B₆ = √b₅*b₇ = 15
У нас ряд: ...; 25; 15; 9;...
q = 9/15 = 3/5
b₅ = b₁q⁴
25 = b₁*(3/5)⁴
b₁ = 25 : 625/81= 25*81/625 = 81/25
S₆ = 81/25*((3/5)⁶ -1)/(1 - 3/5) = 81*7448/15625
(tg2a-ctg2a)(tg2a+ctg2a)/4ctg4a=(tg2a-tg(π/2-2a))*(tg2a+tg(π/2-2a))/4ctg4a=
=sin(4a-π/2)*sin(4a+π/2)/cos2a*cos(π/2-2a)*cos2a*cos(π/2+2a(*4ctg4a=
=-cos4a*cos4a/cos²2a*sin2a*(-sin2a)*4ctg4a=cos²4a/sin²2a*cos²2a*4ctg4a=
=4ctg²4a/4ctg4a=ctg4a
(cosa-cos3a)/(1-cos2a) + (sina-sin3a)/sin2a=
=2sin2asina/2sin²a -2sinacos2a/2sinacosa=sin2a/sina - cos2a/cosa=
=(sin2acosa-cos2asina)/sinacosa=sina/sinacosa=1/cosa
разложение в ряд e^x дает
e^x=1+x+x^2/2!+x^3/3!+...>=1+x+x^2/2!=1+x+x*x/2
Х(3х-1)=0
х=0 или. 3х-1=0
х=1/3
ответ: 0; 1/3
22 - 6 + 15x = 10 + 18x
15x - 18x = 10 - 16
- 3x = - 6
3x = 6
x = 6/3
x = 2