For one month, Siera calculated her hometown's average high temperature in degrees Fahrenheit. She wants to convert that temperature from degrees Fahrenheit to degrees Celsius using the function [tex]$C(F)=\frac{5}{9}(F-32)$[/tex].

What does [tex]$C(F)$[/tex] represent?

A. The temperature of [tex][tex]$F$[/tex][/tex] degrees Fahrenheit converted to degrees Celsius.
B. The temperature of [tex]$F$[/tex] degrees Celsius converted to degrees Fahrenheit.
C. The temperature of [tex]$C$[/tex] degrees Fahrenheit converted to degrees Celsius.
D. The temperature of [tex][tex]$C$[/tex][/tex] degrees Celsius converted to degrees Fahrenheit.

Let's analyze the given function and what it represents.

The function provided is:
[tex]\[ C(F) = \frac{5}{9}(F - 32) \][/tex]

This is a formula used to convert a temperature from degrees Fahrenheit (F) to degrees Celsius (C).

To understand what [tex]$ C(F) $[/tex] represents, let's break down the components of the function:
- [tex]$ F $[/tex] in this function stands for the temperature in degrees Fahrenheit.
- [tex]$ C(F) $[/tex] is the result of applying the conversion formula to [tex]$ F $[/tex].

The term [tex]$ (F - 32) $[/tex] adjusts the Fahrenheit temperature by the offset difference (since 32°F is the freezing point of water).
Then, multiplying by [tex]$ \frac{5}{9} $[/tex] converts this adjusted Fahrenheit measurement into a Celsius measurement.

Therefore, [tex]$ C(F) $[/tex] represents the temperature in degrees Celsius that corresponds to a given temperature [tex]$ F $[/tex] in degrees Fahrenheit.

In other words, [tex]$ C(F) $[/tex] is the temperature of [tex]$ F $[/tex] degrees Fahrenheit converted to degrees Celsius.

So, the correct answer is:
- The temperature of [tex]$ F $[/tex] degrees Fahrenheit converted to degrees Celsius