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Line 1: − + − + − + − + − + − + − *e=1+(1/1)+(1/1.2)+(1/1.2.3)+(1/1.2.3.4) +...+ − +
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<div style="font-size:30px">'''EXP(x)'''</div><br/>
<div style="font-size:30px">'''EXP(x)'''</div><br/>
*where x is the number .
*where <math>x</math> is the number .
==Description==
==Description==
*This function gives the e raised to the power of number.
*This function gives the <math>e</math> raised to the power of number.
*In EXP(x), where x represents the exponent of e, or e^x.
*In <math>EXP(x)</math>, where <math>x</math> represents the exponent of <math>e</math>, or <math>e^x</math>.
*The approximate value of the constant e=2.718281828459045 and it is equal to e^1 or EXP(1).
*The approximate value of the constant <math>e=2.718281828459045<math> and it is equal to <math>e^x</math> or <math>EXP(1)<math>.
*It is called the mathematical constant or Euler's number or Napier's constant.
*It is called the Mathematical Constant or Euler's Number or Napier's Constant.
*Also it is the base of natural logarithm.It can be calculate in the sum of infinite series:
*It is the base of natural logarithm.
*It can calculate the sum of infinite series: <math>e=1+(1/1)+(1/1.2)+(1/1.2.3)+(1/1.2.3.4) +...</math>
*And the inverse function of the natural logarithm function is the exponential function:
*And the inverse function of the natural logarithm function is the exponential function:
*f -1(x) = e^x.
*<math>f^{-1}(x) = e^x</math>.
==Examples==
==Examples==