Let `a=(log)_3(log)_3 2.` An integer `k` satisfying `1<2^(-k+3^((-a)))<2,` must be less than ..........

Let y = acos(log x) + bsin (logx) , then

Let n and k be positive integers such that n ge K(K + 1)/2 . Find the number of solutions ( x_(1) , x_(2) , x_(3),………., x_(k) ) x_(1) ge 1, x_(2) ge 2, ……….. X_(k) ge k , all integers satisfying the condition x_(1) + x_(2) + x_(3) + ………. X_(k) = n .

Let log_(a)N=alpha + beta where alpha is integer and beta =[0,1) . Then , On the basis of above information , answer the following questions. The difference of largest and smallest integral value of N satisfying alpha =3 and a =5 , is

log_(3)2,log_(6)2,log_(12)2 are in :

If log2=0.301 and log3=0.477, find the number of integers in 5^(200)

If log2=0.301 and log3=0.477, find the number of integers in (ii) 6^(20)

lim_(x->1) (log_3 3x)^(log_x 3)=

Prove that (log_(2)8)/(log_(3)9) =3/2

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

Find the number of solution of theta in [0,2pi] satisfying the equation (log)_(sqrt(3))tanthetasqrt((log)_(tantheta)3+(log)_(sqrt(3))3sqrt(3)) =-1