Triangles
Definitions:
isosceles - (at least) 2 sides the same length, modern definition includes equilateral
equilateral - all 3 sides the same length
acute triangle - all angles are < 90 degrees
obtuse triangle - one angle is > 90 degrees
similar triangles - triangles that have same shape (all 3 angles), but size can be different. The sides have same ratios
congruent triangles - triangles that have the same shape and size
CPCT - corresponding parts of congruent triangles (are equal)
Isosceles triangle - base angles are the same, Equilateral - all angles are the same (60°), aka equiangular
Centroid of a triangle - center (where the lines bisecting each angle will meet)
average the x corner values, and average of y corner values
the bisecting line will have 2/3 of its length between the corner and the centroid and 1/3 from centroid to far side of triangle
the six small triangles formed by bisecting lines all have equal area
Area of a triangle = base*height/2
Heron's formula - area of any triangle, with sides of length a, b, c, don't know height:
Find semiperimeter (sp) = perimeter/2 = (a+b+c)/2
area = √(sp(sp-a)(sp-b)(sp-c))
Congruent triangles
Theorems to prove triangles are congruent:
Right Triangles
45-45-90 triangle: hyp = side * √2
30-60-90 triangle: short side = a, long side = a*√3, hyp = 2a
3-4-5 triangle: if a triangle has sides 3n and 4n, then the hypotenuse will be 5n
area of a right triangle = 1/2*h*w
hypotenuse is the side opposite the right angle, opposite is the side opposite the given angle, adjacent is the side next to the given angle
SOHCAHTOA (pronounced "Soak a toe-ah"): Sin=Opp/Hyp, Cos=Adj/Hyp, Tan=Opp/Adj
law of sines:
sin(A)/a = sin(B)/b = sin(C)/c (sometimes a/sin(A) = ...)
law of cosines - to find an angle when all the sides are known
cos(A) = (b² + c² - a²) / (2bc)
cos(C) = (a² + b² - c²) / (2ab), cos(B) is same pattern
(side a is opposite angle A, etc)
rewriting it: c = √(a² + b² - 2abcos(C))
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