Let L be the number of digits in `3^40 and M` be the number of zeroes in `3^(-40)` after decimal before a significant digit, then find (L-M).

Let ‘m’ be the number of digits in 3^(40)" and " 'p' be the number of zeroes in 3^(-40) after decimal before starting a significant digit the (m + p) is (log 3 = 0.4771)

Let N be the number of significant digits in 100^(23) and M be the number of zeros after decimal but before significant digit in e^(-23) Then which of the following is(are) correct? (Use: log_(10)e=0.434)

Find the number of zeros after decimal before a significant figure start in 3^(-50) .

Find the number of zeros after decimal before a significant figure start in (0.35)^(12).

Find the number of zeros after decimal before a significant figure star in ((9)/(8))^(-100)

Let x=5^((log_5 2+log_5 3)) If 'd' denotes the number of digits before decimal in x^30 and 'c' denotes the number of naughts after decimal before a significant digit starts in x^(-20), then find the value of (d-c).

Let a denotes number of digits in 2^(50),b denotes number of zero's after decimal and before first significant digit in 3^(50) and c denotes number of natural numbers have characteristic 3 with base 5, then (Given: log_(10)2=0.301 and log_(10)3=0.4771). The value of c-a xx b is

The number of zeros after decimal before the start of any significant digit in the number N=(0.15)^(20) are :

The number of zeros after decimal before the start of any significant digit in the number N=(0.15)^(20) are :

Find the number of naughts after decimal before a significant figure comes in the number ((5)/(6))^(100)