ОДЗ
{(x+3)/(x-3)>0⇒x<-3 U x>3
{x-3>0⇒x>3
{x+3>0⇒x>-3
x∈(3;∞)
перейдем к основанию 2
log(2)4/log(2)[(x+3)/(x-3)]=2(log(2)(x-3)/log(2)(1/2)-log(2)√(x+3)/log(2)(1/√2))
2/log(2)[(x+3)/(x-3)]=2(-log(2)(x-3)-1/2log(2)(x+3)/(-1/2))
2/log(2)[(x+3)/(x-3)]=2(log(2)[(x+3)/(x-3)]
log(2)[(x+3)/(x-3)]=t
2/t=2t
2t²=2
t²=1
t1=-1 U t2=1
log(2)[(x+3)/(x-3)]=-1
(x+3)/(x-3)=1/2⇒2x+6=x-3⇒x=-9∉ОДЗ
log(2)[(x+3)/(x-3)]=1
(x+3)/(x-3)=2⇒x+3=2x-6⇒x=9
Ответ х=9
1)5^3*2^3=125*8=1000
2)(1/4)^4*20^4=1/256*160000=625
3)(0.5)^3*60^3=0.125*216000=27000
4)(1.2)^4*(1 2/3)^4=2.0736*625/81=16
M+m^2+1=m^2+m+m+1-m=m^2+2m+1-m=(m+1)^2-m