Integral em coordenadas cartesianas

Sendo f uma função integrável e positiva, a soma de integrais triplos iterados $\begin{array}{c}\int_0^1\int_z^1\int_0^1\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dxdydz\\+\int_1^2\int_0^1\int_{2-x}^1\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dzdydx\\+\int_0^1\int_0^{1-y}\int_0^{-y-z+1}\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dxdzdy\\\end{array}$ pode também ser dada, após uma mudança da ordem de integração, por

A)$\fbox{$\begin{array}{c}\int_1^2\int_1^2\int_{3-x}^2\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dzdydx\\+\int_1^2\int_1^{3-x}\int_1^{-x-y+4}\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dzdydx\\+\int_1^2\int_{3-x}^2\int_1^2\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dydzdx\\\end{array}$}$

B)$\fbox{$\begin{array}{c}\int_1^2\int_{3-x}^2\int_1^2\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dydzdx\\+\int_1^2\int_1^{3-z}\int_1^{-y-z+4}\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dxdydz\\+\int_1^2\int_{3-z}^2\int_1^2\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dydxdz\\\end{array}$}$

C)$\fbox{$\begin{array}{c}\int_1^2\int_{3-x}^2\int_1^2\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dydzdx\\+\int_1^2\int_1^{3-x}\int_1^{-x-y+4}\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dzdydx\\+\int_1^2\int_1^y\int_1^2\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dxdzdy\\\end{array}$}$

D)$\fbox{$\begin{array}{c}\int_1^2\int_1^2\int_z^1\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dydzdx\\+\int_1^2\int_1^2\int_{3-x}^2\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dzdxdy\\+\int_1^2\int_1^2\int_1^y\text{f}\left(\begin{array}{c}x\\y\\z\\\end{array}\right)dzdxdy\\\end{array}$}$

E)Nenhuma das anteriores

Para obter o zip que contém as instâncias deste exercício clique aqui(CoordCarte)

Se deseja obter o código fonte que gera os exercícios contacte miguel.dziergwa@ist.utl.pt