Arizona - Third of a Series
Following my previous Blogs stating my position and suggesting a
solution, I offer some statically supported mathematical conclusions to
validate my plan to control the illegal immigration problem. My source
for the number of available law enforcement officers is the year 2000
United States Census documents.
The official count is: 1,536,287 citizens who have taken an oath,
swearing to enforce Local and State Laws as well as the Constitution of
the United States of America.
While an official count of illegal immigrants is non-existent, the
party in power estimates around eleven (11) million may be close.
Dividing 11,000,000 by 1,536,287 will tell you that if each sworn
officer asks seven (7) people who are illegal, the task will be nearly
complete. Therefore, at one interview per week, the illegal problem
would be solved within two (2) months.
Surely, not a difficult or impossible task. We have laws in place. We
only need to enforce them.
I offer this summary; I believe the primary issue focused on by many
elected representatives in our current congress is to gain more
political power, not to enforce any law that is on the books. Any
politician who claims or votes otherwise is being self serving and
needs to be voted out of office at our earliest opportunity.
A link to review previous Blogs:
First of a series,
Arizona, the issue.
Second of a series,
Arizona, my plan.
Happy screening, Brad
Brads Blog, “The Finer Cut”, is another of
many
planned. Each issue will cover a topic of interest about our machines,
our industry, our customers and more. I look forward to this task and
am excited about the opportunity to broaden our communications with our
customers and industry. I invite you to return and visit from time to
time, cruising back through issues to see what I may have been thinking
of at another time.
I also invite you, our reader to contribute by offering your comments.
Please send your thoughts to Brad@orbitscreens.com
, by letter or fax, 563-922 9060.
Happy screening
Brad Schnittjer
Blog # 48
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