Tho solution of the equation `7^(logx)-5^(logx+1)=3.5^(log-x1)-13.7 ^(logx-1)is`

The solution of the equation 7^(logx)-5^(logx+1)=3. 5^(logx-1)-13. 7^(logx-1) is a. an even number b. rational number c. irrational number d. composite number

The solution of the equation 7^(logx)-5^(logx+1)=3*5^(logx-1)-13*7 ^(logx-1)is (a) an even number (b) rational number (c) irrational number (d) composite number

Solve the equation: (log(x+1))/(logx)=2

The solution set of the equation x^(log_x(1-x)^2)=9 is

The solution set of the equation x^(log_x(1-x)^2)=9 is

int7^(x logx)(1+logx)dx=

Solve the equation logx^4-logx^3=log5x-log2x

Solve the equation log(x^2-5)-logx=log4

int(e^(7logx)-e^(6logx))/(e^(6logx)-e^(5logx))dx is:

The value of x satisfying 5^logx-3^(logx-1)=3^(logx+1)-5^(logx - 1) , where the base of logarithm is 10