How do you express #-5sqrt40# in simplest radical form?

2 Answers
Aug 5, 2018

#" "#
The radical expression given #color(red)(-5 sqrt(40)# can be written in simplest form as #color(blue)([-10 sqrt(10)]#

Explanation:

#" "#
Given:

#color(red)(-5 sqrt(40)#

#rArr -5*sqrt(8*5)#

#rArr -5*sqrt(4*2*5)#

#rArr =5*sqrt(4)*sqrt(10)#

#rArr -5*2*sqrt(10)#

#rArr -10*sqrt(10)#

Hence, the radical expression given #color(red)([-5 sqrt(40)]# cn be written in simplest form as #color(blue)([-10 sqrt(10)]#

Hope it helps.

Aug 6, 2018

#-10sqrt10#

Explanation:

Since #40=4*10#, we can rewrite #sqrt40# as #sqrt4sqrt10#. We now have

#-5sqrt4sqrt10#

Recall that #sqrt4=2#. With this simplification, we now have

#-10sqrt10#

Since the radical has no perfect square factors, this is the most we can simplify this.

Hope this helps!