Discrete Math: Multiplication Principle Word Problem. Assuming that there will never be more than 500 million people in the United States before the year 2050 AD, how many alphanumeric-upper digits are necessary to provide every person with a personal zip code? (Notice that businesses and institutions are being neglected in this count.)

cubanwongux

cubanwongux

Answered question

2022-09-05

Discrete Math: Multiplication Principle Word Problem
Assuming that there will never be more than 500 million people in the United States before the year 2050 AD, how many alphanumeric-upper digits are necessary to provide every person with a personal zip code? (Notice that businesses and institutions are being neglected in this count.)
If the answer is 9 digits, how can I write this in the form ( n x ) ?

Answer & Explanation

Harper Brewer

Harper Brewer

Beginner2022-09-06Added 16 answers

Step 1
Let r   =   500000000.
You want the smallest positive integer n such that
36 n r .
Taking logarithms of both sides:
n × log   36 log   r n log   r log   36 .
By the way, this can actually be approximately solved without a calculator, by using logarithms, base 10, rather than base e, if you happen to know that
log 10   2   approximately   =   0.301     and     log 10   3   approximately   =   0.477.
Then, you have that
log 10   36   approximately   =   2 × ( 0.301 + 0.477 )
and
log 10 r   approximately   =   8.699.
Therefore, n is the smallest positive integer such that
n 8.699 2 × ( 0.301 + 0.477 ) .

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