![]() Chris Andersen (Métis) is the dean of the Faculty of Native Studies at the University of Alberta. Her work has appeared in Studies in American Indian Literature (SAIL), American Indian Quarterly (AIQ), Decolonization: Indigeneity, Education & Society (DIES), MediaTropes, TOPIA, PUBLIC - ART, CULTURE, IDEAS, along with a number of edited collections. She is co-editor, with Robert Alexander Innes, of Indigenous Celebrity: Indigenous Entanglements with Fame. Jennifer Adese (otipemisiwak/Métis) is an associate professor in the Department of Sociology at the University of Toronto Mississauga. It is a timely collection that convincingly demonstrates how racialized interpretative frameworks diminish the Métis people and are incompatible with the task of understanding Métis peoplehood and nationhood. A People and a Nation confronts such problematic characterizations head on, training a critical gaze on conventional historiographical positionings of the Métis people as a primitive intermediate force that opened up the Canadian West.Ī People and a Nation dismantles the impoverished notions that continue to shape political, legal, and social understandings of Métis existence. The chapters within are themselves also a reorientation given that the field of Métis Studies has been afflicted by a longstanding tendency to situate Métis within deeply racialized contexts, and/or by an overwhelming focus on the nineteenth century. Multidisciplinary chapters on identity, politics, literature, history, spirituality, religion, and kinship networks orient the conversation toward Métis experiences today. There are no points common to both lines hence, there is no solution to the system.In A People and a Nation, the authors, most of whom are themselves Métis, offer readers a set of lenses through which to consider the complexity of historical and contemporary Métis nationhood and peoplehood. The lines have the same slope and different y-intercepts. Thus, there are an infinite number of solutions.Īnother type of system of linear equations is an inconsistent system, which is one in which the equations represent two parallel lines. Every point on the line represents a coordinate pair that satisfies the system. In other words, the lines coincide so the equations represent the same line. A consistent system is considered to be a dependent system if the equations have the same slope and the same y-intercepts. The two lines have different slopes and intersect at one point in the plane. A consistent system is considered to be an independent system if it has a single solution, such as the example we just explored. A consistent system of equations has at least one solution. In addition to considering the number of equations and variables, we can categorize systems of linear equations by the number of solutions. For example, consider the following system of linear equations in two variables. In this section, we will look at systems of linear equations in two variables, which consist of two equations that contain two different variables. Even so, this does not guarantee a unique solution. In order for a linear system to have a unique solution, there must be at least as many equations as there are variables. ![]() Some linear systems may not have a solution and others may have an infinite number of solutions. ![]() To find the unique solution to a system of linear equations, we must find a numerical value for each variable in the system that will satisfy all equations in the system at the same time. A system of linear equations consists of two or more linear equations made up of two or more variables such that all equations in the system are considered simultaneously. In order to investigate situations such as that of the skateboard manufacturer, we need to recognize that we are dealing with more than one variable and likely more than one equation.
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |