 40N A B C 68N 40N ABC
30
Sketch Problem 68N 40N A B C 40N 68N C AB 68N 40N A BC
31
Fnet Fnet = sum of all forces acting on a system = ma
Fnet = Ff,k + FT + Fpush + Fgravity = ma
32
Force Newton’s Third Law
Every action has an opposite and equal reaction.
33
Force Newton’s Second Law………
34
Force Newton’s first law
When the net forces are zero, an object at rest remains at rest and an object in motion remains in motion in the same direction at the same speed. For Fnet = 0 velocity is constant: v1 = v2 acceleration is zero
35
Friction Static friction Ff,s
Friction Coefficients: Table 5.1 pg 129 Static friction Ff,s Friction when there is no motion between the objects. Ff,s <= usFN Sliding friction (or kinetic friction) Ff,k Friction when surfaces are rubbing against each other (in motion). Ff,k = ukFN
36
Friction Static friction Ff,s
Friction when there is no motion between the objects. Ff,s <= usFN Ff,s <= usmg 10N 5kg
37
Review Elevator Example
Fnet = FE + (-Fg) Fnet = ma (represents the force on the system as a whole) FE = Fnet + Fg
38
Setting up the Problem Connected by a massless string, pulled along a surface with a coefficient of friction 100N
39
Steps What forces are present? What is the value of each force?
Draw the free body diagram 100N
40
Steps List known variables, solve for unknown
41
Break apart Find the tension in each string
First, identify the forces of each part 100N
42
Consider each section as a system
Draw a free body diagram for this system
43
Consider each section as a system
Draw a free body diagram for this system
44
Break apart Draw a sketch (free body diagram) for each string
45
Trig Identities SOHCAHTOA Adjacent Leg = Hypotenuse * cos
Opposite Leg = Hypotenuse * sin Opposite Leg = Adjacent Leg * tan
46
Force components The magnitude of the force 1 is 87 N, of force 2 is 87 N, and of 3 is 87 N. The angles θ 1 and θ 2 are 60° each. Use the Pythagorean theorem and trig identities to find the resultant of the forces 1, 2 , and 3 .
47
Drag Force Terminal velocity is when an object in free fall has reached equilibrium. That is, the drag force is equal to the force of gravity. The Fnet for a system in equilibrium is always zero.
48
Friction with Force components
The system shown below is in equilibrium. Calculate the force of friction acting on the block A. The mass of block A is 7.10 kg and that of block B is 7.30 kg. The angle θ is 48.0°.
49
Break Apart The system shown below is in equilibrium: This means Fnet=0, since Fnet=ma, then ma=0 and a=0 In order for the net force to be zero on block A (no acceleration) the tension in the rope pulling block A has to be matched by the friction between block A and the surface. The tension here must be equal to the friction resisting motion The friction here must be equal to the tension pulling A
50
Break Apart There is a force from gravity acting on block B.
Convert this force to its x and y components. Using the concept of equilibrium, realize that the sum of x components is 0 θ is 48.0°. 7.30kg
51
Two wire tension
52
Familiar Problem Three blocks A, B, and C are connected by two massless strings passing over smooth pulleys as shown below, with the B block on a smooth horizontal surface. A=2kg, B=3kg, C=5kg
53
Redraw the problem Force of gravity on A Force of gravity on C A B C The problem may be redrawn to help visualize which direction the forces are acting and which direction is positive.
54
Breaking the problem down
Find the total mass of the system ABC. Find the net force of the system ABC. Find the acceleration of the system ABC. Find the acceleration of the system C. Find the total mass of the system C. Calculate the force due to the acceleration of system C. Calculate the force due to gravity on system C. Calculate the tension in the strings connecting B and C.
55
Spring (restoring force)
F=-kx k=constant x=displacement
56
Force Experiment with force sensors. equal and opposite
normal plus lift (Fnet) friction (static and sliding)
Similar presentations
© 2024 SlidePlayer.com. Inc.
All rights reserved.