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

1 answer

To use the Division Property of Equality to rearrange the equation PV = nRT, we want to isolate one of the variables by dividing both sides of the equation by a term.

The correct rearrangement that uses the Division Property of Equality is:

R = PV/nT

Here, we have divided both sides of the equation by nT to isolate R.

So, the correct response from the options you provided is:

R = PV/nT (upper R equals upper P upper V over n upper T)