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Bingo Strategy for Play and win
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How To Play Bingo!
Bingo is a game that is elegant in its simplicity -- and it's even
easier online.
The objective of any style of bingo is to complete the game pattern
on your bingo card before any other player. If you do, you have
a "bingo" and win the prize. Easy!
When playing online, your bingo cards are randomly selected for
you. Most online games give you 3 or 4 cards. Other games let you
take more.
Every online bingo game has a caller or a display board for the
bingo numbers. The game pattern is also displayed.
It's important to pay attention to the pattern. You only need the
numbers that form the pattern to win the game. Some patterns are
much easier than others to complete. The most basic patterns are
straight lines in a horizontal, vertical or diagonal direction.
Another simple and popular game is the "blackout" or "coverall"
where you have to cover the whole card.
The numbers are announced quickly, usually 10 seconds apart, so
you must pay careful attention to the numbers that are called and
mark them quickly and accurately on your cards. Some games automatically
mark the numbers on your card for you, but that takes much of the
fun out of the game.
The play continues until one or more players claim bingo. Then
the game stops immediately and the numbers are verified. If there's
a winner announced, the prize is awarded. If there is more than
one winner, they split the prize.
Next the players get new cards and a new pattern is displayed.
And a new bingo game begins!
Bingo Strategy
Winning at Bingo is not all luck, contrary to popular belief. There
are ways to bend the odds in your favor and become a more consistent
winner, if you know how!
Now noted mathematical analyst Joseph E. Granville, creator of
successful stock market strategies used by thousands, has directed
the enormous power of his analytical mind to the game of Bingo.
After years of painstaking research, he has developed proven strategies
that give you a clear competitive edge so that you can actually
beat your luck at Bingo!
Techniques Anyone Can use:
Granville's techniques are so simple anyone can use them. There's
no complicated figuring, no giant mental calculations to be done.
Granville lays out the simple step-by-step procedures for you to
follow which automatically turn any game of Bingo you play in your
favor.
Sound impossible? It isn't. Extensive study of thousands of games
has led Granville to the inescapable conclusion that every Bingo
game follows definite patterns… patterns the average player
is completely unaware of. By utilizing these patterns, Granville
had discovered how to beat the odds at Bingo. Now you can too!
Startling Discoveries About Card Selection:
Naturally, the heart of any winning Bingo system is card selection.
Granville has isolated crucial relationships between winning Bingo
numbers and the master board. He shows you how to use these simple
and proven truths to select a greater number of winning cards. Most
methods players use to select their cards are completely backwards,
Granville found. Players are working against themselves without
even realizing it!
Money Strategy Makes For Big Winners:
Even in games where you can't select your cards, there are ways
to beat the odds and come up a winner. For instance, most Bingo
enthusiasts play several cards a game to improve their chances of
winning. But does this really work? No, says Granville! The startling
truth is that you can actually improve your chances of winning big
by playing fewer cards in many cases. Granville proves it! Curious?
Read on to find out how fewer cards can be better.
So why trust to luck when you play Bingo? You can make the game
pay you to play. If you're honestly serious about becoming a systematic
winner at Bingo, here is an idea that you can use today.
The most natural reaction to advancing a serious theory designed
to improve the chances of winning at bingo is encountered when confronting
those who do not believe that such a sound theory is possible. The
usual reaction to those who might devise various bingo "systems"
is that it is all pure fantasy. They will tell you that nobody knows
what balls are going to come out of the machine and that the game
is totally one of luck. While it may appear at first glance difficult
to counter such a reaction, the solid structure of mathematical
probability is capable of destroying the argument. The key to beating
the bingo game lies in a clear understanding of the word random.
Our typical critic will agree that the colored balls being drawn
from a machine are popping out at random. Now, having a common agreement
on this fact, the next step is simply to show such critics that
there is far more to the word random than first meets the eye.
As every player knows, there are 75 balls in the machine, numbered
from 1 to 75. The probability of any ball coming up on the first
draw is exactly equal, 1 in 75, written as 1/75. Since the probabilities
are equal, we call this a uniform distribution. Random for s H numbers
drawn from a uniform distribution fall into predictable patterns
governed by the laws of probability. Therein lies the answer to
transforming the otherwise hopeless problem into a series of systematic
solutions which will determine the best selection of bingo cards.
Granted that the balls come out of the machine at random, then three
things must have a strong tendency to occur:
There must be an equal number of numbers ending in 1's, 2's, 3's,
4's etc.
Odd and even numbers must tend to balance.
High and low numbers must tend to balance.
Those are the three accepted tests for randomness. Unless the distribution
meets those tests it is said that there is a bias and the distribution
is not random. We can add a fourth test for randomness which has
a peculiarly effective application at beating the bingo game.
This fourth test is best described by the English statistician
L. H. C. Tippett in his book, Sampling.- "As a random sample
is increased in size, it gives a result that comes closer and closer
to the population value." Translated into simple everyday language,
the bingo master board of 75 numbers constitutes the "population".
The average number in that population is the average of the entire
75 numbers. Going from 1 to 75, the average number on the bingo
board is 38. The first few numbers called in a bingo game may or
may not average 38, but it is certain that as the game progresses
the average of the numbers called will steadily approach 38. The
author will wager that not one in ten players is aware of this statistical
fact. So then, when bingo numbers are being called, the entire game
(which consists of an average of 12 calls) is a sampling of the
entire population and the larger the sample the closer the numbers
will average to 38. Obviously this fact will play a key role in
the strategic selection of bingo cards.
The next time you play bingo, note very carefully an amazing characteristic
relating to the first ten numbers flashed on the master board. With
very few exceptions, you will note that a preponderance of the numbers
have different digit endings! The average bingo player, putting
all the attention on the cards rather than the master board, would
tend to overlook this, the most important single characteristic
of the first ten numbers called in any bingo game. Since most regular
games last for about ten to twelve calls or less, you will vastly
improve your chances of selecting a winning card by concentrating
on numbers having different digit endings.
Probability Predicts Different Digit Ending
The reason behind this important piece of information goes back
to the first characteristic of drawing numbers at random from a
uniform distribution. The first expectation would be that there
would be an equal number of numbers ending in 1's, 2's, 3's, 4's
etc. Since we are only concerned with the first ten or twelve numbers
to be called, not enough balls have been drawn to expect more than
a minimum of digit pairs. The laws governing a sample drawing of
ten balls out of seventy five would show a strong tendency toward
there being one ball with a number ending in 1, another ending in
2, another ending in 3, etc. until most of the ten digit endings
are represented. The law is derived from simple probability. If
the first number called in a game is N-31 then all the probabilities
are increased on the next draw that the second number will not end
with the digit 1 simply because there are more balls having different
digit endings than there are balls left with numbers ending in 1.
If the next number is G-56 then the probabilities are increased
that the next number will not end in 1 or 6. For the first six numbers
called in a game the probabilities are clearly in favor of all having
different digit endings. From the seventh number on the probabilities
favor pairing up one or more of the ending digits. This then accounts
for the actual experience wherein it is shown that 60% of the first
ten numbers called in any bingo game will tend to have different
digit endings.
To validate the writer's assumption that there is a natural tendency
first toward numbers having different digit endings, 49-game series
was reviewed and the first ten numbers in each game is rated percentage
wise for different digit endings.
Every-bingo card consists of 24 numbers and the free spot in the
middle. Those 24 numbers occupy 16 strategic squares, the remaining
numbers covering the dead squares. The clear majority of all winning-bingo
combinations consist of numbers occupying strategic squares. The
only time the dead squares are involved with a winning-bingo combination
is when the-bingo is made the "hard" way, 5 straight vertical
numbers, or five straight horizontal numbers. All number selections
for the regular and most of the special games require the use of
only the strategic squares.
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