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Description


Year 12 Maths Methods (Units 3 & 4)

Maths Methods Video Tutorials


Save study time with short, engaging and comprehensive video tutorials

 

Over 450+ practice questions to ensure you fully understand the fundamentals

 

Simple explanations of every topic in year 12 Maths Methods


Enrol Now | $199 $149







How do these tutorials help?

 
  

 

Enrol Now | $199 $149





 

“The videos are fantastic!

They are probably the only thing that helped me pass my methods end of year exam.

G.M, Student

 







450+ Basic Practise Questions

 
  

 

Enrol Now | $199 $149










Two ways to use these tutorials:

 

Year 12 unit 3 and 4 VCE Maths Methods Video Tutorials

 


1) Watch a short tutorial on the topic that they are currently struggling with.

Their time is limited and they might just need to understand one vital topic. Each video tutorial is designed to fill the gaps that they didn’t even know they had and are laid out logically so that they can easily find what they are looking for.

 

2) Spend 10 minutes a week to keep ahead of the class

Watching as little as 10 minutes a week will help prepare students for their upcoming classes. Learning the basics beforehand helps them become more focused at school and pick up the pieces of information they would have otherwise missed.








As little as 10 minutes per week!

 


 

Enrol Now | $199 $149













  Highly qualified educator


Degrees in Mathematics/Astrophysics,


10 years of experience in education


Specialises in teaching VCE Maths Methods

Year 12 unit 3 and 4 VCE Maths Methods Video Tutorials












How useful are these Maths Methods video tutorials?

   


Enrol Now | $199 $149










This is what they will receive:

 

Full access to these video tutorials until December 31st, 2020

 

Over 450+ practice questions with complete step-by-step solutions

 

24/7 access on any device with an internet connection

 

Helpful for VCE/WACE/SACE/TCE

 

Scroll down below for the full list of tutorials

 

Enroll Now | $199 $149









Teachers, Parents and Students love these tutorials



 

MKSize - Wendy Taylor

Dr. Taylor, Head of Mathematics at Bentleigh Secondary:

 
"I was thrilled to see the videos that Alex Bell put together, they are informative, highly visual and super engaging! They offer students who can’t access the content an alternate entry point, while also being valuable for more capable students who would benefit from a deeper understanding of the ideas behind the skills they are carrying out."

 


MKSize - Ruth

“This has made life so much better!

Thanks so much, seriously this has made life so much better! The amount of people I have recommended the program to is crazy. I found it so helpful and so did they!"

Ruth, VCE Maths Methods Student

 


Mubin Kazi

“93% in both my methods exams!

Hey Alex, I went pretty well! Averaged around 85-90% throughout the year and got 93% in both my methods exams at the end of the year! This overview definitely helped when making end of year notes and reference book :D

Mubin, VCE Maths Methods Student

 




 Click below to get started

Take This Course $199 $149

Lessons

LINEAR EQUATIONS

1. Really Basic Stuff

2. How to Draw Linear Equations

3. Parallel, Perpendicular and Literal Lines

4. Midpoints, Length, Line Segments and Angles

5. Simultaneous Equations

MATRIX

1. Really Basic Stuff

2. Determinant and Inverse

3. Simultaneous Equations

PARABOLAS & QUADRATICS

1. Really Basic Stuff

2. Simple Transformations

3. Quadratic Formula and Square Roots

4. 3 Main Ways to Draw Parabolas

5. How to Factorise Quadratics

BASICS OF FUNCTIONS & RELATIONS

1. How to Read Relations

2. Domain and Range

3. How to Read Functions

4. Transformations – Functions and Points

5. Transformations – Using Matrices

6. Transformations – Series of Transformations

HOW TO SKETCH ANY FUNCTION

1. Translation – Moving Functions

2. Stretching and Reflecting

3. Sketching in Intercept Form

4. Summary

5. How to Find Any Domain

6. Cubics, Quartics and Other Polynomials

7. How to Factorise Polynomials

8. Sketching Fraction Powers

COMPOSITE FUNCTIONS f(g(x))

1. Introduction to Composite Functions

2. Finding the Domain of f(g(x))

3. Restricting f(g(x)) so it Works

4. Working Out f(g(x)) in Full

TYPES OF FUNCTIONS

1. One to One, Many to One, Hybrid, Odd and Even

2. Sum and Product

3. Inverse Functions

4. Summary

LOGS AND EXPONENTIALS

1. Exponential Laws (Power Laws)

2. What are Logarithms?

3. Log Laws

4. Using Log Laws

5. Sketching Logs and Exponentials

6. Understanding Euler’s Number (e)

SIN, COS & TAN

1. Definitions of Sin and Cos

2. The Unit Circle

3. What are Radians?

4. Using Radians

5. Proving Exact Values

6. How to Find Exact Values

7. Finding θ

8. Example of finding θ

9. Understanding the Graphs of Sin, Cos & Tan

10. Sketching Sin, Cos & Tan

11. Example of Sketching Cosθ

CALCULUS

1. What You Need to Know Before Calculus

2. Definition of Calculus

3. The First Principle

4. How to Graph f'(x)

5. Finding the derivitive – f'(x) of x, e, Log, Cos, Sin and Tan

6. f'(x) Graphs for Parabolas, Cubics and Quartics

7. Symbols and Terminology

8. The Chain Rule

9. Product and Quotient Rules

10. Continuous, Differentiable and Limits

11. Equation of the Tangent and Normal

12. Rates of Change

SKETCHING ANY GRAPH (using calculus)

1. Types of Stationary Points

2. How to Find Stationary Points

3. How to Sketch Any Graph Using Calculus

ANTIDIFFERENTIATION

1. Definition of Antidifferentiation

2. Symbols of Antidiff

3. Basics Ways to Antidiff Stuff

4. Tougher Antidiffs

5. Approximate Area

6. Understanding Exact Area

7. Integration – Finding Exact Area

8. Area Between Curves and Average Value

9. Kinematics – Velocity, Acceleration and stuff

PROBABILITY BASICS

1. Probability Basics

2. Conditional Probability Basics

DISCRETE RANDOM VARIABLES

1. Random Variables

2. Discrete Random Variables

3. Discrete Random Variables – Measuring Centre

4. Discrete Random Variables – Measuring Spread

5. Binomial Random Variables – Bernoulli and Binomial Distribution

6. Binomial Random Variables – More complex Binomials

7. Binomial Random Variables – Expected Value, Variance and Standard Deviation

CONTINUOUS RANDOM VARIABLES

1. Basics of Continuous Random Variables

2. Conditional Probability and Using Limits

3. Measures of Center

4. Measuring Spread

5. Normal Distribution

6. Normal Distribution – Using Standard Normal Distributions

7. Normal Distribution – Z-Value Formula

8. Normal Distribution – Using the Calculator

9. Normal Distribution – A More Complex Question

10. Normal Distribution – Conditional Probability

STATISTICS

1. What are statistics?

2. Sampling Distibutions

3. Mean and Standard Deviation

4. Large Populations

5. Normal Approximations of Binomials

6. Confidence Intervals

7. Margin of Error

The key to doing well on SACs and Exams

Questions

  • The answer for 3 is wrong
  • Reply
  • Error in Video #5 Normal distribution
  • Brackets on the log?
  • Wrong Answers?
  • What does the 'useful rule' find?
  • More in depth?
  • What happens to the constant?
  • Can it be said for a line that is undefined that its gradient is any number?
  • Can it be said for a line that is undefined that its gradient could be any number? Or does it just not have a number?
  • Question 1
  • Finding the transformation matrix that takes one function to another
  • No videos
  • maths method online video tutorials
  • Simultaneous equation
  • Finding intercepts
  • Hi there! Today I had a SAC and got asked a question similar to this example and was wondering how different the process had to be...the question reads: a bag has 4Red, 2Yellow, 5Green and 4Blue balls, the sample size is 4, construct a distribution...that's 4 different colors! Please let me know how to approach something like this :)
  • Is there a mistake for the final normal equation?
  • Got it
  • Okay, so if I had sin(2x) = 1. How would I find the solutions across a domain of like [0,4PI]? How do I deal with the positive/negative values at 0,PI/4, PI/2, 3PI/2 or 2PI?
  • Shouldn't the domain be equal to the number of solutions?
  • Question 1 B
  • More advanced derivative of e tips?
  • Addition of ordinates

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