Séries de Taylor-McLaurin para a função e^x em torno de zero
As séries de Taylor-McLaurin determinam um polinômio que apresenta
comportamento igual ao da função em algum ponto, em algum intervalo ou em todos
os reais.
![](data:image/png;base64,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)
O cursor aumenta o número de derivadas e consequentemente aumenta a sobreposição do polinômio sobre a função. Neste caso converge para todos reais.