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Related Rates - The Railroad Intersection (2 of 2): Better Approach
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Classroom Contents
Related Rates and Applications of Derivatives
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- 1 CSMA/CD - Collision Procedure
- 2 CSMA/CD Overview
- 3 Introduction to Related Rates
- 4 Related Rates - Balloon
- 5 Related Rates - Inverted Cone
- 6 Why Radians?
- 7 Related Rates - Shadow
- 8 Related Rates - Slipping Ladder
- 9 Related Rates: Flying Plane
- 10 Related Rates - Boat w/ Trig
- 11 Account Management
- 12 Assigning Rights: File Privileges
- 13 Assigning Rights: Peripherals
- 14 Related Rates: Police Car (Better Approach)
- 15 Related Rates: Police Car (Flawed Approach)
- 16 Related Rates: Police Car (Implicit)
- 17 Related Rates: Unit Circle
- 18 Primitives and Rates of Change (Example 1)
- 19 Primitives and Rates of Change (Example 2)
- 20 The Wine Glass (1 of 4): Pouring the Water
- 21 The Wine Glass (2 of 4): Initial Observations
- 22 The Wine Glass (3 of 4): Conclusions from Calculus [dh/dt in terms of height]
- 23 The Wine Glass (4 of 4): Conclusions from Calculus [dh/dt in terms of time]
- 24 Related Rates - The Leaking Trough
- 25 Related Rates - The Railroad Intersection (1 of 2): Flawed Approach
- 26 Related Rates - The Railroad Intersection (2 of 2): Better Approach
- 27 Understanding Rates: Relationships Between Quantities
- 28 Exam Problem: The Coin Shadow
- 29 Mathematical Induction (2 of 3: Assumption step and Proving inequality)
- 30 Rates of Change (1 of 3: Calculating Related Rates)
- 31 Rates of Change (2 of 3: Using Volume, Area and other formulae and chain rule to find related rates)
- 32 Rates of Change (3 of 3: Using Chain Rule to solve for the rate of change in area)
- 33 Harder Rates of Change Question (1 of 2: Extrapolating information from question to find solution)
- 34 Harder Rates of Change Question (2 of 2: Using Differentiation and Chain Rule to find solution)
- 35 Rates of Change (2 of 4: Using a second diagram to find r in terms of h for a SA relation)
- 36 Rates of Change (3 of 4: Using Chain Rule to find the change of height over time)
- 37 Rates of Change (4 of 4: Integrating to find the height of the 'puddle')
- 38 Exponential Growth and Decay (1 of 4: Representing growth in proportion to size of population)
- 39 Exponential Growth and Decay (2 of 4: Satisfying the DE by integration/differentiation)
- 40 Exponential Growth and Decay (3 of 4: Working through an introductory example of Exponential Growth)
- 41 Exponential Growth and Decay (4 of 4: Working through Harder Exponential Growth Question)
- 42 Modified Growth and Decay (1 of 2: Differences between modified and exponential growth and decay)
- 43 Modified Growth and Decay (2 of 2: Solving an example of Modified Decay [of temperature])
- 44 Modified Growth and Decay: Capped Population (Finding the Differential Equation for modified decay
- 45 Straight Line Motion & Average Velocity (simple example)
- 46 Acceleration as a Function of Velocity (1 of 2: Introductory example)
- 47 Acceleration as a Function of Velocity (2 of 2: Simple resistance)
- 48 Harder Motion (1 of 2: Finding the time it takes for Particle A to hit origin)
- 49 Harder Related Rates (1 of 3: Finding the velocity of the car in terms of time and its acceleration)
- 50 Harder Related Rates (2 of 3: Finding Displacement of car and truck and truck's velocity)
- 51 Harder Related Rates (3 of 3: How far does the car have to be to overtake as quickly as possible)
- 52 Related Rates of a Balloon (1 of 3: Describing the situation)
- 53 Related Rates of a Balloon (2 of 3: Introducing the derivatives)
- 54 Related Rates of a Balloon (3 of 3: Evaluating a rate of change)
- 55 Related Rates of a Shrinking Cube
- 56 Related Rates of Change: Overall Strategy
- 57 Related Rates of Change - Slipping Ladder (1 of 2: Establishing the scenario)
- 58 Related Rates of Change - Slipping Ladder (2 of 2: Working the equations)
- 59 Related Rates of Change - Shifting Shadow (1 of 2: Understanding the problem)
- 60 Related Rates of Change - Shifting Shadow (2 of 2: Manipulating the derivatives)
- 61 Exponential Growth Rates (1 of 2: Instantaneous)
- 62 Exponential Growth Rates (2 of 2: Average)
- 63 Growth/Decay with Environmental Factors (1 of 2: Difference in equations)
- 64 Growth/Decay with Environmental Factors (2 of 2: Example question)
- 65 Growth & Decay - Saltwater/Freshwater Problem (1 of 3: Understanding the constants)
- 66 Growth & Decay - Saltwater/Freshwater Problem (2 of 3: Applying calculus)
- 67 Growth & Decay - Saltwater/Freshwater Problem (3 of 3: Interpreting the situation)
- 68 Optimisation Problem with Interacting Rates (1 of 3: Assembling the information)
- 69 Optimisation Problem with Interacting Rates (2 of 3: Creating the mathematical model)
- 70 Optimisation Problem with Interacting Rates (3 of 3: The most efficient speed)
