Which of the following is an example of using the Division Property of Equality to rearrange the equation PV=nRT ?(1 point) Responses R=PV−nT upper R equals upper P upper V minus n upper T T=PVnR upper T equals upper P upper V n upper R R=nTPV upper R equals Start Fraction n upper T over upper P upper V End Fraction n=PVRT

The Division Property of Equality states that you can divide both sides of an equation by the same nonzero number without changing the equality.

To rearrange the equation \( PV = nRT \) using this property, you would want to isolate one of the variables.

For example, if you want to solve for \( R \):

Starting with \( PV = nRT \), you can divide both sides by \( nT \) to get:

\[ R = \frac{PV}{nT} \]

So, the correct response is:

R = PV/nT or R = Start Fraction PV over nT End Fraction.