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Résumé des formules trigonométrique
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PCSI 2 Formulaire de trigonométrie
tan(x) =
sin(x)
cos(x)
définie si x =
π
2
(π) cotan(x) =
tan(x)
cos(x)
sin(x)
définie si x = 0 (π)
cos^2 (x) + sin
2 (x) = 1 1 + tan^2 (x) =
cos^2 (x)
si x =
π
2
(π) 1 + cotan 2 (x) =
sin
2 (x)
si x = 0 (π)
cos(−a) = cos(a) sin(−a) = − sin(a) tan(−a) = − tan(a) cotan(−a) = − cotan(a)
cos (π − x) = − cos(x) cos
π
2
− x
= sin(x) cos (π + x) = − cos(x) cos
x +
π
2
= − sin(x)
sin (π − x) = sin (x) sin
π
2
− x
= cos(x) sin (π + x) = − sin (x) sin
x +
π
2
= cos(x)
tan (π − x) = − tan (x) tan
π
2
− x
= cotan(x) tan (π + x) = tan (x) tan
x +
π
2
= − cotan(x)
Valeurs remarquables :
0
π 6
π 4
π 3
π 2
2 π 3 π
cos 1
√ 3 2
√ 2 2
1 2
2
sin 0
1 2
√ 2 2
√ 3 2 1
√ 3 2 0
tan 0
√ 3 3 1
Formules d’addition
cos(a + b) = cos(a) cos(b) − sin(a) sin(b) cos(a − b) = cos(a) cos(b) + sin(a) sin(b)
sin(a + b) = sin(a) cos(b) + cos(a) sin(b) sin(a − b) = sin(a) cos(b) − cos(a) sin(b)
tan(a + b) =
tan(a) + tan(b)
1 − tan(a) tan(b)
tan(a − b) =
tan(a) − tan(b)
1 + tan(a) tan(b)
En particulier on a les relations suivantes avec l’angle double :
cos(2a) = cos^2 (a) − sin
2 (a) = 2 cos^2 (a) − 1 = 1 − 2 sin
2 (a)
sin(2a) = 2 sin(a) cos(a)
tan(2a) =
2 tan(a)
1 − tan^2 (a)
cos
2 (a) =
1 + cos(2a)
2
sin
2 (a) =
1 − cos(2a)
2
On dispose également de relations avec la tangente de l’angle moitié.
Si a = π (2π), on pose t = tan
a
2
alors cos(a) =
1 − t^2
1 + t^2
sin(a) =
2 t
1 + t^2
tan(a) =
2 t
1 − t^2
PCSI 2 Formulaire de trigonométrie
Formules de linéarisation :
sin(a) cos(b) =
[sin(a + b) + sin(a − b)]
cos(a) cos(b) =
[cos(a + b) + cos(a − b)]
sin(a) sin(b) = −
[cos(a + b) − cos(a − b)]
sin(p) + sin(q) = 2 sin
p + q
2
cos
p − q
2
sin(p) − sin(q) = 2 cos
p + q
2
sin
p − q
2
cos(p) + cos(q) = 2 cos
p + q
2
cos
p − q
2
cos(p) − cos(q) = −2 sin
p + q
2
sin
p − q
2
Retenir " si co co si co co − 2 si si "
Equations trigonométriques
cos(a) = cos(b) ⇔
a = b (2π)
a = −b (2π)
sin(a) = sin(b) ⇔
a = b (2π)
a = π − b (2π)
tan(a) = tan(b) ⇔ a = b (π)
Lien avec l’exponentielle complexe
eix^ = cos(x) + i sin(x)
cos(x) = Re(e
ix ) =
(e
ix
−ix ) sin(x) = Im(e
ix ) =
2 i
(e
ix − e
−ix )
eia^ + eib^ = 2 cos
a − b
2
e
i(a+ 2 b) 1 + eia^ = 2 cos
a
2
e
i(a 2 )
eia^ − eib^ = 2i sin
a − b
2
e
i(a+ 2 b) 1 − eia^ = − 2 i sin
a
2
e
i(a 2 )