OpenStudy (anonymous):
> > > > > > � How do you solve a system of linear equations by graphing? > > > > > > � How do you determine whether a system of linear equations has no solutions, one solution, or infinitely many solutions? > > > > > > � What are the different types of solutions that you can get when you solve a system of linear equations? > > > > > > � What are the 3 different ways for solving systems of equations and when would you use each one? > > > > > > � How are the algebraic properties used in creating equivalent systems? > > > > > > � How do you solve a system of equations approximate
OpenStudy (masumanwar):
Gauss Jordan elimination method you can try
OpenStudy (anonymous):
For #1?
OpenStudy (anonymous):
@Abhisar
OpenStudy (anonymous):
@Skrilluh
OpenStudy (anonymous):
@VortexAlliby
OpenStudy (anonymous):
Anybody?
OpenStudy (anonymous):
@happyLAN
OpenStudy (anonymous):
Does "�" stand for..?
OpenStudy (anonymous):
Dont look at that, it means the question is worth 1/2 point
OpenStudy (anonymous):
Oh, it's written questions. I really don't feel like doing this tbh. I'm assuming this is linear algebra though, so typically we're working with traditional euclidean space. For the first one, it depends on how many variables there are. Assuming this is euclidean space, there would only be 2 variables on a single manifold. Therefore, the solution of the system would resolve at the intersection of the two variables.
OpenStudy (anonymous):
Thanks for doing it <3 Ill medal and fan you
OpenStudy (anonymous):
These questions are terrible o.O; there are too many variables to consider. What course is this?
OpenStudy (anonymous):
Alg 1 FLVS. I know they are. Thats why I came on here.. LOL. Please could you just work with it? Its not many and my course ends in 3 days.. Kind of behind :E
OpenStudy (anonymous):
Wtf
OpenStudy (anonymous):
?
OpenStudy (anonymous):
This thing just messed up -_- For No.2: If you have 2 variables that represent themselves as the derivative of the parent, the data may never intersect. However, the data may also intersect several times, inducing infinitely many solutions.
OpenStudy (anonymous):
I don't understand what No.3 wants, but when solving for a system of linear equations, you can achieve no solution, one solution, or infinitely many solutions.
OpenStudy (anonymous):
For No.4: You can solve for a system algebraically by using substitution/elimination, or you can using the graphing method.
OpenStudy (anonymous):
No.5 I don't understand what it's asking, but I think it means the conversion to a similar format.
OpenStudy (anonymous):
And the last one I gather is incomplete.
OpenStudy (anonymous):
Wht?
OpenStudy (anonymous):
Thanks for the help I guess :p
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