Why Choose Us?
0% AI Guarantee
Human-written only.
24/7 Support
Anytime, anywhere.
Plagiarism Free
100% Original.
Expert Tutors
Masters & PhDs.
100% Confidential
Your privacy matters.
On-Time Delivery
Never miss a deadline.
Usually the final answer is written as ##sqrt{3}/3## To get the final answer, you need to "rationalize the denominator" by multiplying by ##1=sqrt{3}/sqrt{3}## as follows: ##sqrt{1/3}=sqrt{1}/sqrt{3}=1/sqrt{3}=1/sqrt{3} * sqrt{3}/sqrt{3}=sqrt{3}/3## It is not "mathematically illegal" to write this number as ##1/sqrt{3}## (it's not like dividing by zero or something), but the standard convention is to avoid roots in denominators, if possible
Usually the final answer is written as ##sqrt{3}/3##
To get the final answer, you need to "rationalize the denominator" by multiplying by ##1=sqrt{3}/sqrt{3}## as follows:
##sqrt{1/3}=sqrt{1}/sqrt{3}=1/sqrt{3}=1/sqrt{3} * sqrt{3}/sqrt{3}=sqrt{3}/3##
It is not "mathematically illegal" to write this number as ##1/sqrt{3}## (it's not like dividing by zero or something), but the standard convention is to avoid roots in denominators, if possible. This is done for two main reasons:
1) It helps teachers check your answers more easily.
2) Rationalizing the denominator (or numerator, for that matter) is a useful skill that can help you solve problems in higher math. For instance, in calculus, it's a trick that can often help you solve some problems about "limits".
Expert Solution
Need this Answer?
This solution is not in the archive yet. Hire an expert to solve it for you.
