How do you simplify #root3(8x^4) +root3(xy^6)#?

Question

1574 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-08-30T15:20:58

#x^(1/3)# [2x+# y^2#]

#8^(1/3) x^(4/3)# +#x^(1/3) y^(6/3)#
= 2#x^(4/3) + x^(1/3) y^2#
=#x^(1/3)#[2x + #y^2#]

Answer 2 · 2016-08-30T15:49:56

#root(3)(x) (2x+y^2)#

Look for cubed values within the root that you can take outside the root.

Write as:#" "root(3)(2^3x^3x) + root(3)(xy^3y^3)#

#2xroot(3)(x)+y^2root(3)(x)#

#root(3)(x) (2x+y^2)#