How do you simplify $(2xy^4)/(-x^2 y^0)$ ?

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Answer 1 · 2018-03-10T13:39:28

See a solution process below:

First, use this rule of exponents to simplify the denominator:

$a^color(red)(0) = 1$

$(2xy^4)/(-x^2y^color(red)(0)) => (2xy^4)/(-x^2 xx 1) => (2xy^4)/(-x^2) => -(2xy^4)/x^2$

Next, use these rules for exponents to simplify the $x$ terms:

$a = a^color(red)(1)$ and $x^color(red)(a)/x^color(blue)(b) = 1/x^(color(blue)(b)-color(red)(a))$ and $a^color(red)(1) = a$

$-(2xy^4)/x^2 => -(2x^color(red)(1)y^4)/x^color(blue)(2) => -(2y^4)/x^(color(blue)(2)-color(red)(1)) => -(2y^4)/x^color(red)(1) => -(2y^4)/x$

How do you simplify (2xy^4)/(-x^2 y^0)(2xy^4)/(-x^2 y^0)?