Let G,O,E and L be positive real numbers such that log(G.L)+log(G.E)=3,log(E.L)+log(E.O)=4, log(O.G)+log(O.L)=5 (base of the log is 10)
If the value of the product (GOEL) is `lamda`, the value of `sqrt(loglamdasqrt(loglamdasqrt(loglamda....)))` is

Let G,O,E and L be positive real numbers such that log(G.L)+log(G.E)=3,log(E.L)+log(E.O)=4, log(O.G)+log(O.L)=5 (base of the log is 10) If log(G/O) and log(O /E) are the roots of the equation

Let G,O,E and L be positive real numbers such that log(G.L)+log(G.E)=3,log(E.L)+log(E.O)=4, log(O.G)+log(O.L)=5 (base of the log is 10) If the minimum value of 3G+2L+2O+E is 2^(lamda)3^mu5^nu ,Where lamda,mu ,and nu are whole numbers, the value of sum(lamda^(mu)+mu^(nu)) is

IF lamda^(log_(5)3 =81 ,find the value of lamda

Find values of lamda for which 1/log_3lamda+1/log_4lamdagt2 .

If x^(y) = log x , the value of dy/dx at x = e is

Find the value of the following log_(e)(e^3)

If log_(3)4=a , log_(5)3=b , then find the value of log_(3)10 in terms of a and b.

The value of 4^(5log_(4sqrt(2)) (3-sqrt(6))-6log_(8)(sqrt(3)-sqrt(2))) is

There exists a positive number k such that log_2x+ log_4x+ log_8x= log_kx , for all positive real no x. If k= a^(1/b) where (a,b) epsilon N, the smallest possible value of (a+b)= (c)

If f(x)= e^(x) and g(x)= log^(e^(x)) then which of the following is TRUE