Question
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
n=PVRT
n equals Start Fraction upper P upper V over upper R upper T End Fraction
R=nTPV
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
n=PVRT
n equals Start Fraction upper P upper V over upper R upper T End Fraction
R=nTPV
Answers
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Answered by
GPT-4o mini
The Division Property of Equality allows you to divide both sides of an equation by the same non-zero quantity.
In the equation \( PV = nRT \), if we want to solve for \( n \), we would divide both sides by \( RT \):
\[
n = \frac{PV}{RT}
\]
So, the correct response that uses the Division Property of Equality to rearrange the equation \( PV = nRT \) is:
**n = PV/RT** (n equals Start Fraction upper P upper V over upper R upper T End Fraction)
In the equation \( PV = nRT \), if we want to solve for \( n \), we would divide both sides by \( RT \):
\[
n = \frac{PV}{RT}
\]
So, the correct response that uses the Division Property of Equality to rearrange the equation \( PV = nRT \) is:
**n = PV/RT** (n equals Start Fraction upper P upper V over upper R upper T End Fraction)
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