Funzione trigonometrica inversa: differenze tra le versioni

| [[arcoseno]] || <math>y = \arcsin(x)</math> || <math>x = \sin(y)</math>||<math> \left[−1-1; +1\right] </math>|| −π/<math>-\frac{\pi}{2}\leq ≤ ''y''\leq ≤ π\frac{\pi}{2}</2math>

| [[arcocoseno]] || <math>y = \arccos(x)</math>|| <math>x = \cos(y)</math>|| <math> \left[−1-1; +1\right] </math> || <math>0 ≤\leq ''y'' ≤\leq π\pi</math>

| [[arcotangente]] || <math>y = \arctan(x)</math>|| <math>x = \tan(y)</math>|| '''<math>\mathbb {R}</math>''' || −π/<math>-\frac{\pi}{2 }< ''y'' < π/\frac{\pi}{2}</math>

| [[arcocosecante]] || <math>y = \arccsc(x)</math>|| <math>x = \operatorname{coseccsc}(y) , y = \arcsin\left(\frac{1/}{x}\right)</math>

| [[arcosecante]] || <math>y = \arcsec(x)</math>|| <math>x = \sec(y) , y = \arccos\left(\frac{1/}{x}\right)</math>

| [[arcocotangente]] || <math>y = \arccot(x)</math>||<math>x = \cot(y) , y = \arctan\left(\frac{1/}{x}\right)</math>|| '''<math>\mathbb {R}</math>'''

| <math> 0 < ''y'' < π\pi </math>

\arccos z = \frac {\pi} {2} - \arcsin z = \frac {\pi} {2} - \left[z + \left( \frac {1} {2} \right) \frac {z^3} {3} + \left( \frac {1 \cdot 3} {2 \cdot 4} \right) \frac {z^5} {5} + \left( \frac{1 \cdot 3 \cdot 5} {2 \cdot 4 \cdot 6 } \right) \frac{z^7} {7} + \cdots \right]= \frac {\pi} {2} - \sum_{n=0}^\infty {2n\choose n} \frac {z^{2n+1}} {4^{n}(2n+1)}

\arcsec z = \arccos\left(\frac{1}{z}\right) = \frac {\pi} {2} - \left[\frac{1}{z} + \left( \frac {1} {2} \right) \frac {1} {3z^{3}} + \left( \frac {1 \cdot 3} {2 \cdot 4} \right) \frac {1} {5z^{5}} + \left( \frac{1 \cdot 3 \cdot 5} {2 \cdot 4 \cdot 6 } \right) \frac{1} {7z^{7}} + \cdots \right]= \frac {\pi} {2} - \sum_{n=0}^\infty {2n\left(choose n} \frac {(2n)!1} {4^{n}(n!2n+1)^2} \right) \frac {z^{-(2n+1)}} {(2n+1)}

\arccot z = \arctan \left(\frac {\pi1} {2x} - \arctan zright) = \frac {\pi} {2} - \left[ z - \frac {z^3} {3} +\frac {z^5} {5} -\frac {z^7} {7} +\cdots \right] = \frac {\pi} {2} - \sum_{n=0}^\infty \frac {(-1)^n z^{2n+1}} {2n+1}

\displaystyle{\rm arctan}\left({x_1 \pm x_2 \over \; 1 \mp x_1 x_2\;}\right) + {\rm segnosgn}\left(x_1\right)\,\pi & \pm x_1x_2>1 \\

{{interprogetto|commons=Category:Inverse trigonometric functions}}