x=1, y=3 . . . √
x= -1, y= -3 . . . √
x=1, y=-3 . . .
x=-1, y=3 . . .
A system of linear equations can only have: no solution, one solution, or infinitely many solutions.
Yes.
Two dependent linear equations are effectively the same equation - with their coefficients scaled up or down.
In simple terms all that it means that there are more solutions than you can count!If the equations are all linear, some possibilities are given below (some are equivalent statements):there are fewer equations than variablesthe matrix of coefficients is singularthe matrix of coefficients cannot be invertedone of the equations is a linear combination of the others
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.
Linear equations with one, zero, or infinite solutions. Fill in the blanks to form a linear equation with infinitely many solutions.
They are called simultaneous equations.
A system of linear equations can only have: no solution, one solution, or infinitely many solutions.
False. There can either be zero, one, or infinite solutions to a system of two linear equations.
As there is no system of equations shown, there are zero solutions.
It means that there is no set of values for the variables such that all the linear equations are simultaneously true.
A system of equations may have any amount of solutions. If the equations are linear, the system will have either no solution, one solution, or an infinite number of solutions. If the equations are linear AND there are as many equations as variables, AND they are independent, the system will have exactly one solution.
Because, if plotted on a Cartesian plane, all solutions to the equation would lie on a straight line.
They are a set of equations in two unknowns such that any term containing can contain at most one of the unknowns to the power 1. A system of linear equations can have no solutions, one solution or an infinite number of solutions.
Yes.
A.infinitely manyB.oneD.zero
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