How do you rationalize the denominator #(5 sqrt 6)/(sqrt 10)#?

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Answer 1 · 2015-04-03T01:17:37

If you multiply both the numerator and the denominator by #sqrt(10)#
then the denominator will become a non-radical.

#(5sqrt(6))/sqrt(10)#

#= (5sqrt(6))/(sqrt(10))*(sqrt(10))/(sqrt(10))#

#=(5sqrt(60))/(10)#

which can be simplified as
#(5*(2)sqrt(15))/(10)#

#= sqrt(15)#

Answer 2 · 2015-04-03T01:26:46

Two methods:

Method 1

Multiply by #1# in the form #sqrt 10 / sqrt 10# to get:

#(5sqrt6)/sqrt10 * sqrt10/sqrt10 = (5sqrt 60) /10#

Now simplify #sqrt 60 = sqrt (4*15) = 2 sqrt 15# So we have

#(5sqrt6)/sqrt10 = (5sqrt 60) /10 = (5*2 sqrt 15)/10 = sqrt 15#

Method 2

Notice that 6 and 10 are both divisible by 2, so we can start by simplifying:

#(5sqrt6)/sqrt10=(5sqrt3sqrt2)/(sqrt5sqrt2)=(5sqrt3)/sqrt5#

Method 2a: now multiply by #1# in the form #sqrt5/sqrt5# to get:

#(5sqrt6)/sqrt10= (5sqrt3)/sqrt5*sqrt5/sqrt5 = (5sqrt15)/5 = sqrt15#

Method 2b Reduce #a/sqrta = sqrta# , So #5/sqrt5 = sqrt5#
*
#(5sqrt6)/sqrt10= (5sqrt3)/sqrt5 = ((sqrt5)^2sqrt3)/sqrt5=sqrt5sqrt3= sqrt15#