IB Math SL AI
Mathematics: Applications and Interpretation emphasizes practical applications of mathematics in real-world contexts. This course places mathematics in real-life situations, focusing on modeling, statistics, and problem-solving using technology.
Full worked solutions to all past paper questions, taught by experienced IB instructors.
Carefully sequenced, intensive workshops designed specifically for students reviewing the concepts, techniques, and skills crucial for earning a 7.
Develop your understanding in IB Mathematics AI SL using custom-built flashcards, perfect for quick study sessions on desktop or mobile app.
Course Structure and Content
The SL Applications & Interpretation course emphasizes practical applications and real-world problem solving. Students use technology extensively and focus on modeling, statistics, and interpretation of mathematical results in context.
The AI courses take a more contextual approach, placing mathematics in real-life applications, whereas the AA courses take a more analytical approach with focus on mathematical argument and proof.
At the end of the program, all SL students sit paper 1 and paper 2. Both papers can cover the full breadth of the curriculum. Paper 1 is a 90 minute long non-calculator paper, with a focus on algebraic manipulation, inquiry, reasoning, and interpretation based on conceptual understanding.
Both Standard and Higher Level courses develop analytical thinking, problem-solving skills, and the ability to communicate ideas effectively. Students will engage with technology and explore concepts through investigation and modeling.
Course Resources
Questionbank
All the questions you could need! Sorted by topic and arranged by difficulty, with mark schemes and video solutions for every question.
Practice Exams
Choose your revision tool! Contains topic quizzes for focused study, mock exams covering the whole syllabus, and the revision ladder to precisely target your learning.
Key Concepts
Helpful refreshers summarizing exactly what you need to know about the most important concepts covered in the course.
Tips for Success
Accurate and concise mathematical communication is vital - show all your steps of working clearly.
Always simplify as much as possible - it often makes next steps easier, non-simplified answers can lose marks and it is good practice for your algebraic manipulation!
Particularly in long questions with multiple parts, look for information or solutions from previous parts to help you.