Решение:
tg66=tg(90-24)=ctg(24)
cos^2(114)=cos^2(90+24)=sin^2(24)
10cos^2114tg66=10sin^224*ctg24=5sin48
1-2cos^2111=-cos222=-cos(270-48)=+sin48
(1-2cos^2(111))/(10cos^2114*tg66)=sin48/5*sin48=1/5 или =0,2.
=(q-p)(q+p) / (p+q)(p^2-pq+q^2)=q-p/p^2-pq+q^2=q-p/(p-q)^2=1/p-q
<span>(x+4)^2-(x+1)(x-2)=2x-3
x^2+8x+16 - (x^2 - x - 2) - 2x + 3 = 0
x^2 + 8x + 16 - x^2 +x + 2 - 2x + 3 = 0
7x + 21 = 0
7x = - 21
x = - 3 </span>
2sin3x=-1
sin3x=-1/2
3x=-п/6+2пn,n€z
x=-п/18+2пn/3,n€z
3x=7п/6+2пn,n€z
x=7п/18+2пn/3,n€z
-п≤-п/18+2пn/3≤п
-п+п/18≤2пn/3≤п+п/18 |:п
-1+1/18≤2n/3≤1+1/18
-17/18≤2n/3≤19/18 |*3
-17/6≤2n≤19/6 |:2
-17/12≤n≤19/12
при n=0 x=-п/18
при n=-1 x=-п/18-2п/3=-п/18-12п/18=-13п/18
при n=1 x= -п/18+2п/3=-п/18+12п/18=11п/18
-п≤7п/18+2пn/3≤п |:п
-1≤7/18+2n/3≤1
-1-7/18≤2n/3≤1-7/18
-25/18≤2n/3≤11/18 |*3
-25/6≤2n≤11/6 |:2
-25/12≤n≤11/12
при n=-2 x=7п/18-4п/3=7п/18-24п/18=-17п/18
при n=-1 x=7п/18-2п/3=7п/18-12п/18=-5п/18
при n=0 x=7п/18