ע:ĲֻڡʽڲŻЧ,Ҫע!ڡ㡿ڲº,ɵú{PluralRun<\PluralRun>}

1ʽ֧ѧ渴ʽļֵ֧6," + - * / ^ %",˳ȼѧϵĶһµ.Ҫע,%,ڵa%bʾaʵֶbʵ,ʵֲ,Զת;ֵֻ֧"("")"仰˵,ʽдʽCԱʽдʽ

2:iĬΪλ,eĬΪȻ2.71828182845905,piĬΪԲ3.14159265358979,ȻֱΪԲʡinfʾ

3ʽֻÿһеıʽн,ֿո,֧36(45i+9)/{sin<ʽ\sin>}(23^i)˲д*ıʽ.

4ڳ,ֳ֧ĸʽ"+i"ʾһݡ:3i^2=(3*i)^2

5ֿ֧ѧ.3e10ʾ3*10^10,456e-20ʾ456*10^(-20).Ҫ˵,ʽʱֵ֧ǻ,{tan<ʽ\tan>}(45)ڱӦд{tan<ʽ\tan>}(45/180*pi){tan<ʽ\tan>}(pi/4)

6ֵ֧ĺΪ 
A: {Abs<ʽ\Abs>} {Acos<ʽ\Acos>} {Acos2<ʽ\Acos2>} {Acosh<ʽ\Acosh>} {Acosh2<ʽ\Acosh2>} {Acot<ʽ\Acot>} {Acot2<ʽ\Acot2>} {Acoth<ʽ\Acoth>} {Acoth2<ʽ\Acoth2>} {Acsc<ʽ\Acsc>} {Acsc2<ʽ\Acsc2>} {Acsch<ʽ\Acsch>} {Acsch2<ʽ\Acsch2>} {AiryAi<ʽ\AiryAi>} {AiryAiDerivative<ʽ\AiryAiDerivative>} {AiryBi<ʽ\AiryBi>} {AiryBiDerivative<ʽ\AiryBiDerivative>} {AngerE<ʽ\AngerE>} {AngerJ<ʽ\AngerJ>} {Arg<ʽ\Arg>} {Asec<ʽ\Asec>} {Asec2<ʽ\Asec2>} {Asech<ʽ\Asech>} {Asech2<ʽ\Asech2>} {Asin<ʽ\Asin>} {Asin2<ʽ\Asin2>} {Asinh<ʽ\Asinh>} {Asinh2<ʽ\Asinh2>} {Atan<ʽ\Atan>} {Atan2<ʽ\Atan2>} {Atanh<ʽ\Atanh>} {Atanh2<ʽ\Atanh2>} 

B: {BesselI<ʽ\BesselI>} {BesselJ<ʽ\BesselJ>} {BesselK<ʽ\BesselK>} {BesselY<ʽ\BesselY>} {Beta<ʽ\Beta>} {BetaIncomplete<ʽ\BetaIncomplete>} {Binomial<ʽ\Binomial>} 

C: {Ceiling<ʽ\Ceiling>} {Compare<ʽ\Compare>} {Conj<ʽ\Conj>} {Cos<ʽ\Cos>} {Cosh<ʽ\Cosh>} {CosineIntegral<ʽ\CosineIntegral>} {Cot<ʽ\Cot>} {Coth<ʽ\Coth>} {Csc<ʽ\Csc>} {Csch<ʽ\Csch>} 

D: {DawsonIntegral<ʽ\DawsonIntegral>} {DegreeToRadian<ʽ\DegreeToRadian>} {DiGamma<ʽ\DiGamma>} {DilogarithmIntegral<ʽ\DilogarithmIntegral>} {DirichletEta<ʽ\DirichletEta>} {DirichletLambda<ʽ\DirichletLambda>} {DoubleFactorial<ʽ\DoubleFactorial>} 

E: {Ei<ʽ\Ei>} {EllipticE<ʽ\EllipticE>} {EllipticF<ʽ\EllipticF>} {EllipticK<ʽ\EllipticK>} {EllipticPi<ʽ\EllipticPi>} {EllipticRC<ʽ\EllipticRC>} {EllipticRD<ʽ\EllipticRD>} {EllipticRF<ʽ\EllipticRF>} {EllipticRG<ʽ\EllipticRG>} {EllipticRJ<ʽ\EllipticRJ>} {ErdelyiG<ʽ\ErdelyiG>} {Erf<ʽ\Erf>} {Erfc<ʽ\Erfc>} {Erfi<ʽ\Erfi>} {Exp<ʽ\Exp>} {ExponentialIntegral<ʽ\ExponentialIntegral>} 

F: {Floor<ʽ\Floor>} {FractionalPart<ʽ\FractionalPart>} {FresnelCosineIntegral<ʽ\FresnelCosineIntegral>} {FresnelSineIntegral<ʽ\FresnelSineIntegral>} 

G: {Gamma<ʽ\Gamma>} {GammaIncompleteLower<ʽ\GammaIncompleteLower>} {GammaIncompleteUpper<ʽ\GammaIncompleteUpper>} {Gudermannian<ʽ\Gudermannian>} {Gudermannian2<ʽ\Gudermannian2>} 

H: {Hankel1<ʽ\Hankel1>} {Hankel2<ʽ\Hankel2>} {HarmonischeZahlen<ʽ\HarmonischeZahlen>} {HeumanLambda<ʽ\HeumanLambda>} {HurwitzZeta<ʽ\HurwitzZeta>} {HyperFactorial<ʽ\HyperFactorial>} {HyperbolicCosineIntegral<ʽ\HyperbolicCosineIntegral>} {HyperbolicSineIntegral<ʽ\HyperbolicSineIntegral>} {Hypergeometric2F1<ʽ\Hypergeometric2F1>} {HypergeometricM<ʽ\HypergeometricM>} {HypergeometricU<ʽ\HypergeometricU>} 

I: {Imag<ʽ\Imag>} {Int<ʽ\Int>} {InvGudermannian<ʽ\InvGudermannian>} {InvGudermannian2<ʽ\InvGudermannian2>} {InverseBeta<ʽ\InverseBeta>} {InverseErf<ʽ\InverseErf>} {InverseGamma<ʽ\InverseGamma>} {InverseHaversine<ʽ\InverseHaversine>} {InverseHaversine2<ʽ\InverseHaversine2>} 

J: {JacobiAmplitude<ʽ\JacobiAmplitude>} {JacobiAmplitude2<ʽ\JacobiAmplitude2>} {JacobiCn<ʽ\JacobiCn>} {JacobiDn<ʽ\JacobiDn>} {JacobiSn<ʽ\JacobiSn>} {JacobiZeta<ʽ\JacobiZeta>} 

K: {KelvinBei<ʽ\KelvinBei>} {KelvinBer<ʽ\KelvinBer>} {kelvinkei<ʽ\kelvinkei>} {Kelvinker<ʽ\Kelvinker>} 

L: {LaguerreL<ʽ\LaguerreL>} {LambertW<ʽ\LambertW>} {Lg<ʽ\Lg>} {Ln<ʽ\Ln>} {LnGamma<ʽ\LnGamma>} {Log<ʽ\Log>} {Log10<ʽ\Log10>} {LogCosine<ʽ\LogCosine>} {LogSine<ʽ\LogSine>} {LogarithmicIntegral<ʽ\LogarithmicIntegral>} 

M: {MeanArithmeticGeometric<ʽ\MeanArithmeticGeometric>} {MeanGeometryHarmonic<ʽ\MeanGeometryHarmonic>} {MulLog<ʽ\MulLog>} 

P: {PolyBernoulli<ʽ\PolyBernoulli>} {PolyChebyshevT<ʽ\PolyChebyshevT>} {PolyChebyshevU<ʽ\PolyChebyshevU>} {PolyEuler<ʽ\PolyEuler>} {PolyHermite<ʽ\PolyHermite>} {PolyLaguerre<ʽ\PolyLaguerre>} {PolyLegendre<ʽ\PolyLegendre>} {PolyLucas<ʽ\PolyLucas>} {PolyPell<ʽ\PolyPell>} {PolyRook<ʽ\PolyRook>} {PolySpread<ʽ\PolySpread>} {PolyTouchard<ʽ\PolyTouchard>} {Pow<ʽ\Pow>} 

R: {RadianToDegree<ʽ\RadianToDegree>} {Real<ʽ\Real>} {RiemannSiegelTheta<ʽ\RiemannSiegelTheta>} {RiemannZeta<ʽ\RiemannZeta>} {Round<ʽ\Round>} {Round2<ʽ\Round2>} 

S: {Sec<ʽ\Sec>} {Sech<ʽ\Sech>} {Sign<ʽ\Sign>} {Sin<ʽ\Sin>} {SineIntegral<ʽ\SineIntegral>} {Sinh<ʽ\Sinh>} {SphericalBesselJ<ʽ\SphericalBesselJ>} {SphericalBesselY<ʽ\SphericalBesselY>} {SphericalHankel1<ʽ\SphericalHankel1>} {SphericalHankel2<ʽ\SphericalHankel2>} {Sqrt<ʽ\Sqrt>} {StruveH<ʽ\StruveH>} {StruveL<ʽ\StruveL>} 

T: {Tan<ʽ\Tan>} {Tanh<ʽ\Tanh>} 

W: {WhittakerM<ʽ\WhittakerM>} {WhittakerW<ʽ\WhittakerW>} 

Z: {Zero<ʽ\Zero>}

7,ÿһбʽ,Ȼ󰴻سɵõ

:

a={sin<ʽ\sin>}(i+78*{cos<ʽ\cos>}(12i)^3-{log<ʽ\log>}(12i+6*(12+9i)))/2^i//سʾ
a = 0.559424052325164 - 0.176033012038656i

//ǼϢ
b={cos<ʽ\cos>}(a)*{exp<ʽ\exp>}(a)//سʾ
b = 1.51148294889973 - 0.101974950336539i

//עʽ
a=12(4i+56)(36-7.85i)//ʵȼ12*(4i+56)*(36-7.85i)سʾ
a = 24568.8 - 3547.2i

//עĸʽ%,ѭCԱ̵дʽ.ֻʵж,%Ҳֻ2ʵֽ.ıʽ漰,Ǿû.ע,ڶʵΪ0ʱ,ʧ.Ϊκ0û.

:

(3+7i)%(4+5i)//ʵʼ3%4
ans = 3

//޸2012/5/5
