# Explain how exponential expression simplifies?

It's been a very long time and I cannot find a simple answer or rule to this... Anyone mind explaining how this is equal?

(i.e. what are the steps needed to get the side to the left of the "=" sign to equal the side on the right?)

(36^24 - 35^24) / 36^24 = 1 - (35/36)^24

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You should try posting questions like this on math.stackexchange.com. –  arshajii Sep 7 '12 at 22:22
C'mon man, this doesn't belong on math.stackexchange.com. It's nothing more than the simplest algebra problem that ever was. A grammar school student should be able to do this. –  duffymo Sep 8 '12 at 2:16
@duffymo - At the same time, it does not belong here either. –  user85109 Sep 8 '12 at 9:30
@woodchips - agreed. That's what I'm saying. –  duffymo Sep 8 '12 at 12:49

``````(36^24 - 35^24) / 36^24
``````

Apply the distributive property -- that is, `(a*b)*c = a*c + b*c`:

``````= 36^24 / 36^24 - 35^24 / 36^24
``````

Simplify the first expression, because `a/a = 1` provided `a != 0`:

``````= 1 - 35^24 / 36^24
``````

Now we can apply `a^n * b^n = (a * b)^n`, for `a = 35`, `b = 1/36`, and `n = 24`:

``````= 1 - (35/36)^24
``````
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First, you divide both terms by 36^24:

``````(36^24 - 35^24) / 36^24 = 36^24/36^24 - 35^24/36^24
``````

`36^24/36^24` is, of course, just 1. Recall also that `a^x/b^x = (a/b)^x`, and then you can make the last substitution:

``````1 - 35^24/36^24 = 1 - (35/36)^24
``````
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Lets consider a simpler expression first.

(a-b)/c

This can be expressed as

a/c - b/c

Now lets consider how exponents work.

a^3 = a * a * a.

b^3 = b * b * b.

So, a^3/b^3 = (a*a*a)/(b*b*b)

``````          = (a/b) * (a/b) * (a/b)

= (a/b)^3.
``````
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Very simply we have

`````` (a - b)/a  = (a/a) - (b/a) = 1 - (b/a)
``````

`````` a = 36^24,   b = 35^24
``````

which gives

`````` (a - b)/a = 1 - (b/a)

= 1 - (35^24 / 36^24)

= 1 - (35/36)^24
``````

If any of the above does not make sense, read this http://en.wikipedia.org/wiki/Exponentiation and then review the answers here again.

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