Given that "log"(10)2 = 0.30103, " log"...

Given that `"log"_(10)2 = 0.30103, " log"_(10) 3 = 0.47712` (approximately), find the number of digits in `2^(8), 3^(12)`.

Text Solution

Verified by Experts

The correct Answer is:

9

Topper's Solved these Questions

BASIC ALGEBRA
SURA PUBLICATION|Exercise SECTON - D (5 MARKS)|5 Videos
BASIC ALGEBRA
SURA PUBLICATION|Exercise SECTION -B (2 MATRKS )|7 Videos
BINOMIAL THEOREM, SEQUENCES AND SERIES
SURA PUBLICATION|Exercise ADDITIONAL PROBLEMS|10 Videos

Similar Questions

Explore conceptually related problems

If (log)_(10)2=0. 30103 ,(log)_(10)3=0. 47712 , then find the number of digits in 3^(12)*2^8

If log(2)=0.30103 find the number of digits in 2^(100)

If log_(10) 2 = 0.3010 and log_(10) 3 = 0.477 , then find the number of digits in the following numbers: (a) 3^(40)" "(b) 2^(22) xx 5^(25)" (c) 24^(24)

Find the value of log_(10)0.001

There are 3 number a, b and c such that log_(10) a = 5.71, log_(10) b = 6.23 and log_(10) c = 7.89 . Find the number of digits before dicimal in (ab^(2))/c .

If log10^(2) = .3010, log10^(3) = .4771 find log_(10)36

Find the number of digits in 4^(2013) , if log_(10) 2 = 0.3010.

If log 10^(2) = 0.3010 log 10^(3) = 0.4772 find log 10^(144)

Prove that 1/3<(log)_(10)3<1/2dot

If log_(2)(log_(2)(log_(2)x))=2 , then the number of digits in x, is (log_(10)2=0.3010)

SURA PUBLICATION-BASIC ALGEBRA-SECTION - C (3 MARKS )

Solve : (|x|-1)/(|x| - 3) ge 0, x in RR, x ne pm 3.
Text Solution
|
Resolve into partial fractions : (x)/((x + 3)(x - 4)).
Text Solution
|
Given that "log"(10)2 = 0.30103, " log"(10) 3 = 0.47712 (approximatel...
Text Solution
|
Resolve into partial fractions : (10x+30)/((x^(2)-9)(x+7)).
Text Solution
|
Solve the linear in equation 4 - x le 3x + 12.
Text Solution
|