Get updates on Eligibility, Admission, Placements Fees Structure
Quick Facts
| Medium Of Instructions | Mode Of Learning | Mode Of Delivery |
|---|---|---|
| English | Self Study | Video and Text Based |
Course Overview
Imperial College London’s A-level Mathematics for Year 12 – Course 2 certification focuses on helping candidates ace their A-level mathematics tests. Through an in-depth curriculum, the program intends to help students consider how everything they know about mathematics, fits into its vast world. Within a short span of seven weeks, the course content imparts all the vital learnings to shape the candidates as experts in this subject.
Spanning seven modules, the A-level Mathematics for Year 12 – Course 2 certification syllabus covers integral topics, ranging from Newton’s laws and calculus to statistical hypotheses. Through these, you’ll be able to test your initial skillset, correctly understanding how background expertise underpins this A-level programme.
Additionally, the A-level Mathematics for Year 12 – Course 2 training will help you gain the necessary skills such as fluency in applying appropriate answering methods. Candidates ace the confidence of assessing mathematical procedures, problem-solving, deep reasoning through proofs and formulae, and constructing mathematical arguments using critical tools. Aspirants can also choose the paid accreditation to become verified candidates.
The candidates are given the option of two tracks to choose from so that the course can be completed. Both the course tracks are self-paced but there is a time limit until which the course remains accessible in the audit mode. Again, in the case of the verified track, candidates will be able to access the course materials for an unlimited period of time.
The Highlights
- Pre-recorded videos with English transcripts
- Intermediate-level, online curriculum
- Self-paced ‘Math’ program
- An Imperial College London’s offering
- Seven weeks length
- Two to four hours/week
- Seven syllabus modules
- Free learning with paid certification
- Expert instructors
- Verified and shareable accreditations
Programme Offerings
- A-Level Mathematics skills development
- Trained educators
- Seven-week curriculum
- online
- Free
- Intermediate study
- English transcripts for videos
- Imperial College London’s course
Courses and Certificate Fees
| Fees Informations | Certificate Availability | Certificate Providing Authority |
|---|---|---|
| INR 4923 | yes | Imperial College, London |
- Candidates can choose to learn for free, as there is no A-level Mathematics for Year 12 – Course 2 fees.
- However, they must pay a specified amount to receive edX’s verified certification.
A-level Mathematics for Year12 – Course 2 fee structure
Program Type | Total Fees in INR |
A-level Mathematics for Year12 – Course 2 | NA |
A-level Mathematics for Year12 – Course 2 (certified) | Rs. 4,923 |
What you will learn
The A-level Mathematics for Year 12 – Course 2 certification will help learners become skilled experts in the following areas: -
- Differentiating number exponential functions
- Finding tangents/normals equations to curves
- Finding stationary points by applying differentiation
- Modeling decay and growth through exponential functions
- Integrating exponential functions
- Using logarithms for manipulating indices’ expressions
- Finding a curve’s equation from its gradient function using integration
- Using Newton’s laws for solving forces’ problems
- Using integration to see what area a curve encloses
- Defining statistical hypothesis tests with binomial distributions
- Using Binomial probability distributions to evaluate the probability of a series’ successes in statistical trials
Admission Details
The A-level Mathematics for Year12 – Course 2 program requires students to complete these steps to enroll: -
- Go to the official course URL to access the training’s official webpage.
- After going over all the course information, select ‘Enrol’.
- Now, you can either register or sign in. For the former, you can use the on-screen required information or any of your social accounts (Facebook/Microsoft/Google/Apple). For the latter, you can sign in via your edX ID, if you already have one.
- Once done, you can start the curriculum upon the commencement date. However, if you wish to avail of the shareable certificate, you must first complete its transaction.
Application Details
Aspirants can swiftly start their A-level Mathematics for Year 12 – Course 2 training by registering or signing in to edX. To register, they can use their Apple/Microsoft/Google/Facebook profile, or create a new edX account through their full name, country name, public username, password, and email. They can also sign in via an existing edX ID.
The Syllabus
- Welcome to the course
- Course Details
- Overview: An Introduction to Differentiation
- Basic Differentiation (15 Questions)
- 01 Basic Differentiation (1 Question)
- Solutions: Basic Differentiation
- Differentiation Rules for Rational Indices (20 Questions)
- 02 Differentiation Rules for Rational Indices (1 Question),
- Solutions: Differentiation Rules for Rational Indices
- Overview: Exponentials and Logarithms
- Exponential Functions (10 Questions)
- 03 Exponential Functions (1 Question)
- Solutions: Exponential Functions
- Logarithms (16 Questions)
- 04 Logarithms (1 Question)
- Solutions: Logarithms
- Exponential Growth and Decay (14 Questions)
- 05 Exponential Growth and Decay (1 Question)
- Solutions: Exponential Growth and Decay
- Overview: Differentiation 2
- Differentiation of Functions that Reduce to Linear Sums (11 Questions)
- 06 Differentiation of Functions that Reduce to Linear Sums (1 Question)
- Solutions: Functions that Reduce to Linear Sums
- Differentiation and Stationary Points (13 Questions)
- 07 Differentiation and Stationary Points (1 Question)
- Solutions: Differentiation and Stationary Points
- Tangents and Normals to Curves (13 Questions)
- 08 Tangents and Normals to Curves (1 Question)
- Solutions: Tangents and Normals to Curves
- Assessment 1 (15 Questions)
- Reflecting on Your Progress 1
- Overview: Integration
- Indefinite Integration (5 Questions)
- 09 Indefinite Integration (1 Question)
- Solutions: Indefinite Integration
- Definite Integration (5 Questions)
- 10 Definite Integration (1 Question)
- Solutions: Definite Integration
- Overview: Newton's Laws
- Overview: Newton's Laws
- Solving Problems Using Newton's First and Second Laws (9 Questions)
- 11 Newton's First and Second Laws and Motion Under a Gravitational Force (1 Question)
- Solutions: Newton's First and Second Laws and Motion Under a Gravitational Force
- Newton's Third Law (7 Questions)
- 12 Newton's Third Law (1 Question)
- Solutions: Newton's Third Law
- Connected Particles (18 Questions)
- 13 Connected Particles (1 Question)
- Solutions: Connected Particles
- Assessment 2 (16 Questions)
- Reflecting on Your Progress 2
- Overview: An Introduction to Probability
- Probability Revision (6 Questions)
- 14 Probability Revision (1 Question)
- Solutions: Probability Revision
- Probability Distributions (7 Questions)
- 15 Probability Distributions (1 Question)
- Solutions: Probability Distributions
- The Binomial Distribution (8 Questions)
- 16 The Binomial Distribution (1 Question)
- Solutions: The Binomial Distribution
- Summary: Key Terms Associated with Probability Distributions
- Overview: What is Hypothesis Testing?
- Statistical Models (5 Questions)
- 17 Statistical Models (1 Question)
- Solutions: What is a Statistical Model?
- Hypothesis Tests Using the Binomial Distribution (7 Questions)
- 18 Hypothesis Tests Using the Binomial Distribution (1 Question)
- Solutions: Hypothesis Tests Using the Binomial Distribution
- Assessment 3 (14 Questions)
- Reflecting on Your Progress 3
Instructors
Imperial College, London Frequently Asked Questions (FAQ's)
No. The A-level Mathematics for Year 12 – Course 2: Calculus, Newton’s Laws, and Hypothesis Testing follows a self-paced pattern, where you can learn comfortably through the pre-recorded videos.
You can finish this training in seven weeks, dedicating two to four hours weekly.
Dr. Philip Ramsden, and Mr. Phil CHaffe (Mathematics in Education and Industry) of the Imperial College London, will deliver the course curriculum.
Once you pay and receive the edX certification, you can share it across your CVs or LinkedIn account.
Yes. This course follows an in-depth learning curriculum that aims to help students prepare for STEM degrees at undergraduate levels.