This course is for both physical enrolled students and online students.
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Unlock the Math-gic: Your JC 1 H2 Math Tuition Online Course for A-Level and IP Quests
Feeling the pull of JC 1 H2 Math challenges like vectors, differentiation, or complex numbers? We’ve walked with young wizards through those same tough spots—our standalone online math tuition course gently turns them into steady steps forward, with self-paced learning crafted just for Singapore students like you.
Guided by Principal Math Tutor Mr. Justin Tan—with over 13 years sharing heartfelt journeys and a double major in Math and Economics from NUS (Distinction)—this MOE-aligned jc 1 h2 math tuition sparks proprietary video lessons that make tough ideas feel simple and warm. Draw from real-life examples and easy steps to light those “aha” moments, one patient try at a time. No hurry from quick classes; hold your wand and revisit anytime with unlimited 24/7 access on any device.
Key Sparks to Light Your Tuition Journey:
– Full Coverage: Dive into 16 key topics, from Basic Properties of Vectors to Differential Equations, building a strong base for what’s next.
– Special Videos: Made with our unique teaching tricks to make math click and feel like magic—rewind, replay, and master at your own pace.
– Practice Tools: Fun quizzes, worksheets with clear answers, and progress checks to strengthen weak spots and cheer your growth.
– Always Fresh: We update content often to keep it spot-on, with new AI sparks (in early testing) coming soon for even better personal fits.
– Flexible for Everyone: Perfect as standalone online math tuition or a free extra for our in-person wizards—learn anywhere, anytime.
Ready to begin your math quest and shine in A-Level or IP paths? Jump in today and let the wins unfold!
Course Description
In this JC1 H2 Mathematics course (A Level/Integrated Programme), you will be learning
- Basic Properties of Vectors
- Scalar and Vector Products in Vectors
- Equation of lines and planes
- Three Dimensional Geometry
- Functions
- Graphs and Transformations
- Equations and Inequalities
- Sequence and Series 8a. Recurrence Relation
- Complex Number expressed in cartesian form
- Complex Number (The Argand Diagram)
- Differentiation
- Application of Differentiation
- Maclaurin Series
- Integration Techniques
- Application of Integration
- Differential Equations
