This page covers Calculus 1 at the AP / College Prep level, delivered as a formula cheat sheet. Limits, derivatives, and the beginnings of integration. The derivative is not a formula — it is a ra. The material here corresponds to Grades 11–12 courses: AP Calculus AB and AP Calculus BC.
The key formulas for Calculus 1 at the AP / College Prep level are organised below. Each formula is accompanied by a note on when it applies and what common variations exist.
The skills covered by these formulas are: Limits and continuity, Derivative rules, Chain rule and implicit differentiation, Optimization, Introduction to integration.
For each formula, read the conditions carefully. Many errors in Calculus 1 come from applying a formula outside its domain of validity — using a geometric formula that assumes a right angle when the angle is not specified, or applying a probability rule that requires independence when the events are dependent.
Use this sheet as a revision tool after you have worked through problems — not as a first introduction to the material. A formula you have derived or used is one you will remember; a formula you have only read is one you will forget under exam pressure.
Worked Example
Find f'(x) where f(x) = x³ · sin(x)
Product rule: f'(x) = 3x²·sin(x) + x³·cos(x).
Forgetting the chain rule when differentiating a composite function: the derivative of sin(x²) is 2x·cos(x²), not cos(x²).
Frequently Asked Questions
How is Calculus 1 different at the AP / College Prep level compared to earlier levels?
At the AP / College Prep level, Calculus 1 builds on Grades 11–12 prerequisites. Students are expected to have completed AP Calculus AB before tackling this material.
Which exams test Calculus 1 at this level?
AP Calculus AB, College placement, Engineering prereq.
What is the single most effective way to practise Calculus 1 for AP / College Prep students?
The most effective practice at the AP / College Prep level is deliberate work on novel problem setups — not repeated drilling of the same template. Attempt problems before looking at solutions, and review errors by identifying the specific step where the reasoning broke down.