Respuesta :
Answer:
[tex] R = 0.0000498 \frac{KJ}{ m m^3}=0.0000498 \frac{KJ}{m^4}=4.98x10^{-5}\frac{KJ}{m^4}[/tex]
Step-by-step explanation:
For this case we have the following value:
[tex] R = 0.0498 \frac{Kpa}{Km}[/tex]
We can convert this first to [tex]\frac{Kpa}{m}[/tex] like this:
[tex] R=0.0498 \frac{Kpa}{Km} *\frac{1km}{1000m}=0.0000498 \frac{Kpa}{m}[/tex]
Now we use the fact the the pressure is defined as [tex] P =\frac{F}{A}[/tex], whre P is the pressure, F the force and A the area, so then [tex] Kpa= \frac{KN}{m^2}[/tex] and then we can replace this:
[tex] R=0.0000498 \frac{KN}{m^3}[/tex]
Now from definition of work we know that [tex] W= Fd[/tex] where W is the work, F the force and d the distance, so then is equivalent [tex] KN =\frac{KJ}{m}[/tex]
And if we replace this into the equation we got:
[tex] R = 0.0000498 \frac{KJ}{ m m^3}=0.0000498 \frac{KJ}{m^4}=4.98x10^{-5}\frac{KJ}{m^4}[/tex]
