Virtually Passed
Conservation of Momentum Proof
If there are no external forces acting on the system then conservation of linear momentum applies
Professor Dave Explains
The Divergence Theorem
Green's Theorem gave us a way to calculate a line integral around a closed curve. Similarly, we have a way to calculate a surface integral for a closed surface. That's the Divergence Theorem. This is also known as Gauss's Theorem, and...
Flipping Physics
From Power to Work using an Integral – Example
Example: The net power delivered to an object is described by the equation, net power equals 4.00 t squared plus time, watts. Determine the net work done on the object from 0 to 4.00 seconds. Want Lecture Notes?...
Brian McLogan
Find the area between the two curves and vertical lines
👉 Learn how to evaluate the integral of a function. The integral, also called antiderivative, of a function, is the reverse process of differentiation. Integral of a function can be evaluated as indefinite integral or as a definite...
Professor Dave Explains
Double and Triple Integrals
An introduction to multivariable calculus in the way of double and triple integrals.
Virtually Passed
Conservation of Energy Part 3: Gravitational Potential Energy
Here I derive the work done due to gravity and also define GPE = mgh
msvgo
Evaluation of Definite Integrals by Substitution
It explains the method of substitution to evaluate definite integral.
Catalyst University
Partial Derivatives: Total Differentials
Partial Derivatives: Total Differentials
Virtually Passed
Work Energy proof part 2 - gravitational potential energy
In this video I prove that the work done by the force due to gravity (assumed to be constant and downwards) is equal to the change in gravitational potential energy.
Flipping Physics
Work done by a Spring - Deriving Elastic Potential Energy
When we place a 1.00 kg mass on a spring, the end of the spring moves from the 34.4 cm mark to the 30.2 cm mark and comes to rest. (a) What is the spring constant of the spring? (b) What is the work done by the spring on the mass? Want...
Flipping Physics
Demonstrating Impulse is Area Under the Curve
Demonstrating, measuring and showing Impulse is Area Under the Force vs. Time Curve
Brian McLogan
Calc Unit 4 Learn how to take the integral with a fraction power
Calc Unit 4 Learn how to take the integral with a fraction power
Brian McLogan
Calculus Unit 4 Sum and Difference of definite integrals
Calculus Unit 4 Sum and Difference of definite integrals
Curated Video
Probability Distributions: Discrete and Continuous
This video provides an introduction to continuous probability distributions and probability density functions for a continuous random variable. The presenter explains the difference between discrete and continuous probability...
Professor Dave Explains
The Mean Value Theorem For Integrals: Average Value of a Function
Defining the mean value theorem for integrals.