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Calculus Basics is yet another “Teacher’s Choice” course from Teachers Training for a complete understanding of the fundamental topics. You are also entitled to exclusive tutor support and a professional CPD-accredited certificate in addition to the special discounted price for a limited time. Just like all our courses, this Calculus Basics and its curriculum have also been designed by expert teachers so that teachers of tomorrow can learn from the best and equip themselves with all the necessary skills.

Consisting of several modules, the course teaches you everything you need to succeed in this profession.

The course can be studied part-time. You can become accredited within 16 hours studying at your own pace. Your qualification will be recognised and can be checked for validity on our dedicated website.

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Entry Requirements

No formal entry requirements. You need to have:

  • Passion for learning
  • A good understanding of the English language
  • Be motivated and hard-working
  • Over the age of 16.

Certification

CPD Certification from The Teachers Training

Successfully completing the MCQ exam of this course qualifies you for a CPD-accredited certificate from The Teachers Training. You will be eligible for both PDF copy and hard copy of the certificate to showcase your achievement however you wish.

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  • Hard copy certificates are also available, and you can get one for only £10.99
  • You can get both PDF and Hard copy certificates for just £12.99!

The certificate will add significant weight to your CV and will give you a competitive advantage when applying for jobs.

Course Curriculum

Unit 01: Supplements
1.1 Number Sets 00:10:00
1.2 Graphing Tools 00:06:00
Unit 02: Functions
2.1 Introduction 00:01:00
2.2 Functions 00:15:00
2.3 Evaluating a Function 00:13:00
2.4 Domain 00:16:00
2.5 Range 00:05:00
2.6 One to One Function 00:09:00
2.7 Inverse Functions 00:10:00
2.8 Exponential Functions 00:05:00
2.9 The Natural Exponential Function 00:06:00
2.10 Logarithms 00:13:00
2.11 Natural Logarithms 00:07:00
2.12 Logarithm Laws 00:06:00
2.13 Trigonometric Ratios 00:15:00
2.14 Evaluating Trig Functions and Points 00:18:00
2.15 Inverse Trigonometric Functions 00:12:00
Unit 03 Limits
3.1 Introduction 00:01:00
3.2 What is a Limit? 00:17:00
3.3 Examples 00:15:00
3.4 One-Sided Limits 00:12:00
3.5 The Limit Laws 00:08:00
3.6 Examples 00:15:00
3.7 More Examples 00:15:00
3.8 The Squeeze (Sandwich) Theorem 00:09:00
3.9 Examples 00:10:00
3.10 Precise Definition of Limits 00:08:00
3.11 Examples 00:15:00
3.12 limits at Infinity 00:21:00
3.13 Examples 00:15:00
3.14 Asymptotes and Limits at Infinity 00:10:00
3.15 Infinite Limits 00:12:00
Unit 04: Continuity
4.1 Introduction 00:01:00
4.2 Continuity 00:12:00
4.3 Types of Discontinuity 00:12:00
4.4 Examples 00:17:00
4.5 Properties of Continuous Functions 00:11:00
4.6 Intermediate Value Theorem for Continuous Functions 00:06:00
Unit 05: Derivatives
5.1 Introduction 00:01:00
5.2 Average Rate of Change 00:09:00
5.3 Instantaneous Rate of Change 00:12:00
5.4 Derivative Definition 00:14:00
5.5 Examples 00:10:00
5.6 Non-Differentiability 00:06:00
5.7 Constant and Power Rule 00:09:00
5.8 Constant Multiple Rule 00:07:00
5.9 Sum and Difference Rule 00:07:00
5.10 Product Rule 00:14:00
5.11 Quotient Rule 00:08:00
5.12 Chain Rule 00:14:00
5.13 Examples 00:09:00
5.14 Derivative Symbols 00:04:00
5.15 Graph of Derivatives 00:10:00
5.16 Higher Order Derivatives 00:08:00
5.17 Equation of the Tangent Line 00:07:00
5.18 Derivative of Trig Functions 00:07:00
5.19 Examples 00:19:00
5.20 Derivative of Inverse Trig Functions 00:08:00
5.21 Examples 00:12:00
5.22 Implicit Differentiation 00:17:00
5.23 Derivative of Inverse Functions 00:13:00
5.24 Derivative of the Natural Exponential Function 00:11:00
5.25 Derivative of the Natural Logarithm Function 00:07:00
5.26 Derivative of Exponential Functions 00:06:00
5.27 Derivative of Logarithmic Functions 00:06:00
5.28 Logarithmic Differentiation 00:15:00
Unit 06: Application of Derivatives
6.1 Introduction 00:01:00
6.2 Related Rates 00:08:00
6.3 Examples 00:13:00
6.4 More Example 00:09:00
6.5 More Example 00:10:00
6.6 Optimisation 00:16:00
6.7 Example 00:11:00
6.8 More Example 00:07:00
6.9 Extreme Values of Functions 00:12:00
6.10 Critical Points 00:08:00
6.11 Examples (First Derivative Test) 00:16:00
6.12 More Examples 00:18:00
6.13 Concavity 00:15:00
6.14 Examples 00:13:00
6.15 Second Derivative Test 00:08:00
6.16 Graphing Functions 00:08:00
6.17 Examples 00:21:00
6.18 L’ Hôpital’s Rule 00:12:00
6.19 Other Indeterminate Forms 00:15:00
6.20 Rolle’s Theorem 00:09:00
6.21 The Mean Value Theorem 00:19:00
6.22Application of the Mean Value Theorem 00:04:00
Resources
Resource – Fundamentals of Calculus 00:00:00
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