Find the value of x satisfying `(log)_(10)(2^x+\ x-41)=x\ (1-(log)_(10)5)dot`

Find the value of x satisfying (log)_(10)(2^(x)+backslash x-41)=x backslash(1-(log)_(10)5)

The value of x satisfying x+log_10(1+2^x)=x log_10 5+log_10 6 is

Find the value of x given that 2log_(10)(2^(x)-1)=log_(10)2+log_(10)(2^(x)+3)

The number of positive integers satisfying x+(log)_(10)(2^x+1)=x(log)_(10)5+(log)_(10)6 is...........

The number of positive integers satisfying x+(log)_(10)(2^x+1)=x(log)_(10)5+(log)_(10)6 is...........

The number of positive integers satisfying x+(log)_(10)(2^x+1)=x(log)_(10)5+(log)_(10)6 is...........

5. Find the value of int x^(1/log_10 x )dx

Find the value of x satisfying the equation ((log)_3 (3x)^(1/3)+(log)_x(3x)^(1/3))dot(log)_3x^3+((log)_3(x/3)^(1/3)+(log)_x(3/x)^(1/3))dot(log)_3x^3=2

Find the value of x satisfying the equation ((log)_3 root(3)(3x)+(log)_x root(3)(3x))dot(log)_3x^3+((log)_3 root(3)(x/3)+(log)_xroot(3)(3/x))dot(log)_3x^3=2

The value of x satisfying the equation 2log_(10)x - log_(10) (2x-75) = 2 is