Rewrite the expression in the form z^(n). (1)/(z^(-(1)/(2)))=◻

Understand Expression: Understand the given expression. We have the expression (1)/(z^(-(1)/(2))). We need to rewrite this expression in the form of z^(n), where n is some exponent.Use Negative Exponents: Use the property of negative exponents. The property of negative exponents states that a^(-n) = 1/(a^n). We can apply this property to the given expression to rewrite the denominator. So, (1)/(z^(-(1)/(2))) becomes z^((1)/(2)).Check for Simplifications: Check for any further simplifications. Since there are no more operations to perform, the expression is already in the form of z^(n).

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Rewrite the expression in the form
z^(n).

(1)/(z^(-(1)/(2)))=◻

Rewrite the expression in the form $z^{n}$ . $\newline$ $\frac{1}{z^{-\frac{1}{2}}}=\square$

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Math Problems

Algebra 1

Simplify linear expressions using properties

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Q. Rewrite the expression in the form

z^{n}

\newline

\frac{1}{z^{-\frac{1}{2}}}=\square

Understand Expression: Understand the given expression. $\newline$ We have the expression $(1)/(z^{-(1)/(2)})$ . $\newline$ We need to rewrite this expression in the form of $z^{n}$ , where $n$ is some exponent.
Use Negative Exponents: Use the property of negative exponents. $\newline$ The property of negative exponents states that $a^{-n} = \frac{1}{a^n}$ . $\newline$ We can apply this property to the given expression to rewrite the denominator. $\newline$ So, $\frac{1}{z^{-\frac{1}{2}}}$ becomes $z^{\frac{1}{2}}$ .
Check for Simplifications: Check for any further simplifications. Since there are no more operations to perform, the expression is already in the form of $z^{n}$ .