x = 2 and y =-3 so the lines intersect at (2, -3)
This is a linear algebra question and it is incomplete since there are no equation which have to be solved.
The solution to a system on linear equations in nunknown variables are ordered n-tuples such that their values satisfy each of the equations in the system. There need not be a solution or there can be more than one solutions.
It probably means that one of the equations is a linear combination of the others/ To that extent, the system of equations is over-specified.
It's pretty much always the point of a line because the soulution of the system is always an ordered pair where the two or more lines intersect
A. One Nonzero Solution B. Infinitely Many Solutions C. No Solution D. Soultion of 0 Please help!! Which one is it?? I need this answer quickly!
x = 3 and y = 4 so the lines intersect at (3, 4)
7
That would depend on the given system of linear equations which have not been given in the question
This is a linear algebra question and it is incomplete since there are no equation which have to be solved.
Ordered Pair * * * * * An ordered SET. There can be only one, or even an infinite number of variables in a linear system.
The system is simultaneous linear equations
When there is an ordered pair that satisfies both inequalities.
As there is no system of equations shown, there are zero solutions.
The linear system is a math model of a system that is based on the use of a linear operator. The linear system and functional approximation to solve the equation Ax equals b for x by calculating an LU decomposition of A back solving where A equals 2 1 1 and b equals 2 11 cannot be solved, because it is missing more information.
The solution to a system on linear equations in nunknown variables are ordered n-tuples such that their values satisfy each of the equations in the system. There need not be a solution or there can be more than one solutions.
y=3x
A consistent system.