Which of the following is an example of using the Division Property of Equality to rearrange the equation PV=nRT?
PV/n = RT
To use the Division Property of Equality to rearrange the equation PV = nRT, you would divide both sides of the equation by the same non-zero constant.
Let's rearrange the equation using the Division Property of Equality:
Step 1: Divide both sides by P
PV/P = nRT/P
Step 2: Simplify
V = nRT/P
Therefore, the example of using the Division Property of Equality to rearrange the equation PV = nRT is V = nRT/P.
To use the Division Property of Equality to rearrange the equation PV = nRT, we need to divide both sides of the equation by the same value. This will help us isolate the variable we are interested in.
In this case, let's say we want to isolate the variable "V." To do that, we can divide both sides of the equation by "P". The Division Property of Equality states that if a = b, then a/c = b/c, as long as c is not zero.
So, dividing both sides of the equation PV = nRT by "P", we get:
PV/P = (nRT)/P
Simplifying this, we have:
V = (nRT)/P
Therefore, V = (nRT)/P is an example of using the Division Property of Equality to rearrange the equation PV = nRT.