Question

How do you write a convincing argument to show why `3^0=1` using the following pattern: `3^5=243, 3^4=81, 3^3=27, 3^2=9`?

Answer 1

Refer to the Explanation.

Explanation:

`3^5,3^4,3^3,3^2,3^1,3^0,...`

`=243, 81=243/3, 27=81/3, 9=27/3, 3=9/3, 1=3/3.`

`:. 3^0=1.`

Answer 2

See argument below

Explanation:

The most convincing argument I can think of off the bat is simply:

`x^0 = 1 forall x in RR`

However, I guess that was not the argument being sought here!

Here we have a sequence: `a_n=3^n` for `n= 5 to 2`

We can extend this to: `a_1 = 3^1 = 3`

Clearly: `a_(n-1)/a_n = 1/3 -> a_(n-1) = a_n/3`

Now consider `a_0 =a_1/3 = 3/3 =1`

Since `a_0 -= 3^0` the proposition is proved.