Difference between revisions of "Manuals/calci/SQRTPI"
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*This function gives the square root of <math>(pi*n)</math>. | *This function gives the square root of <math>(pi*n)</math>. | ||
*The <math> pi</math> is a mathematical constant with a value approximate to 3.14159. | *The <math> pi</math> is a mathematical constant with a value approximate to 3.14159. | ||
− | *In <math> SQRTPI(n)</math>, <math>n</math> is the number by which <math> p </math> is multiplied. When we are omitting the value of <math> n</math>, then it will consider the value <math>n=1<math>. | + | *In <math> SQRTPI(n)</math>, <math>n</math> is the number by which <math> p </math> is multiplied. When we are omitting the value of <math> n</math>, then it will consider the value <math>n=1</math>. |
− | *<math> PI()</math> is denoted by the Greek letter <math> \ | + | *<math> PI()</math> is denoted by the Greek letter <math> \pi</math>. |
− | *<math> \ | + | *<math> \pi </math> is a transcendental number and irrational number. |
*Being an irrational number,<math> π </math> cannot be expressed exactly as a ratio of any two integers ,but we can express as the fraction 22/7 is approximate to the π value , also no fraction can be its exact value. | *Being an irrational number,<math> π </math> cannot be expressed exactly as a ratio of any two integers ,but we can express as the fraction 22/7 is approximate to the π value , also no fraction can be its exact value. | ||
This function will give the result as error when n<0. | This function will give the result as error when n<0. | ||
− | |||
==Examples== | ==Examples== |
Revision as of 00:24, 5 February 2014
SQRTPI(n)
- is the number.
Description
- This function gives the square root of .
- The is a mathematical constant with a value approximate to 3.14159.
- In , is the number by which is multiplied. When we are omitting the value of , then it will consider the value .
- is denoted by the Greek letter .
- is a transcendental number and irrational number.
- Being an irrational number,Failed to parse (syntax error): {\displaystyle π } cannot be expressed exactly as a ratio of any two integers ,but we can express as the fraction 22/7 is approximate to the π value , also no fraction can be its exact value.
This function will give the result as error when n<0.
Examples
- =SQRTPI(1) = 1.772453851
- =SQRTPI(0) = 0
- =SQRTPI(5) = 3.963327298
- =SQRTPI(-2) = NAN
See Also