90,623 views
16 votes
16 votes
Temperatures in °F can be converted in °C using the formula

C=5(F-32)/9
Make F the subject of the formula
Give your answer in the form aC+b/c where a,b and c are all positive integers

Temperatures in °F can be converted in °C using the formula C=5(F-32)/9 Make F the-example-1
User Sean Vieira
by
2.9k points

2 Answers

27 votes
27 votes

Answer:

Explanation:

To make F the subject of the formula, you need to solve for F in the equation C = 5(F-32)/9.

You can do this by first multiplying both sides of the equation by 9 to get rid of the fraction:

C * 9 = 5(F-32)

Then, you can distribute the 5 on the right side of the equation:

C * 9 = 5F - 160

Then, you can add 160 to both sides of the equation to isolate the F term:

C * 9 + 160 = 5F

Finally, you can divide both sides of the equation by 5 to solve for F:

F = (C * 9 + 160)/5

This gives you the final form of the equation:

F = (9C + 160)/5

In this form, F is the subject of the formula. a = 9, b = 160, and c = 5 are all positive integers.

User Jramm
by
3.2k points
5 votes
5 votes

Answer:


F=(9C+160)/(5)

Explanation:

Given equation:


C=(5(F-32))/(9)

Multiply both sides by 9:


\implies 9C=5(F-32)

Divide both sides by 5:


\implies (9C)/(5)=F-32

Add 32 to both sides:


\implies (9C)/(5)+32=F


\implies F=(9C)/(5)+32

Rewrite 32 as a fraction with denominator 5:


\implies F=(9C)/(5)+(32 \cdot 5)/(5)


\implies F=(9C)/(5)+(160)/(5)


\textsf{Apply the fraction rule} \quad (a)/(c)+(b)/(c)=(a+b)/(c):


\implies F=(9C+160)/(5)

User Into Numbers
by
2.8k points