根据莱伯尼兹公式：f(x)=e^x*cosx的n阶导数为：e^x*∑(k=0→n)C(n,k)*cos[x+(n-k)π/2],式中C(n,k)=n!/[k!(n-k)!]为n中取k的组合数.如f(x)=e^x*cosx的四阶导数为：e^x*[C(4,0)cos(x+4π/2)+C(4,1)cos(x+3π/2)+C(4,2)cos(x+2π/2)C(4,3)cos(x+π/2)+C(4,4)cosx]=e^x*(cosx+4sinx-6cosx-4sinx+cosx) =-4e^x*cosx