Given that `log_2(3)=a,log_3(5)=b,log_7(2)=c`, express the logrithm of the number 63 to the base 140 in terms of a,b & c.

Given that log_(2)(3)=a,log_(3)(5)=b,log_(7)(2)=c express the logrithm of the number 63 to the base 140 in terms of a,b o* c.

Given that log_(2)3=a,log_(3)5=b,log_(7)2=c then the value of log_(140)63 is equal to

If log_(2)3=a,log_(3)5=b,log_(7)2=c find log_(140)63 in terms of a,b,c.

Given that log2,=a and log3=b ; write log sqrt(96) in terms of a and b

If log_(10)^(7)=b,log_(10)^(2)=a then express log_(5)^(9.8) in terms of a and b

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

If a, b, c are positive numbers such that a^(log_(3)7) =27, b^(log_(7)11)=49, c^(log_(11)25)=sqrt(11) , then the sum of digits of S=a^((log_(3)7)^(2))+b^((log_(7)11)^(2))+c^((log_(11)25)^(2)) is :

Let a = log 3, b = (log 3)/(log (log 3)) (all logarithms on base 10) the number a^(b) is