Answer: [tex]-330.47 \°M[/tex]
Explanation:
Let's begin by explaining that the relation between the Celsius scale and Kelvin scale is:
[tex]\°C +273.15=K[/tex]
This means the absolute zero point of the Kelvin scale is [tex]0 K=-273.15 \°C[/tex]
Keeping this in mind, we have the freezing point and boling point of Methane as:
Freezing point: [tex]0 \°M=-182.6 \°C=90.55 K[/tex]
Boiling point: [tex]100 \°M=-155.2 \°C=117.95 K[/tex]
According to this, there is a linear relation between the methane scale ([tex]\°M[/tex]) and the Kelvin scale in the form:
[tex]T=a+bt_{M}[/tex] (1)
Where:
[tex]T[/tex] is the temperature in Kelvin
[tex]t_{M}[/tex] is the temperature in degrees Methane
Firstly, we need to find the value of [tex]a[/tex] and [tex]b[/tex] with the two given points ([tex]90.55 K[/tex] and [tex]117.95 K[/tex]):
When [tex]T=90.55[/tex] and [tex]t_{M}=0[/tex]:
[tex]90.55=a+b(0)[/tex]
[tex]a=90.55[/tex] (2)
When [tex]T=117.95[/tex] and [tex]t_{M}=100[/tex]:
[tex]117.95=90.55+b(100)[/tex]
[tex]b=0.274[/tex] (3)
Now we have the linear equation:
[tex]T=90.55+0.274t_{M}[/tex] (4)
Isolating [tex]t_{M}[/tex]:
[tex]t_{M}=\frac{T-90.55}{0.274}[/tex] (5)
Evaluating for [tex]T=0 K[/tex]:
[tex]t_{M}=\frac{0-90.55}{0.274}[/tex] (6)
Finally:
[tex]t_{M}=-330.47 \°M[/tex]
This means [tex]0 K=-330.47 \°M[/tex]
