Объяснение:
given, cosA + cosB + cosC = 3/2
=> 2(2cos(A + B)/2 . cos(A - B)/2) + 2cosC = 3
=> 2(2cos(pi/2 -c/2) .cos(A - B)/2 + 2(1 - 2sin^2(A/2)) = 3
=> 4sin(c/2) .cos(A - B)/2 + 2 - 4sin^2(A/2)) = 3
=> 4sin^2(A/2) - 4sin(c/2) .cos(A - B)/2 + 1 = 0
This is a quadratic equation in sinc/2, and it has real roots
Therefore , Descriminant >= 0
=> (-4cos(A - B)/2)^2 - 4*4*1 >= 0
=> (cos(A - B))^2 >= 1
=> cos(A - B) = 1, since cosine of any angle can't be > 1
=> A - B = 0
=> A = B
Similarily we can prove that B = C
Thus A = B = C, triangle is equilateral
Находим координаты необходимых точек:
Координаты точки В: x y z
0 0 0,
Координаты точки О 0.5 0.5 0,
Координаты точки А1 1 0 1,
Координаты точки Д 1 1 0.
По этим координатам определяем координаты векторов:
х у z Длина
Вектор ВО 0.5 0.5 0 0.70711 = √2/2,
Вектор А1Д 0 1 -1 1.41421 = √2.
Находим косинус угла между векторами:
Данному косинусу соответствует угол 60 градусов.
Объяснение:
given, cosA + cosB + cosC = 3/2
=> 2(2cos(A + B)/2 . cos(A - B)/2) + 2cosC = 3
=> 2(2cos(pi/2 -c/2) .cos(A - B)/2 + 2(1 - 2sin^2(A/2)) = 3
=> 4sin(c/2) .cos(A - B)/2 + 2 - 4sin^2(A/2)) = 3
=> 4sin^2(A/2) - 4sin(c/2) .cos(A - B)/2 + 1 = 0
This is a quadratic equation in sinc/2, and it has real roots
Therefore , Descriminant >= 0
=> (-4cos(A - B)/2)^2 - 4*4*1 >= 0
=> (cos(A - B))^2 >= 1
=> cos(A - B) = 1, since cosine of any angle can't be > 1
=> A - B = 0
=> A = B
Similarily we can prove that B = C
Thus A = B = C, triangle is equilateral