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1,900 reviews
Tutor: Sophie Patel
AP Calculus AB & BC at EdVeda equips students with the skills needed for freshman College-level Calculus courses (1st and 2nd semesters) in Differential and Integral Calculus.
The course framework aligns with College Calculus courses and prepares students for careers in fields like math and the physical sciences, engineering, economics, computer science & data engineering, AI, and all social sciences that use quantitative reasoning. With a focus on problem-solving and analytical thinking, EdVeda ensures students are ready for both the AP exams and future academic challenges.
Calculus AB & BC
Moduls
12
Age
11-13
Student: 3,215
Language: English
Subtitles: English, Indonesia, Spanish, French, Italian, Rusian, Polish, Dutch
Additional resources: 12 files
Duration: 24 Hr 40 Mins
Calculus AB and Calculus BC are offered as 2 separate courses to meet your needs. Both are related and have many commonalities.
Calculus AB (1st Semester /College-level) helps you master basic Differentiation starting with the fundamentals of limits, change, and functions (composite, implicit, inverse) and its analytical and contextual applications in real life. Integration (the accumulation of change and the Fundamental Theorem of Calculus), Differential Equations, and the applications of Integration round off this course.
BC Calculus (2nd Semester/College-level) includes all AB content and adds parametrically-defined functions and vector-valued functions. Manipulating infinite series and sequences (their convergence and divergence) is at the heart of Calculus BC. It also explores Integration, Differential Equations, and Smooth Curves in greater detail.
We recommend a good understanding of AP Precalculus content although it's not a must to do that program.
You will need a sound understanding of high-school level Algebra, Geometry (Analytic), Trigonometry, Elementary and Analytic functions in general. An ability to graph (and visualize) functions and being able to deal with their algebraic transformations, combinations, compositions, and inverses will be important.