2014-11-18
Des inégalités provinciales au Canada
Un nouveau rapport de Revenu Canada sur les personnes qui correspondent au 1% supérieur des revenus au Canada. En exploitant les tableaux CANSIM 204-0001, CANSIM 204-0002 et CANSIM 111-0008, on peut obtenir quelques résultats qui n'apparaissent pas clairement dans le rapport ou dans les comptes rendus journalistiques qu'on en a tirés aujourd'hui. Ainsi, on peut construire pour l'année 2012 (la dernière pour laquelle il existe des données) le pourcentage de déclarants dont le revenu s'inscrit dans le 1% supérieur par rapport à la population totale d'une province. On peut ensuite comparer ce résultat au revenu total médian par habitant dans chaque province. Si on classe les provinces dans l'ordre de ces revenus, on a le tableau suivant :
![](data:image/png;base64,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)
Sans surprise, l'Alberta arrive en tête pour le revenu total médian. Comme le seuil du 1% des revenus est un époustouflant 300 000 $, on peut en conclure que 49% de la population gagne entre 39 190 $ et 300 000 $, ce qui témoigne de l'abondance de revenus élevés dans cette province. Le Québec, lui, se situe au 6e rang, à 1610 $ du dernier rang occupé par le Nouveau-Brunswick. Comme le seuil du 1% des revenus au Québec est seulement de 180 500 $, on peut en conclure que beaucoup de médecins et de hauts fonctionnaires, comme André Boisclair ou Marie Claire Ouellet, sans parler du premier ministre, appartiennent d'emblée ou sont tout près d'appartenir au 1%.
En revanche, si on ordonne le même tableau en fonction de la fraction de la population qui appartient au 1%, on obtient en quelque sorte une inversion :
En principe, il serait normal qu'un centième de la population gagne le centième le plus élevé des revenus. Toutefois, il apparaît de ce tableau que le nombre de personnes déclarant des revenus se classant dans le 1% supérieur varie de 0,73% en Alberta ou en Saskatchewan à 0,79% à Terre-Neuve ou au Nouveau-Brunswick. A priori, il faut sans doute l'attribuer à un nombre plus grand de personnes qui ne déclarent aucun revenu en Alberta et en Saskatchewan, bref, d'enfants. Ainsi, ce serait le vieillissement des provinces de l'Atlantique et du Québec qui expliquerait cette variation.
Pour l'ensemble du Canada, le seuil du 1% est de 215 700 $. Si on applique le seuil canadien aux provinces, la répartition du nombre de membres du 1% va évidemment changer. Par exemple, au Québec, on passe de 63 035 membres du 1% provincial à 43 360 membres du 1% canadien. En contrepartie, le nombre de membres du 1% canadien est plus grand en Alberta.
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)
Du coup, c'est par rapport au premier tableau ci-dessus que ce dernier devient intéressant. Ainsi, le Québec est sixième au Canada pour le revenu total médian par habitant mais cinquième pour le nombre de membres du 1% canadien par rapport à sa population. Le Québec est-il donc une société aussi égalitaire qu'on aime parfois à le dire ? Exception faite de l'Île-du-Prince-Édouard pour laquelle les statistiques semblent faire défaut, les autres provinces pourraient aussi se poser des questions sur l'inégalité des revenus dans chacune. Si une province comme la Saskatchewan est relativement plus riche que les autres, par exemple, elle compte relativement peu de très hauts revenus, à peine plus que le Québec, en fait. Comme quoi il subsiste parfois des différences à l'intérieur même des grandes régions canadiennes (Ouest, Centre et Est) que certains discours tendent parfois à gommer.
Sans surprise, l'Alberta arrive en tête pour le revenu total médian. Comme le seuil du 1% des revenus est un époustouflant 300 000 $, on peut en conclure que 49% de la population gagne entre 39 190 $ et 300 000 $, ce qui témoigne de l'abondance de revenus élevés dans cette province. Le Québec, lui, se situe au 6e rang, à 1610 $ du dernier rang occupé par le Nouveau-Brunswick. Comme le seuil du 1% des revenus au Québec est seulement de 180 500 $, on peut en conclure que beaucoup de médecins et de hauts fonctionnaires, comme André Boisclair ou Marie Claire Ouellet, sans parler du premier ministre, appartiennent d'emblée ou sont tout près d'appartenir au 1%.
En revanche, si on ordonne le même tableau en fonction de la fraction de la population qui appartient au 1%, on obtient en quelque sorte une inversion :
En principe, il serait normal qu'un centième de la population gagne le centième le plus élevé des revenus. Toutefois, il apparaît de ce tableau que le nombre de personnes déclarant des revenus se classant dans le 1% supérieur varie de 0,73% en Alberta ou en Saskatchewan à 0,79% à Terre-Neuve ou au Nouveau-Brunswick. A priori, il faut sans doute l'attribuer à un nombre plus grand de personnes qui ne déclarent aucun revenu en Alberta et en Saskatchewan, bref, d'enfants. Ainsi, ce serait le vieillissement des provinces de l'Atlantique et du Québec qui expliquerait cette variation.
Pour l'ensemble du Canada, le seuil du 1% est de 215 700 $. Si on applique le seuil canadien aux provinces, la répartition du nombre de membres du 1% va évidemment changer. Par exemple, au Québec, on passe de 63 035 membres du 1% provincial à 43 360 membres du 1% canadien. En contrepartie, le nombre de membres du 1% canadien est plus grand en Alberta.
Du coup, c'est par rapport au premier tableau ci-dessus que ce dernier devient intéressant. Ainsi, le Québec est sixième au Canada pour le revenu total médian par habitant mais cinquième pour le nombre de membres du 1% canadien par rapport à sa population. Le Québec est-il donc une société aussi égalitaire qu'on aime parfois à le dire ? Exception faite de l'Île-du-Prince-Édouard pour laquelle les statistiques semblent faire défaut, les autres provinces pourraient aussi se poser des questions sur l'inégalité des revenus dans chacune. Si une province comme la Saskatchewan est relativement plus riche que les autres, par exemple, elle compte relativement peu de très hauts revenus, à peine plus que le Québec, en fait. Comme quoi il subsiste parfois des différences à l'intérieur même des grandes régions canadiennes (Ouest, Centre et Est) que certains discours tendent parfois à gommer.
Libellés : Canada, Économie, Statistiques