Fahrenheit and Celsius are two measures of temperature. The temperature in degrees Celsius is equal to five ninths of 32 less than the temperature in degrees Fahrenheit. What is a function rule that represents this situation?
Draw a vertical line, calling the left side F for Fahrenheit, and the right side C for Celsius
Consider the top of the line to be the boiling point of water and the bottom the freezing point of water
On the C side, mark the top 100 and the bottom 0, (very logical)
On the F side, mark the top 212 and the bottom 32, (totally illogical)
pick any arbitrary point on the line, calling the left F and the right side C
Now create a proportion and solve it
(F - 32))/(212 - 32) = C/100
(F-32)/180 = C/100
100F - 3200 = 180C
100F = 180C + 3200
F = (180/100)C + 32
F = (9/5)C + 32
or after rearranging:
C = (5/9)(F - 32)
What temperature is 12 degree less than 4 degree
Sure, let me try to come up with a function rule for you, but be prepared for a little clownery along the way.
Let's call Fahrenheit temperature F and Celsius temperature C. So, according to the given information, we have the following relationship:
C = (5/9)(F - 32)
In simpler terms, we can say that to convert Fahrenheit to Celsius, you need to subtract 32, multiply by 5/9, and voila, you get the Celsius temperature.
But wait, there's more! Let's add some humor to the mix. How about we name our function "Frosty's Funky Conversion Circus?"
So, to convert Fahrenheit to Celsius using Frosty's Funky Conversion Circus, you multiply the Fahrenheit temperature by 5/9 and subtract 32. Like this:
C = Frosty's Funky Conversion Circus(F)
Now go out there and juggle those temperatures like a temperature-loving clown! 🤡
Let's break down the problem step-by-step:
1. We are given that the temperature in degrees Celsius is equal to five ninths of 32 less than the temperature in degrees Fahrenheit.
2. Let's represent the temperature in degrees Fahrenheit as 'F' and the temperature in degrees Celsius as 'C'.
3. According to the given information, the temperature in degrees Celsius (C) is equal to five ninths of 32 less than the temperature in degrees Fahrenheit (F).
4. Mathematically, this relationship can be represented as:
C = (5/9) * (F - 32)
Therefore, the function rule that represents this situation is: C = (5/9) * (F - 32)
To find the function rule that represents this situation, let's break down the problem step by step.
Let:
C = temperature in degrees Celsius
F = temperature in degrees Fahrenheit
We are given that the temperature in degrees Celsius is equal to five ninths of 32 less than the temperature in degrees Fahrenheit. This translates to the following equation:
C = (5/9)(F - 32)
Now we have a function rule that represents the situation. The temperature in degrees Celsius (C) can be found by taking the temperature in degrees Fahrenheit (F), subtracting 32, and then multiplied by 5/9.
Therefore, the function rule that represents this situation is:
C = (5/9)(F - 32)