Showing videos from Eddie Woo with a total of 4,051 videos

Significant Figures (2 of 2: Determining the most significant number)08:56
Significant Figures (2 of 2: Determining the most significant number)
3y0m ago
Timelapse Illustration (Volume by Similar Cross-Section)00:30
Timelapse Illustration (Volume by Similar Cross-Section)
3y0m ago
Significant Figures (1 of 2: Introduction to significant figures as an approximation tool)12:00
Significant Figures (1 of 2: Introduction to significant figures as an approximation tool)
3y0m ago
Recurrence Relations (4 of 4: Integration by parts with definite integrals)04:49
Recurrence Relations (4 of 4: Integration by parts with definite integrals)
3y0m ago
Recurrence Relations (3 of 4: Applying to Trigonometric Functions raised to power of n)11:19
Recurrence Relations (3 of 4: Applying to Trigonometric Functions raised to power of n)
3y0m ago
Recurrence Relations (2 of 4: Considering if the question consists of some arbitrary power of n)10:23
Recurrence Relations (2 of 4: Considering if the question consists of some arbitrary power of n)
3y0m ago
Highway (CTHS Talent Quest 2016)03:42
Highway (CTHS Talent Quest 2016)
3y0m ago
Recurrence Relations (1 of 4: Introduction to Recurrence relations with introductory examples)07:58
Recurrence Relations (1 of 4: Introduction to Recurrence relations with introductory examples)
3y1m ago
Integration with t Results (2 of 2: Simplifying the integral before applying t results)07:47
Integration with t Results (2 of 2: Simplifying the integral before applying t results)
3y1m ago
Integration with t Results (1 of 2: Changing the variable to solve with t results)06:16
Integration with t Results (1 of 2: Changing the variable to solve with t results)
3y1m ago
Integration by Parts (What to choose for u and dv for integration by parts?)07:44
Integration by Parts (What to choose for u and dv for integration by parts?)
3y1m ago
Integration by t results (Explanation of Harder Question)04:24
Integration by t results (Explanation of Harder Question)
3y1m ago
Integration by Parts (3 of 3: Integral of sin¯¹(x))09:39
Integration by Parts (3 of 3: Integral of sin¯¹(x))
3y1m ago
Integration by Parts (2 of 3: How to choose u & dv)08:14
Integration by Parts (2 of 3: How to choose u & dv)
3y1m ago
Integration by Parts (1 of 3: Deriving the Formula)05:05
Integration by Parts (1 of 3: Deriving the Formula)
3y1m ago
Mathematics General Preliminary Exam Review (2 of 2: Investing Money)12:42
Mathematics General Preliminary Exam Review (2 of 2: Investing Money)
3y1m ago
Mathematics General Preliminary Exam Review (1 of 2: Èarning Money)08:08
Mathematics General Preliminary Exam Review (1 of 2: Èarning Money)
3y1m ago
Integration with t-results (2 of 2: Dealing with the integral in t)07:42
Integration with t-results (2 of 2: Dealing with the integral in t)
3y1m ago
Integration with t-results (1 of 2: Changing the variable of integration)10:49
Integration with t-results (1 of 2: Changing the variable of integration)
3y1m ago
Proving a Result from the Standard Integrals (3 of 3: Using Partial Fractions to simplify sec)11:28
Proving a Result from the Standard Integrals (3 of 3: Using Partial Fractions to simplify sec)
3y1m ago
Proving a Result from the Standard Integrals (2 of 3: Substituting tan to simplify the integral)07:23
Proving a Result from the Standard Integrals (2 of 3: Substituting tan to simplify the integral)
3y1m ago
Proving a Result from the Standard Integrals (1 of 3: Differentiate, Hence Integrate Proof)08:13
Proving a Result from the Standard Integrals (1 of 3: Differentiate, Hence Integrate Proof)
3y1m ago
Harder Reverse Chain Rule Integral (Using a Substitution and Restrictions to evaluate)07:20
Harder Reverse Chain Rule Integral (Using a Substitution and Restrictions to evaluate)
3y1m ago
Using a Substitution to turn an area under an ellipse into an area under a circle to Evaluate04:10
Using a Substitution to turn an area under an ellipse into an area under a circle to Evaluate
3y1m ago
Partial Fractions & Integration (Using Partial Fractions to simplify an integral for evaluation)06:08
Partial Fractions & Integration (Using Partial Fractions to simplify an integral for evaluation)
3y1m ago
Further Integration [Continued] (3 of 3: 'Breaking Apart' Integrals to simplify for integration)04:49
Further Integration [Continued] (3 of 3: 'Breaking Apart' Integrals to simplify for integration)
3y1m ago
Using General Solutions to graph cosy=cosx07:22
Using General Solutions to graph cosy=cosx
3y1m ago
Further Integration [Continued] (2 of 3: Adding and subtracting a constant to simplify integral)06:17
Further Integration [Continued] (2 of 3: Adding and subtracting a constant to simplify integral)
3y1m ago
Further Integration [Continued] (1 of 3: Using Double Angle & Completing the Square to integrate)10:49
Further Integration [Continued] (1 of 3: Using Double Angle & Completing the Square to integrate)
3y1m ago
Extension I Quiz (Differentiation of Trig, Integration with Substitution, Newton's Method & Volumes)06:38
Extension I Quiz (Differentiation of Trig, Integration with Substitution, Newton's Method & Volumes)
3y1m ago
Fractions, Percentages & Decimals (3 of 3: Calculating Percentages from Fractions)10:08
Fractions, Percentages & Decimals (3 of 3: Calculating Percentages from Fractions)
3y1m ago
Fractions, Percentages & Decimals (2 of 3: Limitations of Fractions & Introduction to Percentages)05:24
Fractions, Percentages & Decimals (2 of 3: Limitations of Fractions & Introduction to Percentages)
3y1m ago
Fractions, Percentages & Decimals (1 of 3: Reviewing addition and multiplication of fractions)06:54
Fractions, Percentages & Decimals (1 of 3: Reviewing addition and multiplication of fractions)
3y1m ago
Further Integration (2 of 2: Integrating Trig Functions without given substitution)08:38
Further Integration (2 of 2: Integrating Trig Functions without given substitution)
3y1m ago
Further Integration (1 of 2: Brief Overview of Extension II Integration)05:48
Further Integration (1 of 2: Brief Overview of Extension II Integration)
3y1m ago
The Unitary Method04:57
The Unitary Method
3y1m ago
Harder Inverse Functions Question (2 of 2: Finding a pattern to make it work for negative numbers)12:51
Harder Inverse Functions Question (2 of 2: Finding a pattern to make it work for negative numbers)
3y1m ago
Harder Inverse Functions Question (1 of 2: Restricting the Domain to get a Inverse Function)11:20
Harder Inverse Functions Question (1 of 2: Restricting the Domain to get a Inverse Function)
3y1m ago
Geometry of Inverse Trigonometric Functions (2 of 2: Finding Gradient Function and plotting points)11:26
Geometry of Inverse Trigonometric Functions (2 of 2: Finding Gradient Function and plotting points)
3y1m ago
Geometry of Inverse Trigonometric Functions (1 of 2: Establishing the Domain and Symmetry)09:46
Geometry of Inverse Trigonometric Functions (1 of 2: Establishing the Domain and Symmetry)
3y1m ago
General Solution [Continued] (3 of 3: Converting into sinx instead of cosx)05:59
General Solution [Continued] (3 of 3: Converting into sinx instead of cosx)
3y1m ago
General Solution [Continued] (2 of 3: Manipulating a trig function to find the general solution)06:28
General Solution [Continued] (2 of 3: Manipulating a trig function to find the general solution)
3y1m ago
General Solution [Continued] (1 of 3: Generalising the solution of sin5x = sinx)15:52
General Solution [Continued] (1 of 3: Generalising the solution of sin5x = sinx)
3y1m ago
[Behind the Scenes] Cutting a Clip01:49
[Behind the Scenes] Cutting a Clip
3y1m ago
Dividing Fractions (2 of 2: Introduction to Division of Fractions with some introductory examples)11:18
Dividing Fractions (2 of 2: Introduction to Division of Fractions with some introductory examples)
3y1m ago
Dividing Fractions (1 of 2: Reviewing Division to find fractions and Mixed Numerals)06:09
Dividing Fractions (1 of 2: Reviewing Division to find fractions and Mixed Numerals)
3y1m ago
General Solution (3 of 3: Finding the general solution for sinx & Why is it the hardest?)09:31
General Solution (3 of 3: Finding the general solution for sinx & Why is it the hardest?)
3y1m ago
General Solution (2 of 3: Finding the General Solution for cosx)06:30
General Solution (2 of 3: Finding the General Solution for cosx)
3y1m ago
General Solution (1 of 3: Introduction to General Solutions and finding general solution of tanx)10:37
General Solution (1 of 3: Introduction to General Solutions and finding general solution of tanx)
3y1m ago
Harder Integration by Substitution (3 of 3: Using another substitution to find the solution)13:41
Harder Integration by Substitution (3 of 3: Using another substitution to find the solution)
3y1m ago
Harder Integration by Substitution (2 of 3: Dealing with implied restrictions within the Question)13:11
Harder Integration by Substitution (2 of 3: Dealing with implied restrictions within the Question)
3y1m ago
Harder Integration by Substitution (1 of 3: Substituting a tan function to simplify the Integration)10:42
Harder Integration by Substitution (1 of 3: Substituting a tan function to simplify the Integration)
3y1m ago
Integration of Square Root Function (2 of 2: What is this kind of integral solving for?)09:12
Integration of Square Root Function (2 of 2: What is this kind of integral solving for?)
3y1m ago
Integration of Square Root Function (1 of 2: Using a Trig Substitution to help with integration)14:14
Integration of Square Root Function (1 of 2: Using a Trig Substitution to help with integration)
3y1m ago
Extension I Quiz (Differentiation of Trig, Integration, Cosine Rule and Geometry)13:23
Extension I Quiz (Differentiation of Trig, Integration, Cosine Rule and Geometry)
3y1m ago
Integration by Substitution (4 of 4: Applying the substitution to a definite integral)13:40
Integration by Substitution (4 of 4: Applying the substitution to a definite integral)
3y1m ago
Integration by Substitution (3 of 4: Applying the substitution on a harder example)04:04
Integration by Substitution (3 of 4: Applying the substitution on a harder example)
3y1m ago
Integration by Substitution (2 of 4: Doing the same Question with a simple substitution of 'u')11:37
Integration by Substitution (2 of 4: Doing the same Question with a simple substitution of 'u')
3y1m ago
Integration by Substitution (1 of 4: Integrating (1-4x^2)^1/2 without Substitution)05:41
Integration by Substitution (1 of 4: Integrating (1-4x^2)^1/2 without Substitution)
3y1m ago
Inequality Proof: Summing Reciprocals of Squares (Experimental Silent Screencast)03:45
Inequality Proof: Summing Reciprocals of Squares (Experimental Silent Screencast)
3y1m ago
Calculus with ITFs (3 of 3: Integrating cos¯¹(x) to find the area under a set domain)10:17
Calculus with ITFs (3 of 3: Integrating cos¯¹(x) to find the area under a set domain)
3y1m ago
Calculus with ITFs (2 of 3: Generalising the derivative of tan¯¹(x) & the derivative of cos¯¹(x))09:10
Calculus with ITFs (2 of 3: Generalising the derivative of tan¯¹(x) & the derivative of cos¯¹(x))
3y1m ago
Calculus with ITFs (1 of 3: Generalising the derivative of the Basic Inverse sine function)08:07
Calculus with ITFs (1 of 3: Generalising the derivative of the Basic Inverse sine function)
3y1m ago
Differentiation of Inverse Trig Functions (2 of 2: Maximum Optimisation for Inverse Trig Function)11:11
Differentiation of Inverse Trig Functions (2 of 2: Maximum Optimisation for Inverse Trig Function)
3y1m ago
Differentiation of Inverse Trig Functions (1 of 2: Dealing with a Hidden Condition in the Question)08:53
Differentiation of Inverse Trig Functions (1 of 2: Dealing with a Hidden Condition in the Question)
3y1m ago
Differentiation of ITFs (3 of 3: Finding the Condition that make d/dx(sin¯¹(x)) what it actually is)10:16
Differentiation of ITFs (3 of 3: Finding the Condition that make d/dx(sin¯¹(x)) what it actually is)
3y1m ago
Differentiation of ITFs (2 of 3: Using Trig Identities to find the derivative of tan¯¹(x))07:05
Differentiation of ITFs (2 of 3: Using Trig Identities to find the derivative of tan¯¹(x))
3y1m ago
Differentiation of ITFs (1 of 3: Predicting the properties of d/dx(tan¯¹(x)))09:41
Differentiation of ITFs (1 of 3: Predicting the properties of d/dx(tan¯¹(x)))
3y1m ago
Properties of Graphs of I.T.Fs (3 of 3: Showing the Relationship between original & Compound)12:43
Properties of Graphs of I.T.Fs (3 of 3: Showing the Relationship between original & Compound)
3y1m ago
Properties of Graphs of I.T.Fs (2 of 3: Finding the solution to the compound function of arc(trig)x)04:42
Properties of Graphs of I.T.Fs (2 of 3: Finding the solution to the compound function of arc(trig)x)
3y1m ago
Slomo Dominoes00:14
Slomo Dominoes
3y1m ago
Properties of Graphs of I.T.Fs (1 of 3: Graphically and Algebraically Solving sin¯¹x + cos¯¹x = ?)09:11
Properties of Graphs of I.T.Fs (1 of 3: Graphically and Algebraically Solving sin¯¹x + cos¯¹x = ?)
3y1m ago