HallsofIvy said:.
What happens if you try a solution of the form y= xr for some real number r?
A homogeneous linear equation is an algebraic equation in which all terms have the same degree and the constant term is equal to zero. In other words, it is an equation in which the variables are all on one side and the constants are on the other.
To solve a homogeneous linear equation for x>0, you can use the method of substitution or the method of elimination. In the method of substitution, you substitute one variable with a known value and solve for the other variable. In the method of elimination, you eliminate one variable by adding or subtracting equations, and then solve for the remaining variable.
Yes, a homogeneous linear equation can have multiple solutions, depending on the number of variables and the number of equations. For example, if there are two variables and two equations, there can be either one solution or an infinite number of solutions.
Solving a homogeneous linear equation for x>0 is important in many fields of science and engineering, as it allows us to find solutions to systems of equations and model real-world situations. It is also a fundamental concept in linear algebra and is used in many advanced mathematical concepts.
Yes, there are special cases when solving a homogeneous linear equation for x>0. One such case is when all the variables in the equation are equal to zero, in which case the equation has an infinite number of solutions. Another case is when the equation has no solutions, which can happen when there is a contradiction or inconsistency in the equations.