Given that `log(2)=0. 3010 ,` the number of digits in the number `2000^(2000)` is

The last digit of the number 6^(500) is

The number log_(2)7 is :

The last digit of the number 11^(132) is

The last digit of the number 11^(132) is

If log2=0.301, the number of integers in the expansion of 4^(17) is

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

Given ,log2=0.301 and log3=0.477, then the number of digits before decimal in 3^12times2^8 is

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

Suppose U denotes the number of digits in the number (60)^(100) and M denotes the number of cyphers after decimal, before a significant figure comes in (8)^(-296) . If the fraction U/M is expressed as rational number in the lowest term as p//q (given log_(10)2=0.301 and log_(10)3=0.477 ) . The value of p is

Suppose U denotes the number of digits in the number (60)^(100) and M denotes the number of cyphers after decimal, before a significant figure comes in (8)^(-296) . If the fraction U/M is expressed as rational number in the lowest term as p//q (given log_(10)2=0.301 and log_(10)3=0.477 ) . The value of q is