Topic 4 · Geometry
AMC 10/12 · Cheatsheet

Topic 4 · Geometry

Chapter 2 · Angles, similarity & trigonometry

📋 Reference · always available
Triangle / polygon
=180,    n-gon=(n2)180\triangle=180^\circ,\;\; n\text{-gon}=(n-2)180^\circ
Inscribed angle
Half the central angle on the same arc; semicircle ⇒ 9090^\circ.
Similarity ratios
length:k,  area:k2,  volume:k3\text{length}:k,\;\text{area}:k^2,\;\text{volume}:k^3
Centroid
G=A+B+C3G=\tfrac{A+B+C}{3}
Divides each median 2:12{:}1 from the vertex.
Incenter / circumcenter
Angle bisectors ⇒ II (incircle); \perp bisectors ⇒ OO (circumcircle).
Orthocenter
Altitudes meet at HH; for right triangle, HH = right-angle vertex.
Euler line
OG:GH=1:2\overrightarrow{OG}:\overrightarrow{GH} = 1{:}2
OO, GG, HH collinear (non-equilateral).
Stewart's theorem
b2m+c2nad2=amnb^2 m + c^2 n - a d^2 = a m n
Median length
ma=122b2+2c2a2m_a = \tfrac12 \sqrt{2b^2 + 2c^2 - a^2}
Angle-bisector length
ta=2b+cbcs(sa)t_a = \tfrac{2}{b+c}\sqrt{bc \cdot s(s-a)}
Sum-to-product
sinA+sinB=2sinA+B2cosAB2\sin A+\sin B = 2\sin\tfrac{A+B}{2}\cos\tfrac{A-B}{2}
Roots-of-unity sum
k=0n1cos ⁣(θ+2πkn)=0  (n2)\sum_{k=0}^{n-1}\cos\!\left(\theta+\tfrac{2\pi k}{n}\right)=0\;(n\ge2)
$\sin A = \sin B$
A=B+2πkA = B + 2\pi k or A=πB+2πkA = \pi - B + 2\pi k.
SOH-CAH-TOA
sin=oh,cos=ah,tan=oa\sin=\tfrac{o}{h},\cos=\tfrac{a}{h},\tan=\tfrac{o}{a}
Law of cosines / sines
c2=a2+b22abcosC,    asinA=bsinBc^2=a^2+b^2-2ab\cos C,\;\; \tfrac{a}{\sin A}=\tfrac{b}{\sin B}
Pythagorean identity
cos2θ+sin2θ=1\cos^2\theta+\sin^2\theta=1