on his first day of school, kareem found the high temperature in degrees fahrenheit to be 76.1°. he plans to…

on his first day of school, kareem found the high temperature in degrees fahrenheit to be 76.1°. he plans to use the function $c(f)=\frac{5}{9}(f - 32)$ to convert this temperature from degrees fahrenheit to degrees celsius. what does c(76.1) represent? the temperature of 76.1 degrees fahrenheit converted to degrees celsius the temperature of 76.1 degrees celsius converted to degrees fahrenheit the amount of time it takes a temperature of 76.1 degrees fahrenheit to be converted to 32 degrees celsius the amount of time it takes a temperature of 76.1 degrees celsius to be converted to 32 degrees fahrenheit

on his first day of school, kareem found the high temperature in degrees fahrenheit to be 76.1°. he plans to use the function $c(f)=\frac{5}{9}(f - 32)$ to convert this temperature from degrees fahrenheit to degrees celsius. what does c(76.1) represent? the temperature of 76.1 degrees fahrenheit converted to degrees celsius the temperature of 76.1 degrees celsius converted to degrees fahrenheit the amount of time it takes a temperature of 76.1 degrees fahrenheit to be converted to 32 degrees celsius the amount of time it takes a temperature of 76.1 degrees celsius to be converted to 32 degrees fahrenheit

Answer

Answer:

A. the temperature of 76.1 degrees Fahrenheit converted to degrees Celsius

Explanation:

Step1: Understand function notation

The function is $C(F)=\frac{5}{9}(F - 32)$ where $F$ is the temperature in Fahrenheit.

Step2: Analyze $C(76.1)$

When we write $C(76.1)$, we substitute $F = 76.1$ into the function $C(F)$. This means we are converting the 76.1 - degree - Fahrenheit temperature to Celsius using the given conversion formula.