Customised to your university

Unlimited access to thousands of video tutorials and study guides

Three personal video answers from our expert tutors

Customisable to your university, with new modules created daily

No commitment – cancel anytime

No results were found...

Introduction

10m 15s

Technique 1 Substitution

11m 56s

Technique 2 Factoring

22m 43s

Technique 3 Multiplying by the Conjugate

48m 59s

Technique 4 Function Tends to Infinity

29m 4s

Technique 5 X Tends to Infinity

1h 43m 50s

Technique 6 Eulers Limit

54m 36s

Technique 7 Trigonometric Limits

59m 39s

Technique 8 The Sandwich Squeeze Theorem

51m 20s

Technique 9 Piecewise Functions

21m 37s

Limit from Definition

2h 25m 5s

Basic Derivatives of Functions

1h 52m 42s

Derivative of Exponents and Logarithmic Functions

53m 36s

Trigonometric Derivatives

36m 58s

Derivative of Power Functions

1h 29m 38s

Implicit Differentiation

1h 31m 12s

Calculations Using The Definition of Derivative

49m 55s

The Derivative of an Inverse of a Function

11m 35s

Logarithmic Differentiation

31m 26s

Tangent and Normal Lines - Basic Exercises

2h 31m 26s

Tangent and Normal Lines of Implicit Functions

27m 8s

Tangent and Normal lines - Parametric Functions

17m 20s

The Angle Between Two Curves

25m 47s

Vertical Tangents and Cusps

44m 29s

Linear Approximation

31m 10s

Tangent and Normal Lines – Exercises with a Constant

1h 29m 47s

Summarizing Questions

12m 40s

Missing X or Y, Reduction of Order

39m 39s

Linear, Homogeneous, Constant Coefficients

20m 10s

Linear, Nonhomogeneous, Constant Coefficients - Method of Undetermined Coefficients

1h 30m 47s

Linear, Nonhomogeneous, Constant Coefficients - Method of Variation of Parameters

1h 16m 18s

Eulers Equation

18m 23s

Linear, Homogeneous, Non-Constant Coefficients - 2nd Solution Method

41m 33s

The Wronskian and its Uses

57m 53s

Sturm-Liouville Problems

1h 51m 59s

Taylor and Maclaurin Series

1h 14m 51s

Basic Exercises with Maclaurin Series

54m 9s

Expansions about General Point

22m 47s

Finding Nonzero Terms in Expansions

37m 11s

Sum of Series Using Taylor and Maclaurin Expansions

21m 53s

Finding Limits Using Expansions

27m 8s

Computations with Taylor Series

1h 6m 55s

Piecewise Continuous Function, Integral of an Even or Odd Function

8m 15s

Real Fourier Series

25m 30s

Complex Fourier Series

19m 45s

Parseval Identity

49m 59s

Riemann Lebesgue Lemma

9m 22s

Dirichlet's Theorem

38m 34s

Even and Odd Extensions

10m 18s

Differentiation and Integration of Fourier Series

1h 51m 36s

Uniform Convergence of Fourier Series

24m 48s

Fourier Series on a General Interval

1h 9m 32s

Summarizing Exercises

46m 34s

Energy Conservation and the Work Energy Theorem Part a

31m 15s

Energy Conservation and the Work Energy Theorem Part b

14m 29s

Work Done by a Constant Force

7m 27s

Explanation about the Integral of Work

9m 10s

How to Calculate the Integral of a Non Constant Force

1m 20s

Deriving Work and Energy Equations

21m 18s

Calculating Conservative Forces from Potential Energy

6m 45s

How to Check if a Force is Conservative

5m 7s

10. Calculating Potential Energy from Conservative Forces

10m 11s

Find a customized module to your university

Our award-winning technology means that we can customise this general module to your exact university syllabus in minutes. When we know where you study, we can make sure you get exactly the material you need to succeed.

Go to the general module

Lecturers

Meny Gabbay is a longtime lecturer at the Shenkar College of Engineering and Design, one of Israel’s premier design schools. He earned his Bachelor of Science in Physics, Magna Cum Laude, from Ben Gurion University and a Master in Science Teaching and learning from Tel Aviv University.

Featured review

"I loved using Proprep to improve my grades in Maths and Chemistry, and I'd recommend it for every STEM student who wants to learn in their own time."

"I’m very impressed with the customised STEM videos and resources created by Proprep, for a fraction of the price for an online tutor."

"Proprep is amazing, giving you filtered content based on your university, course and even your modules. I've learnt so much - thank you!"

"Best platform for STEM students trying to find helpful resources online. Would highly recommend!"

"Amazing platform, simple to use, very helpful for any STEM student at university. Great value for money!"

"Amazing service that provided me with video tutorials specific to my university course and modules; I found the exercises to be extremely helpful."

"Very straightforward to use, great enhancement to online learning. Highly recommend!"

"Proprep is a super affordable and useful product for all STEM students. Catered specifically to your course, it makes learning really straightforward."

"Amazing service that provided me with video tutorials that are a great help to my studies. Definitely would recommend!"

"My experience with Proprep has been nothing but amazing. I found it extremely useful for both exams and completing my coursework throughout the term."

Unlimited access to thousands of video tutorials and study guides

Three personal video answers from our expert tutors

Customisable to your university, with new modules created daily

No commitment – cancel anytime

Start your 14-day free trial

Students like you also viewed

Frequently Asked Questions

Proprep was founded by professors who understand the challenges students face, and our team works around the clock to create high-quality material that will empower you to maximise your academic potential. All resources are created by our team of educators, each with over ten years of teaching experience, and are accessible anytime and from any device. As well as the general courses available on the Proprep platform, our award-winning technology allows us to create personalised learning materials that correspond to your exact university syllabus. We have a proven track record of success, having helped over 500,000 students worldwide to succeed in STEM to date!

Proprep’s 30-day guarantee enables you to cancel your subscription at any point within the first month of use. Just contact our customer service team (s[email protected]) and they’ll make sure you get your money back.

You can upload your syllabus or other lecture materials to improve the quality of our resources and help us personalise them to your modules

Module added

You are **currently limited** to viewing 1 minute previews. Upgrade your account to get full access.

- 20 000+ video hours and exercises
- Downloadable resources
- Access all our learning content
- Created by world-class professors
- No commitment - cancel anytime

We couldn't find any results for

Upload your syllabus now and our team will create a customized module especially for you!

Alert

and we will create a personalized module (just for you) in less than **48 hours...**