1 Answer

Balman Rawat · Answer 1 · 2018-06-24T19:15:02+0000

$f(x)=\arctan x$

$(\mathrm df)/(\mathrm dx)=\frac1{1+x^2}$

$(\mathrm d^2f)/(\mathrm dx^2)=-(2x)/((1+x^2)^2)$

$(\mathrm d^3f)/(\mathrm dx^3)=(6x^2-2)/((1+x^2)^3)$

$(\mathrm d^4f)/(\mathrm dx^4)=(24x-24x^3)/((1+x^2)^4)$

The Taylor polynomial takes the form

P_4(x)=f(0)+(f'(0))/(1!)(x-0)+(f''(0))/(2!)(x-0)^2+(f'''(0))/(3!)(x-0)^3+(f^((4))(0))/(4!)(x-0)^4

P_4(x)=f(0)+(f'(0))/(1!)(x-0)+(f''(0))/(2!)(x-0)^2+(f'''(0))/(3!)(x-0)^3+(f^((4))(0))/(4!)(x-0)^4

$P_4(x)=\frac11x-\frac26x^3=x-\frac13x^3$

Notice that the fourth degree term vanishes, since
f^((4))(0)=0

, so you can stop at the third degree.

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