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What if we find the value of pi?
The value of Pi (π) is the ratio of the circumference of a circle to its diameter and is approximately equal to 3.14159. In a circle, if you divide the circumference (is the total distance around the circle) by the diameter, you will get exactly the same number.
What if pi ended?
This is correct. The answer is that pi is irrational, so it cannot be written as a ratio of integers, i.e. p/q for some integers p and q. If pi’s decimal expansion terminated or repeated, then it would necessarily be a ratio of integers.
Is pi a finite value?
It’s not possible that the decimal expansion of π is finite and we just weren’t patient enough. π is an irrational number, and irrational numbers have non-terminating, non-repeating decimal expansions. It’s a finite number, less than 44.
What is the value of Pi?
: Pi, or the Greek letter π, is a mathematical constant equal to the ratio of a circle’s circumference to its diameter — C/d. It lurks in every circle, and equals approximately 3.14. (Hence Pi Day, which takes place on March 14, aka 3/14.)
Why is Pi an irrational number?
That’s because it’s an irrational number, meaning that it cannot be represented by a fraction of two whole numbers (although approximations such as 22/7 can come close). But that hasn’t stopped humanity from furiously chipping away at pi’s unending mountain of digits.
How did ancient people calculate pi?
The misinterpretation is that these men were stretching ropes in order to calculate circles, while they were actually making measurements in order to mark the property limits and areas for temples, according to (Heath, 121). A famous Egyptian piece of papyrus gives us another ancient estimation for pi.
How did computers get the number pi so big?
ENIAC, an early electronic computer and the only computer in the U.S. in 1949, calculated pi to over 2,000 places, nearly doubling the record. As computers got faster and memory became more available, digits of pi began falling like dominoes, racing down the number’s infinite line, impossibly far but also never closer to the end.