Sumários
$\int_A f(x)\, dx$ = \int_{\psi(A)}f(\psi^{-1}(y)) |\det J_{\psi^{-1}}(y)|\, dy$
4 abril 2007, 15:30 • Luísa Maria Lopes Ribeiro
$\int_A f(x)\, dx$ = \int_{\psi(A)}f(\psi^{-1}(y)) |\det J_{\psi^{-1}}(y)|\, dy$
$\int_A f(x)\, dx$ = \int_{\psi(A)}f(\psi^{-1}(y)) |\det J_{\psi^{-1}}(y)|\, dy$
3 abril 2007, 15:30 • Luísa Maria Lopes Ribeiro
$\int_A f(x)\, dx$ = \int_{\psi(A)}f(\psi^{-1}(y)) |\det J_{\psi^{-1}}(y)|\, dy$
$\int_A f(x)\, dx$ = \int_{\psi(A)}f(\psi^{-1}(y)) |\det J_{\psi^{-1}}(y)|\, dy$
2 abril 2007, 13:30 • Luísa Maria Lopes Ribeiro
$\int_A f(x)\, dx$ = \int_{\psi(A)}f(\psi^{-1}(y)) |\det J_{\psi^{-1}}(y)|\, dy$
$\sum_{k=1}^{+\infty} a_k$
29 março 2007, 12:30 • Luísa Maria Lopes Ribeiro
$\sum_{k=1}^{+\infty} a_k$
$\sum_{k=1}^{+\infty} a_k$
28 março 2007, 15:30 • Luísa Maria Lopes Ribeiro
$\sum_{k=1}^{+\infty} a_k$