Réponse :
Bonjour et bonne année,
x tend vers 0.
[tex]DL_n(1+x)^\alpha=1+\dfrac{x}{1!} *\alpha*1^{\alpha-1}+\dfrac{x^2}{2!} *\alpha*(\alpha-1)*1^{\alpha-2}+\dfrac{x^3}{3!} *\alpha*(\alpha-1)*(\alpha-2)*1^{\alpha-3}+....\dfrac{x^n}{n!} *\alpha*(\alpha-1)*(\alpha-2)*...*(\alpha-(n-1))*1^{\alpha-n}\\\\=\sum_{i=0}^{n}\ [ \dfrac{x^i}{i!}*((1+x)^\alpha)^{(i)}]+x^n*\epsilon(x)\\[/tex]
(i) signifie dérivée n ème.
Pour n=4, on a :
[tex]DL_n(1+x)^\alpha=\\\\\sum_{i=0}^{4}\ [ \dfrac{x^i}{i!}*((1+x)^\alpha)^{(i)}]+x^4*\epsilon(x)\\\\=1+\dfrac{x}{1!} *\alpha+\dfrac{x^2}{2!} *\alpha*(\alpha-1)+\dfrac{x^3}{3!} *\alpha*(\alpha-1)*(\alpha-2)+...+\dfrac{x^4}{4!} *\alpha*(\alpha-1)*(\alpha-2)*...*(\alpha-(4-1))+x^4\epsilon(x)\\\\=1+\dfrac{x}{1!} *\alpha+\dfrac{x^2}{2!} *\alpha*(\alpha-1)+\dfrac{x^3}{3!} *\alpha*(\alpha-1)*(\alpha-2)+\dfrac{x^4}{4!} *\alpha*(\alpha-1)*(\alpha-2)*(\alpha-3))+x^4\epsilon(x)\\[/tex]
Bien sûr
[tex]\boxed{\alpha-(n-1)=\alpha-n+1}\\[/tex]
