How do you solve #5/6 = n/24#?

2 Answers
Jim G.
Jul 12, 2018

#n=20#

Explanation:

#"multiply both sides by 24"#

#cancel(24)^4xx5/cancel(6)^1=cancel(24)xxn/cancel(24)#

#4xx5=nrArrn=20#

#20/24=5/6=" left side"larr"check"#

Jacobi J.
Jul 12, 2018

#n=20#

Explanation:

There are two ways we can go about this:

One is a more non-traditional way:

How do we get from #6# to #24#? One way is to multiply by #4#. With this in mind, since we know our fractions are equal, #n# must be equal to #5*4#, or #20#.

Here is a more systematic way:

We can use cross multiplication. If we have the equation

#(a/b)=(c/d)#, by rearranging the equation, we know #c=(ad)/b#. In essence, we multiply diagonally and divide by the first denominator.

In our example, we have

#n=(5*24)/6=>120/6=20#

Hope this helps!

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