What is #(4x^4y^-5z^4)/(6x^5yz^6)#?

1 Answer
EZ as pi
Apr 14, 2017

#2/(3xy^6z^2)#

Explanation:

There are several ways to simplify indices, but they all involve applying the correct laws.

  • Get rid of the negative index: #x^-m - 1/x^m#

#(4x^4color(blue)(y^-5)z^4)/(6x^5yz^6) = (4x^4z^4)/(6x^5ycolor(blue)(y^5)z^6)#

  • Recall multiplying and dividing laws of indices:

#x^m xx x^n = x^(m+n) and x^m/x^n = x^(m-n)#

#(4x^4z^4)/(6x^5ycolor(blue)(y^5)z^6) = 2/(3xy^6z^2)#

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