Stigma Notation
n^E ar^i=1 i=1
In statistics, stigma notation is a method of representing very large or very small numbers using scientific notation. It involves expressing a number as a product of a coefficient and a power of 10.
The coefficient is a number that is greater than or equal to 1 and less than 10. It represents the significant digits of the original number. The power of 10 represents how many places the decimal point needs to be moved to obtain the original number.
For example, the number 35,000 in stigma notation would be written as 3.5 x 10^4. In this case, the coefficient is 3.5, which contains the significant digits of the original number, and the power of 10 is 4, which represents the number of times the decimal point needs to be moved to obtain 35,000.
Similarly, the number 0.0000023 in stigma notation would be written as 2.3 x 10^-6. In this case, the coefficient is 2.3, and the power of 10 is -6, which represents the number of times the decimal point needs to be moved to obtain 0.0000023.
Stigma notation is commonly used in scientific and engineering fields to express very large or small numbers in a concise and standardized format. It allows for easier comparison and calculation of numbers that vary widely in magnitude.
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