We're glad you stopped by 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. This page is here to walk you through essential details with clear and straightforward explanations. Our goal is to make your learning experience easy, enriching, and enjoyable. Start exploring and find the information you need!
Answer :
To solve this problem, we need to understand what [tex]$C(F)$[/tex] represents in the context of the function given, which is [tex]\( C(F) = \frac{5}{9}(F - 32) \)[/tex].
This function is used to convert a temperature from degrees Fahrenheit to degrees Celsius. Let's break down what each part of this function is doing:
1. Input: The function takes an input [tex]\( F \)[/tex], which represents the temperature in degrees Fahrenheit.
2. Operation:
- First, it subtracts 32 from the Fahrenheit temperature. This adjusts the temperature measurement because the freezing point of water is 32 degrees Fahrenheit and 0 degrees Celsius.
- Then, it multiplies the result by [tex]\(\frac{5}{9}\)[/tex]. This is a conversion factor that changes the scale from Fahrenheit to Celsius.
3. Output: The result of these operations [tex]\( C(F) \)[/tex] is the temperature converted into degrees Celsius.
Understanding this, we conclude that:
- [tex]\( C(F) \)[/tex] represents the output of the function [tex]\( C \)[/tex] in degrees Celsius when the input [tex]\( F \)[/tex] is in degrees Fahrenheit.
So the correct interpretation is:
- [tex]\( C(F) \)[/tex] represents the output of the function [tex]\( C \)[/tex] in degrees Celsius when the input [tex]\( F \)[/tex] is in degrees Fahrenheit.
This function is used to convert a temperature from degrees Fahrenheit to degrees Celsius. Let's break down what each part of this function is doing:
1. Input: The function takes an input [tex]\( F \)[/tex], which represents the temperature in degrees Fahrenheit.
2. Operation:
- First, it subtracts 32 from the Fahrenheit temperature. This adjusts the temperature measurement because the freezing point of water is 32 degrees Fahrenheit and 0 degrees Celsius.
- Then, it multiplies the result by [tex]\(\frac{5}{9}\)[/tex]. This is a conversion factor that changes the scale from Fahrenheit to Celsius.
3. Output: The result of these operations [tex]\( C(F) \)[/tex] is the temperature converted into degrees Celsius.
Understanding this, we conclude that:
- [tex]\( C(F) \)[/tex] represents the output of the function [tex]\( C \)[/tex] in degrees Celsius when the input [tex]\( F \)[/tex] is in degrees Fahrenheit.
So the correct interpretation is:
- [tex]\( C(F) \)[/tex] represents the output of the function [tex]\( C \)[/tex] in degrees Celsius when the input [tex]\( F \)[/tex] is in degrees Fahrenheit.
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- 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.
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