1) по теореме косинусов имеем: a² = b² + c² - 2bc cos a = 25 - 24 cos 135° = 25 + 12√2 a = √(25 + 12√2) по теореме синусов, a / sin a = b / sin b sin b = sin a · b / a = √2 / 2 · 3 / √(25 + 12√2) = 3 / √(50 + 24√2) ∠b = arcsin(3 / √(50 + 24√2)) ∠c = 180° - 135° - ∠b = 45° - arcsin(3 / √(50 + 24√2)) 2) ∠a = 180° - ∠b - ∠c = 65° по теореме синусов b / sin b = a / sin a b = a sin b / sin a = 24.6 · √2 / 2 / (sin 65°) = 123√2 / (10 sin 65°) по теореме синусов c / sin c = a / sin a c = a sin c / sin a = 24.6 ·sin 70° / sin 65°
b1q + b1q^2 = 14 разделим первое уравнение на 2-е
(1 + q^3)/(q +q^2) = -7/2
(1+q)(1 -q +q^2)/q(1 +q) = -7/2
(1 -q +q^2) /q = -7/2
2(1 - q +q^2) = -7q
2 -2q +2q^2 +7q = 0
2q^2 +5q +2 = 0
D = b^2 -4ac = 25 -16 = 9
q1= -1/2, a) b1 + b1q^3 = -49 б) q2 =-2 b1 + b1q^3 = -49
b1 +b1*(-1/8) = -49 b1 + b1*(-8) = -49
7/8 b1 = -49 -7b1 = -49
b1 = -49: 7/8= -49*8/7= =56 b1 = 7