Очень найдите ( sin5α + sinα , если sinα = 1/√5
"решение" : * * * sinα +sinβ =2sin( (α+β)/2 ) *cos( (α - β)/2 ) * * *
sin5α + sinα = 2*sin ( (5α +α)/2 ) *cos ( (5α -α)/2 ) =
2*sin3α*cos2α =2*(3sinα - 4sin³α)* (1 -2sin²α ) = || sinα = 1/√5 || =
=2*(3 /√5 - 4 / 5√5)* (1 - 2* 1/5 ) = 2*( ( 3*5 - 4) / 5√5 )*( (5*1 -2)5 ) =
=2* (11 / 5√5) * (3/5) = 66/25√5 = 66√5 / 125
ответ: 66√5 / 125
* * * P.S. sin3α =sin(2α+α) = sin2α*cosα+ cos2α*sinα =
2sinα*cosα*cosα + (cos²α -sin²α)*sinα =sinα *(2cos²α + cos²α - sin²α) =
sinα *(3cos²α - sin²α) = sinα *( 3(1 -sin²α) - sin²α ) = 3sinα - 4sin³α * * *
√(2x + 3y) + √(2x - 3y) = 10
√(4x² - 9y²) = 16
2x - 3y ≥ 0
2x + 3y ≥ 0
√(2x + 3y) = a ≥ 0
√(2x - 3y) = b ≥ 0
a + b = 10
ab = 16
a = 10 - b
(10 - b)b = 16
10b - b² = 16
b² - 10b + 16 = 0
D = 100 - 64 = 36
b12 = (10 +- 6)/2 = 2 8
1. b1 = 2
a1 = 10 - b1 = 8
√(2x + 3y) = 8
√(2x - 3y) = 2
---
2x + 3y = 64
2x - 3y = 4
4x = 68
x = 17
2*17 + 3y = 64
3y = 30
y = 10
2x - 3y = 34 - 30 > 0
2x + 3y = 64 > 0
2. b2 = 8
a2 = 10 - b2 = 2
√(2x + 3y) = 2
√(2x - 3y) = 8
---
2x + 3y = 4
2x - 3y = 64
4x = 68
x = 17
2*17 - 3y = 64
-3y = 30
y = -10
2x - 3y = 34 + 30 > 0
2x + 3y = 34 - 30 = 4 > 0
ответ (17, 10) (17, -10)
