learn.howToCalculate

learn.whatIsHeading

A power series represents a function as an infinite sum of terms involving powers of x. They are used to approximate functions like eˣ, sin(x), and cos(x) with polynomials.

Fórmula

General form: Σₙ₌₀^∞ aₙ(x−c)ⁿ = a₀ + a₁(x−c) + a₂(x−c)² + ...

aₙ: coefficient of the nth term
x: variable
c: center of the series
n: term index

Guia passo a passo

1eˣ = 1 + x + x²/2! + x³/3! + ...
2sin(x) = x − x³/3! + x⁵/5! − ...
3cos(x) = 1 − x²/2! + x⁴/4! − ...
4More terms = better approximation

Exemplos resolvidos

Entrada

eˣ at x=1, 5 terms

Resultado

1+1+0.5+0.167+0.042 ≈ 2.708 (actual: 2.718)

Entrada

sin(π/6), 4 terms

Resultado

≈ 0.5 (exact)

Perguntas frequentes

What is the radius of convergence?

The radius R is the distance from center c where the series converges. Use ratio or root test to find R.

What is a Taylor series?

A Taylor series is a power series centered at a point c using derivatives: f(x) = Σ f⁽ⁿ⁾(c)/n! (x−c)ⁿ.

What is a Maclaurin series?

A Taylor series centered at c = 0. Example: eˣ = Σ xⁿ/n!.

Pronto para calcular? Experimente a calculadora Power Series gratuita

Experimente você mesmo →