![Trending Articles on Technical and Non Technical topics](/images/trending_categories.jpeg)
Data Structure
Networking
RDBMS
Operating System
Java
MS Excel
iOS
HTML
CSS
Android
Python
C Programming
C++
C#
MongoDB
MySQL
Javascript
PHP
Physics
Chemistry
Biology
Mathematics
English
Economics
Psychology
Social Studies
Fashion Studies
Legal Studies
- Selected Reading
- UPSC IAS Exams Notes
- Developer's Best Practices
- Questions and Answers
- Effective Resume Writing
- HR Interview Questions
- Computer Glossary
- Who is Who
Compare the following numbers:
$(i)$. $2.7\times10^{12};\ 1.5\times10^8$
$(ii)$. $4\times10^{14};\ 3\times10^{17}$
Given:
Given numbers are
$(i)$. $2.7\times10^{12};\ 1.5\times10^8$
$(ii)$. $4\times10^{14};\ 3\times10^{17}$
To do:
We have to compare the given numbers.
Solution:
$(i)$. $2.7 \times 10^{12} = 2.7 \times 10^8 \times 10^4$
$=(2.7\times10000)\times10^8$
$=27000\times10^8$
As $27000>1.5$
$27000\times10^8 > 1.5\times10^8$
Therefore,
$2.7 \times 10^{12} > 1.5\times10^8$.
$(ii)$. $3 \times 10^{17} = 3 \times 10^3 \times 10^{14}$
$=(3\times1000)\times10^{14}$
$=3000\times10^{14}$
As $3000>4$
$3000\times10^{14} > 4\times10^{14}$
Therefore,
$3 \times 10^{17} > 4\times10^{14}$.
Advertisements