Math Essays: 2023-06-04

Tuesday, June 6, 2023

Integration by Parts and Polynomial Identities (sum and difference of the n-th powers of x and y)

$\int u v^{(n+1)}dx=\int ud v^{(n)}=u v^{(n)}-\int u' v^{(n)}dx\\$

$\int u'v^{(n)}dx=\int u'd v^{(n-1)}=u' v^{(n-1)}-\int u'' v^{(n-1)}dx\\$

$\int u v^{n+1}dx=uv^{(n)}-u' v^{(n-1)}+u'' v^{(n-2)}+...+(-1)^nu^{(n)}v+(-1)^{n+1}\int u^{(n+1)}vdx\\$

$\int u v^{n+1}dx++(-1)^{n}\int u^{(n+1)}vdx=uv^{(n)}-u' v^{(n-1)}+u'' v^{(n-2)}+...+(-1)^nu^{(n)}v\\$

Derivative both sides, we have

$u v^{(n+1)}+(-1)^{n} u^{(n+1)} v=\frac{d}{dx}(uv^{(n)}-u' v^{(n-1)}+u'' v^{(n-2)}+...+u^{(n)}v)\\$

$\frac{d}{dx}(uv)=(\partial_u+\partial_v)(uv)\\$

And Consider the differential operator two sides,

$\partial_v^{(n+1)}+(-1)^n\partial_ u^{(n+1)}=(\partial_v+\partial_u)(\partial_v^{(n)}-\partial_u\partial_v^{(n-1)}+\partial_u^{(2)}\partial_v^{(n-2)}+...+(-1)^n\partial_u^{(n)})$

$x^{n+1}+(-1)^n y^{n+1}=(x+y)(x^n-x^{n-1}y+...+(-1)^{n-1}(xy^{n-1})+(-1)^n y^n)\\$

$n=1$ $x^2-y^2=(x+y)(x-y)$

$n=2$ $x^3+y^3=(x+y)(x^2-xy+y^2)$

$y:=-y$ $x^{n+1}-y^{n+1}=(x-y)(x^n+x^{n-1} y+x^{n-2} y^2+...+y^n)$

$x^{n+1}-y^{n+1}=(x-y)(x^n+x^{n-1} y+x^{n-2} y^2+...+y^n)$ $n\in\mathbb N$

$x^{n+1}+y^{n+1}=(x+y)(x^n-x^{n-1}y+...+(-1)^{n-1}(xy^{n-1})+ y^n)$ $n\in 2\mathbb N$

It shows an interesting way to derivate the identity

Marco

Hello, everyone! My name is Marco, and as a passionate mathematics student, I have built this blog to share some interesting ideas that come to my mind,and notes for some books I read. I'm excited to connect with others to share my love for this subject, and I hope my posts will inspire and entertain you. Thank you for visiting, and I look forward to your feedback and comments!

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