Le taux de change est le prix d'une devise dans une autre devise.
![](data:image/jpeg;base64,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)
Exemples :
1 EUR = 1,3345 USD à telle date et tel endroit.
1 USD = 110.95 JPY à telle date et tel endroit.
(EUR = euro, USD = dollar US, JPY = yen selon la codification monétaire internationale, norme ISO 4217 différenciant chaque devise par une abréviation de trois lettres).
Lorsque le taux de change de l'Euro par rapport au Dollar augmente, cela signifie que le dollar se déprécie (car il en faut plus pour faire un euro) et que l'euro "s'apprécie". ![](data:image/jpeg;base64,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)
Les taux de change (et les taux d'intérêts, qui leur sont étroitement liés) agissent bien entendu sur les prix à l'importation et à l'exportation, et sur le sens des flux (Le mot flux (du latin fluxus, écoulement) désigne en général un ensemble d'éléments (informations / données, énergie, matière, ...) évoluant dans un sens commun. Plus précisément le...) de capitaux entre zones économiques.
De ce fait, les pays et zones économiques peuvent être tentés de manipuler les taux de change, sous prétexte souvent d'éviter la spéculation (en fait ces manipulations ont plutôt tendance à l'encourager), dans le but d'influencer :
- la compétitivité de leurs produits et services
- leur attractivité en matière de flux de capitaux.
Pour plus d'infos sur le mécanisme du taux de change, voir le ZOOM sur le sujet en cliquant ICI.
Lien vers un convertisseur de monnaie : http://www.forexticket.fr/fr/conversion/monnaie