θ r n f (erg cm -2 s -1 hz -1 ) h (erg cm -2 s -1 hz -1 ) f = 4 (r/d) 2 h

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Page 1: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Page 2: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

f (erg cm-2 s-1 Hz-1) H (erg cm-2 s-1 Hz-1)

f = 4 (R/D)2 H

DA starTeff=25,700 K log g=7.98

Page 6: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Le système des magnitudes

La magnitude apparente «m» (en minuscule)

Page 7: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

La magnitude apparente bolométrique mbol

Bolométrique : flux intégré sur toutes les fréquences

mesure la brillance apparente de l’étoile

Page 8: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

La magnitude absolue bolométrique Mbol

propriété intrinsèque de l’étoile

Le module de distance

Page 9: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

d = p1 avec d en parsec si p est en seconde d’arc

parallaxetrigonométrique ()

Page 10: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

En général on mesure le flux au travers d’une bande passante

Transparence

Page 11: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Exemple : la magnitude V dans le système photométrique Johnson

Vega :

Module de distance

observé calculé

Page 12: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Vega

Page 13: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Indices de couleurs (2 bandes passantes)

Flux d’Eddington

Page 14: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Page 15: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Page 16: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Page 17: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Page 18: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

Température effective

Page 19: θ R n f (erg cm -2 s -1 Hz -1 ) H (erg cm -2 s -1 Hz -1 ) f = 4 (R/D) 2 H

à = 100, T 30,000 K (Teff / T)4 1% d’anisotropie en I

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