Solve for x: `5^(log x) + 5x^(log 5) =3 (a>0)`

Solve for x:5^(log x)+5x^(log5)=3(a>0) where base oflog backslash is a

Solve for x :5^(logx)+5x^(log5)=3(a >0); where base of log\ is a

Solve for x :5^(logx)+5x^(log5)=3(a >0); where base of log is a

Solve for x: a) log_(x)2. log_(2x)2 = log_(4x)2 b) 5^(logx)+5x^(log5)=3(a gt 0), where base of log is 3.

Solve for x : (i) log_(10) (x - 10) = 1 (ii) log (x^(2) - 21) = 2 (iii) log(x - 2) + log(x + 2) = log 5 (iv) log(x + 5) + log(x - 5) = 4 log 2 + 2 log 3

Solve for x : x+(log)_(10)(1+2^x)=x(dot(log)_(10)5+log_(10)6)

Solve for x, log_(x) 15 sqrt(5) = 2 - log_(x) 3 sqrt(5) .

Solve for x:(log)_(5)120+(x-3)-2.(log)_(5)(1-5^(x-3))=-(log)_(5)(0.2-5^(x-4))

Solve for x: a) log_(0.5)(x^(2)-5x+6) ge -1 , b) log_(1//3)(log_(4)(x^(2)-5)) gt 0