1. 수치 해석
◉ Note
이번 실험에서 Fin은 2차원 형상인 Thin Rectangular Fin이다. 하지만 두께가 넓이에 비하여 매우 얇고 기부의 열원이 평행하게 작용한다고 가정하면 온도의 분포는 1차원으로 생각할 수 있다. 이 때 2차원 Fin을 1차원으로 가정할 수 있는 근거를 FDM을 이용하여 2차원 수치해석으로
1. Subset (부분집합) A , B : sets.
B : a subset of A
: . notation :
2. Equality of sets (집합의 상등) A , B : sets.
A=B
: :
3. Cartesian Product (카테이션 곱) A , B : sets.
AB={(a,b) }
; Cartesian product of A and B
4. Ordered Pairs (순서쌍) A , B : sets.
. (a,b) { {a}, {a,b} }
5. Relation (관계) A , B : sets.
ℜ: a relation from A to B
ℜ
6. Equivale
on. Lets go.
I personally meet with
every new inmate here at the prison.
Usually downstairs.
And I ask them a question.
What do you expect from
your time here at the castle?
Nothing.
Just to do my time and go home.
Perfect.
That is the perfect answer.
And now I have what may seem
under the circumstances,
a bizarre request.
I have a collection of most
of the seminal books on warfare,
including Th
In this project, solutions to second order linear recurrence equations with constant coeffi- cients have been investigated. We have used generating functions to derive the general solution to the homogeneous equation and we show that in general the particular solution is complicated to find. By limiting the right hand side (RHS) in the equation to a polynomial-exponential family of functions we c