Sin^4 п/16 + sin^4 3п/16 +sin^4 5п/16 + sin^4 7п/16

(sin^4 это синус в четвёртой степени)

1,5

Объяснение:  Решение :

sin⁴(π/16) + sin⁴(3π/16) + sin⁴(5π/16) + sin⁴(7π/16) = (1 - cos(π/8))²/4  +

+ (1 - cos(3π/8))²/4  +  (1 - cos(5π/8))²/4  +  (1 - cos(7π/8))²/4  =  (1/4) •

• ( 1 - 2cos(π/8) + cos²(π/8) + 1 - 2cos(3π/8) + cos²(3π/8) + 1 - 2cos(5π/8) + cos²(5π/8) + 1 - 2cos(7π/8) + cos²(7π/8) ) = (1/4) • ( 4 - 2•( cos(π/8) + cos(3π/8) + cos(5π/8) + cos(7π/8) ) + ( cos²(π/8) + cos²(3π/8) + cos²(5π/8) + cos²(7π/8) ) ) =  (1/4) • ( 4 - 2•( 2•cos(π/2)•cos(-3π/8) + 2•cos(π/2)•cos(-π/8) ) + ( cos²(π/8) + cos²(3π/8) + cos²(5π/8) + cos²(7π/8) ) ) = 1 + (1/4)•( cos²(π/8) + cos²(3π/8) + cos²(5π/8) + cos²(7π/8) ) = 1 + (1/4)•( ( cos(π/8) + cos(7π/8) )² + ( cos(3π/8) + cos(5π/8) )² - 2•cos(π/8)•cos(7π/8) - 2•cos(3π/8)•cos(5π/8) ) =

= 1 - (1/4)•( cosπ + cos(-3π/4) + cosπ + cos(-π/4) ) = 1 - (1/4)•( - 2 - (√2/2) + (√2/2) ) = 1 - (1/4)•(-2) = 1 + 0,5 = 1,5