Problem 15 (trigonometry): Always observe the answer options before you start to work on a problem. For example, if the answer options show bounds, then don’t go ahead and try to calculate the actual value. Problem 16 (circles): Descartes’ Circle Theorem states that $2(a^2 + b^2 + c^2 + d^2)=(a+b+c+d)^2$,…
Month: June 2026
AMC 12B 2018 Notes
Problem 8 (centroids): Given points $(a,b)$, $(c,d)$, and $(e,f)$ on the coordinate plane, the coordinates of the centroid are $(\frac{a+c+e}{3},\frac{b+d+f}{3})$. Problem 11 (divisibility): READING THE QUESTION MULTIPLE TIMES WON’T HURT. More time would be wasted just guessing around the the problem meant. Problem 13 (centroids): Centroids of a triangle will…
AMC 12A 2018 Notes
Problem 11 (paper folding): When doing problems about folding something, just draw a perpendicular line across the midpoint and that is the line of reflection. Problem 15 (symmetry): Always consider symmetry, but also consider the edge cases too. Problem 17 (area geometry): Not everything is as it seems! Also, don’t…
AMC 12B 2019 Notes
Problem 10 (2 x 3 graph theory): Problems rarely make you just brute force everything out. Analyze the situation, come up with anything you can think of that makes progress. Problem 15 (Finding area): Consider your options. Don’t be set on one method or idea for a problem. Problem 17…
