Решите совокупность неравенств [x² -2x ≤0 [x < 1

ответ:(1;2]

Объяснение:

а) (3/sinx)-(1/sin^2x)=2                                sinx не равно 0

     (3sinx-1)/Sin^2x=2                                   X не равно пm, где m - целое число

      3sinx-1=2sin^2x

      2sin^2x-3sinx+1=0

      sinx=t

     2t^2-3t+1=0

     D=9-8=1

     t1=1                                                         t2=1/2

     sinx=1                                                    sinx=1/2

    x1=п/2+2пk                                             x2=п/6+2пn

    где k - целое число                              x3=5п/6+2пl

                                                                     где n, l - целые числа

 

б) x1=3п/2

    x2=-11п/6

    x3=-7п/6

1)
1/cos^2(a) – tg^2(a)-sin^2(a)= 1/cos^2(a) – sin^2(a)/cos^2(a))-sin^2(a)=
=[1 – sin^2(a) ]/cos^2(a))-sin^2(a)=cos^2(a)/cos^2(a))-sin^2(a)=
=1-sin^2(a)=cos^2(a)
2)
cos^2(a)+ctg^2(a)-1/sin^2(a)=cos^2(a)+[cos^2(a)-1]/sin^2(a)=
=cos^2(a)-sin^2(a)]/sin^2(a)=cos^2(a)-1 = -sin^2(a)
3)
1/cos^2(a) – tg^2(a)(cos^2(a)+1)=1/cos^2(a) – sin^2(a)-sin^2(a)/(cos^2(a)=
=(1 – sin^2(a))/cos^2(a)-sin^2(a)=1-sin^2(a)=cos^2(a)

4) (1+sin^2(a))ctg^2(a) – 1/sin^2(a)=cos^2/sin^2 +cos^2 – 1/sin^2(a)=
=(cos^2 - 1)/sin^2 +cos^2= -sin^2/sin^2 +cos^2= -1+cos^2=  -sin^2(a)
 
5)sin(a)/(1+cos(a)) + sin(a)/(1-cos(a))=sin(a) *  ((1-cosa)+(1+cosa)) / (1-cos^2)=2/sin(a)
 
6)cos(a)/(1+sin(a))+ cos(a)/(1-sin(a))=cos(a)* ((1-sina+1+sina)) / (1-sin^2a)= 2/cos(a)