테일러_다항식,Taylor_polynomial (rev. 1.9)
차동우 물리1 벡터 (3) 강의 중에서.
$\displaystyle f(t+dt)$
$\displaystyle df=f(x+dx,\,y+dy)-f(x,\,y)$
테일러_다항식,Taylor_polynomial
$\displaystyle =f(t)$
$\displaystyle +\left[\frac{df}{dt}\right]_{t}dt$
$\displaystyle +\frac1{2!}\left[\frac{d^2f}{dt^2}\right]_{t}(dt)^2$
$\displaystyle +\frac1{3!}\left[\frac{d^3f}{dt^3}\right]_{t}(dt)^3$
$\displaystyle +\cdots$
$\displaystyle f(x,y)$$\displaystyle +\left[\frac{df}{dt}\right]_{t}dt$
$\displaystyle +\frac1{2!}\left[\frac{d^2f}{dt^2}\right]_{t}(dt)^2$
$\displaystyle +\frac1{3!}\left[\frac{d^3f}{dt^3}\right]_{t}(dt)^3$
$\displaystyle +\cdots$
$\displaystyle df=f(x+dx,\,y+dy)-f(x,\,y)$
$\displaystyle =\frac{\partial f}{\partial x}dx+\frac{\partial f}{\partial y}dy$
Linked from 테일러_다항식,Taylor_polynomial
https://ko.wikipedia.org/wiki/다항식
https://simple.wikipedia.org/wiki/Polynomial
https://en.wikipedia.org/wiki/Polynomial
https://simple.wikipedia.org/wiki/Polynomial
https://en.wikipedia.org/wiki/Polynomial
한국어 번역이 -식 인데 항상 식,expression?
Sub/topics
(wk다항식)"최고차항의 계수가 1인 일변수 다항식을 일계수 다항식(또는 모닉 다항식)이라고 한다."
monic polynomial
https://ko.wikipedia.org/wiki/일계수_다항식
https://en.wikipedia.org/wiki/Monic_polynomial
monic polynomial
https://ko.wikipedia.org/wiki/일계수_다항식
https://en.wikipedia.org/wiki/Monic_polynomial
https://ko.wikipedia.org/wiki/다항식의_나머지_정리
Polynomial_remainder_theorem = https://simple.wikipedia.org/wiki/Polynomial_remainder_theorem
https://en.wikipedia.org/wiki/Polynomial_remainder_theorem
polynomial_ring {
Polynomial_ring = https://en.wikipedia.org/wiki/Polynomial_ring }
Polynomial_remainder_theorem = https://simple.wikipedia.org/wiki/Polynomial_remainder_theoremhttps://en.wikipedia.org/wiki/Polynomial_remainder_theorem
polynomial_ring {
Polynomial_ring = https://en.wikipedia.org/wiki/Polynomial_ring }Rel
계수,coefficient
가중합,weighted_sum? =가중합,weighted_sum =,weighted_sum . weighted_sum 가중값,weight(VG) 합,sum
weighted_sum 
가중합 weighted sum 
weighted sum
기저,basis
다항함수 polynomial function polynomial_function - 다항함수,polynomial_function - 다항함수,polynomial_function - vg에는 페이지는 있으나 내용은 아직 안옮김(at 2023-08-16)
계수,coefficient
가중합,weighted_sum? =가중합,weighted_sum =,weighted_sum . weighted_sum 가중값,weight(VG) 합,sum
weighted_sum 가중합 weighted sum weighted sum기저,basis
다항함수 polynomial function polynomial_function - 다항함수,polynomial_function - 다항함수,polynomial_function - vg에는 페이지는 있으나 내용은 아직 안옮김(at 2023-08-16)
}