Physics 1

Question 1

• Name 5 scalars
  
  • “MaTe Speed TiDe”

Answer 1

1. Mass
2. Temp
3. Speed
4. Time
5. Density

Question 2

• Name 8 vectors
  
  • “VeDiAcFo MagMoImTo”

Answer 2

1. Velocity
2. Displacement
3. Accel
4. Force
5. Mag. Field
6. Momentum
7. Impulse
8. Torque

Question 3

Think of force as…

Answer 3

• any influence capable of:
  
  • causing a mass to accelerate

Question 4

Center of Mass equation

• What should you remember to keep in mind with these problems?

Answer 4

C_mass=(r₁m₁+r₂m₂….)/m_total

• r=reference point

Hint: choose a reference point from which to measure each displacement vector

Question 5

• Constant net force causes WHAT acceleration?
  
  • and therefore WHAT velocity?

Answer 5

• CONSTANT acceleration
  
  • therefore CHANGING velocity!!!

Question 6

• When you see “constant velocity” or “constant speed,” think? (5)**​

Answer 6

1. NO acceleration
2. NO net force (F_net=0)
3. All forces sum to zero
   
   • up forces=down forces, left=right, etc.
4. NO change in direction
5. The object is in EQUILIBRIUM!!!

Question 7

• When you see a LINEAR MOTION GRAPH, you’ll ask yourself these 6 things:

Answer 7

1. What does the SLOPE represent?
2. Is this slope (+) or (-)?
3. It the slope….
   
   • Constant (straight line) or
   • Non-constant (curved line)?
4. What is the value on the x-axis?
5. Is the y value (+) or (-)
   
   • ​​aka are you above or below the x-axis?
6. At t=0​, do I expect the value on the y-axis to be:
   
   1. LARGE, or
   2. SMALL?

Question 8

• When I see the word “projectiles,” I will remember 7 things:

Answer 8

1. Horizontal VELOCITY:
   
   • ​never changes
2. Horizontal ACCELERATION:
   
   • ​is always =0
3. VERTICAL acceleration:
   
   • is always 10 m/s² downward
4. Vertical BEHAVIOR
   
   • is always symmetrical
     
     • ex: upward trip=downward trip
5. Time in air (T_air) depends on:
   
   1. VERTICAL COMPONENT of velocity ONLY!!
6. Range depends on both:
   
   1. vertical AND horizontal components
7. Time is always the same for both x and y components of the motion

Question 9

Law of Universal Gravitation formula

Answer 9

F_g=Gm₁m₂/r²

Question 10

• F_g=Gm₁m₂/r²
  
  • gives WHAT?

Answer 10

• the force DUE to gravity
  
  • NOT gravity itself!

Question 11

• Formula for GRAVITY (ITSELF!)
  
  • aka “acceleration due to gravity”
  • aka “strength of gravitational field”

Answer 11

g=Gm/r²

Question 12

• What are the 2 physics equations that could be used FOR FALLING OBJECTS?

Answer 12

• x=½at²
• V=√2gh

Question 13

Time in air equation

• T_air=?
  
  • this equation can ONLY be used to calculate what?

Answer 13

T_air=2V/g

• can only be used to calculate “round trip” times
  
  • aka total time in air,V, must be vertical component of INITIAL velocity

Question 14

• At terminal velocity…
  
  • What 2 things are happening?
  • Give the formula for terminal velocity

Answer 14

• object has stopped accelerating
• forces of gravity and air resistance are BALANCED

F_air=mg

Question 15

V_avg=?

Answer 15

V_avg=(V₁+V₂)/2

Question 16

• For PE_grav, which variation will you MOST LIKELY see on the MCAT?

Answer 16

PE_grav=mgh

• (At or near earth’s surface; g=10m/s²)

Question 17

Inclined Planes

• When is the equation when solving for:

Force down an IP PARALLEL to the surface?

Answer 17

F=mgsinθ

Question 18

Inclined Planes

When is the equation when solving for:

Normal Force (F_{<strong>N</strong>)} down an IP

Answer 18

F_N=mgcosθ

Question 19

Inclined Planes

• When is the equation when solving for:

Velocity of a particle at the base of an inclined plane

• What other kind of problem could this equation be used to help solve?

Answer 19

V_final = √2gh

Can also be used to help solve for

FALLING OBJECT problems

Question 20

Inclined Planes

• When is the equation when solving for:

ACCELERATION DOWN an IP

• What other equation can you derive this from?

HINT:

• Notice you’re solving for acceleration DOWN an IP.
  
  • What other equation solves for something DOWN an IP that you know of?

Answer 20

a=gsinθ

Derived from:

• F=mgsinθ (Force DOWN an IP)

F=ma, ∴ “a”=gsinθ

Question 21

Inclined Planes

• Why does V_f = √2gh work for either falling bodies OR a mass on an inclined plane?

HINT:

What is the above equation derived from?

What is happening to an object as it goes from the point where it is dropped until hitting the ground?

Answer 21

The formula V_f = √2gh is derived from CONSERVATION OF ENERGY

• by equating mgh to ½mv²
  
  • and solving for “v”

As long as friction, air resistance, etc. are ignored (which they are), energy will be conserved in an identical way…

WHETHER THE OBJECT FALLS DIRECTLY TO THE GROUND OR ROLLS DOWN A PLANE

Question 22

Inclined Planes

As the angle of incline of a plane INCREASES:

1. What happens to the value of a?
2. What happens to the value of sinθ and cosθ?
3. What happens to the normal force?
4. What happens to the force down the plane?
5. What is the maximum value for acceleration down an inclined plane?
6. What is the minimum value for acceleration down an inclined plane?

Answer 22

1. ) Because the acceleration down a plane is directly related to the SINE of the angle
   * (F=mgsinθ, where gsinθ​=”a,” since F=ma)*

• the greater the angle, the closer the sine of the angle will be to ONE (1.0)
• Because increasing the angle of SIN:
  
  • 0 ⇒ 1.0
• Therefore, the larger the angle, the closer the acceleration will be to 9.8m/s²*
  2. ) The normal force is related to the cosine of the angle (F_n=mgcosθ…OSD) , so as the angle increases, this value gets closer to zero
• Because increasing the angle of COS:
  
  • ​ 1.0 ⇒ 0
• Therefore, as the angle increases the normal force decreases

3. ) The force down an inclined plane is also related to the sine of the angle
   * so it too will increase as the angle of incline increases
4. ) The theoretical maximum incline is 90 degrees
   * ​where acceleration would be exactly 9.8 m/s²
5. ) The minimum would be a plane with NO angle of incline
   * where acceleration down the plane would be ZERO

Question 23

Tension Forces

What is the tension in a rope being pulled from opposite ends with identical forces of 50N?

Answer 23

50N

Question 24

Tension Forces

• A 500kg elevator is being accelerated upward by a cable with a tension of 6,000N

What force does the elevator exert on the cable?

Answer 24

TRICK QUESTION!

According to Newton’s 3^rd Law, if the elevator CABLE is pulling on the ELEVATOR with 6,000N of force…

…then the ELEVATOR must be pulling on the

CABLE with a force of 6,000N

Question 25

Hooke's Law * Give the equation

Answer 25

**F=kΔx** ## Footnote * **Δx** is the displacement of the spring from its *_equilibrium point_*

Question 26

Hooke's Law **F=kΔx** A **ball** rolls along a frictionless table and strikes a **spring** * Describe: * The **force** experienced ***_by the ball_*** due to the **spring** * The **acceleration** of the **ball** * How **both** **change** with time

Answer 26

* As the ball strikes the spring it experiences an **ever**-**changing** force, F * As the spring compresses, however, that force **increases** according to Hooke’s Law* * Because the **ball** experiences an **increasing** force, it will also experience an **increasing** acceleration * The maximum **force** and **acceleration** will occur at the maximum **compression** of the spring* * As the ball is pushed backward by the spring these variables will **change in a symmetrical way** * such that their value is **exactly** the same at **any** given value of x on **either** the way in, or the way back out*

Question 27

***QUICK!*** ## Footnote What is the density of water? * How many **cm³** per **mL**? * How many **L** of **water** in **1** **kg**? * How many **mL** of **water** in **1 gram?**

Answer 27

_Density of water:_ **1000kg/m³** or **1.0g/cm³** * 1cm³ = 1mL * 1L of water = 1kg * 1mL of water = 1 gram

Question 28

# Define "**SPECIFIC GRAVITY"** * HINT: It's a ratio that compares **two** things... * Give the formula for Specific Gravity

Answer 28

**_SPECIFIC GRAVITY=_** *A ratio that describes **how DENSE** something is **COMPARED TO WATER*** ***SG = D_substance / D_water***

Question 29

Specific Gravity * For objects floating in **liquids**, the fraction of the object submerged = ? * in other words, **Fraction_submerged​= ?** *\*\*If the liquid in which it is submerged is **WATER**, the **fraction submerged** is equal to ?*

Answer 29

**_For objects floating in liquids​:_** * Fraction of the object submerged is equal to the ratio of the density of the **object** to the density of the **liquid** **Fraction_submerged = D_object / D_liquid** *\*\*If the liquid in which it is submerged is **WATER**, the **fraction submerged** is **_EQUAL_** to the **specific gravity!***

Question 30

Specific Gravity * A ball is floating **¾ submerged** in a liquid with a density of **2.0 g/cm³** What is the **specific gravity** of the **liquid** and the **density** of the **ball**?

Answer 30

Because the ball floats with **¾** of its volume submerged, it must be **¾ as dense as the liquid** * Therefore the density of the ball must be 1.5g/cm3 This is **1.5** times **as** dense **as** water, so the SG of the ball is 1.5, and the SG of the liquid is: **D_Liquid/D_H2O = 2g/cm³ / 1g/cm³** **=2**

Question 31

# Define **ARCHIMEDES' PRINCIPLE** * Differentiate b/t whether it's **FULLY** submerged or **PARTIALLY** (aka it's "floating")

Answer 31

**_Archimedes’ Principle_** ***_Any object displaces an amount of fluid....._*** * Exactly **EQUAL** to its ***OWN*** volume * ...if ***FULLY*** submerged **...OR...** * To the volume of whatever **FRACTION** of the object **_IS_** submerged (¾, ½, etc.) * ...if ***FLOATING*** The **weight** of the displaced fluid is exactly equal to the buoyant force pushing **UP** on the object

Question 32

THE **BUOYANT FORCE** * Give the equation * Describe what each part means HINT: **PUG!**

Answer 32

The Buoyant Force: **F_buoyant = ρvg** * **v** * volume of fluid **that GETS** **displaced!** ***NOT*** the total volume **of** the fluid itself! * ρ * density of the **fluid** **NOT** the object!

Question 33

***_REMEMBER_**!*** ## Footnote The **buoyant force** is always **EXACTLY EQUAL** to....?

Answer 33

... to the _weight_ of the **amount of fluid** that is getting **DISPLACED BY** the object *So, if an object is displacing **4 lb** worth of fluid, then the buoyant force would be **4 N***

Question 34

The Buoyant Force 1. What **causes** the buoyant force?

Answer 34

T*he **best** way to intuit buoyant force is to look at the **pressure differential** between the top and bottom of an object* * The fluid pressure, **ρgh**, will be **larger** at the object’s **bottom** surface than it is at the top surface * due to the **larger value of h** (since it's at a deeper surface) Let’s examine a submerged cube with the **same** surface area both **top** and **bottom** _The formula **P = F/A** tells us:_ * If pressure is greater at the **bottom,** and **area** stays the **same:** * **​**there must be a greater force **UP** on the **bottom** surface than there is **down** on the **top** surface * This makes it logical that any **submerged** object will experience a net **upward** force--* * because of the **_PRESSURE DIFFERENTIAL!!_***

Question 35

The Buoyant Force 1. How does the buoyant force change with **depth** (h) ? 2. How does the buoyant force change with the **mass** (m) of the object? HINT: Think of the formula..."**FB PUG**" (facebook pug)

Answer 35

**1.)** ***Buoyant force does _NOT_ change with depth!*** * Depth (h) is **NOT** in the formula ( F = ρvg ) * Therefore, we can confidently conclude that depth does **NOT** change buoyant force * Whether the depth is shallow or very large, the **pressure difference** between ρgh-**top** and ρgh-**bottom** will remain the **SAME** **2.)** ***Buoyant force does** **_NOT_** **change with depth!*** Similarly, we can say that the **mass** of the object does **NOT** affect buoyant force * Like depth, it is **NOT** in the formula * Nor is it accounted for by our understanding of what causes the buoyant force **Remember: It's all about u**