An inequation in the form `log_(g(x)) f(x) >= 0`

An inequation in the form log_(h(x))f(x)>=log_(h(x))g(x)

An inequation in the form log_(h(x))f(x)<=log_(h(x))g(x)

An inequation of the form f(a^(x))>=0

An inequation of the form f^((1)/(2)n)(x)

An inequation of the form f^((1)/(2)n)(x)

An equation of the form (f(x))^((1)/(2n))=g(x) equivalent to the system g(x)>=0;f(x)=g^(2n)(x)

The true solution set of inequality log_((2x-3))(3x-4) gt 0 is equal to :

If x and alpha are real, then the inequation log_(2)x+log_(x)2+2cos alpha le 0

The value of x satisfying the inequalities hold: qquad log_(0.2)(x+5)>0

If a function is defined as f(x)=sqrt(log_(h(x))g(x)) , where g(x)=|sinx|+sinx,h(x)=sinx+cosx,0lexlepi . Then find th domain of f(x) .