Mastering Derivatives: AP Calculus Review
SAT Score Range
•
2 sessions
•
JM
SJ
LD
+4
About
This intensive two-day course helps AP Calculus students solidify their understanding of differentiation techniques. Students will review major derivative rules, tackle complex applications, and build the confidence and skills needed for Unit 2–3 assessments and the AP Exam. We will go over practice problems involving all differentiation techniques taught in Unit 2-3.
Tutored by
Hello, I'm a high school senior from Pittsburgh and I'm passionate about learning and teaching STEM topics. I'm here to mostly help students with Math up to AP Calculus, Physics, and the SAT Math. I'm currently enrolled in 5 AP's: AP Psychology, AP Computer Science, AP U.S Govt & Politics, AP Calculus, and AP Physics all while maintaining a 4.0+ GPA. I'm involved in many STEM-focused activities (Robotics, Internships, Clubs, etc...). In my free time, I enjoy playing basketball, running, and volunteering for my school or community.
✋ ATTENDANCE POLICY
Please try your best to make the session(s) :)
SESSION 1
20
Oct
SESSION 1
Differentiation: definition and basic derivative rules
Differentiation: definition and basic derivative rules
Mon 12:00 AM - 1:10 AM UTCOct 20, 12:00 AM - 1:10 AM UTC
This session focuses on mastering fundamental differentiation concepts from Unit 2 of AP Calculus. Students will review the definition of the derivative, practice finding derivatives using limit processes, and explore derivative rules including power, product, quotient, and chain rules. In the session, we'll aim for mastery of the concepts by applying the techniques to AP like problems.
SESSION 2
21
Oct
SESSION 2
Differentiation: composite, implicit, and inverse functions
Differentiation: composite, implicit, and inverse functions
Tue 12:00 AM - 1:10 AM UTCOct 21, 12:00 AM - 1:10 AM UTC
This session explores advanced techniques & applications of differentiation from Unit 3 of AP Calculus. Students will learn more complex derivative techniques and apply them to solve higher-order derivatives and analyze motion problems. Emphasis is placed on mastery of differentiation and developing skills to solve harder applications.