identify the property and equation that satisfies the following statement: the solution of an equation is x=-2.
included would be the solution...
It is a trial solution, as mentioned in the question!
Since there is no equation given, there can be no answer to the question.
No, an equation with integer coefficients does not always have an integer solution. For example, the equation (x + 1 = 2) has an integer solution, (x = 1), but the equation (2x + 3 = 1) has no integer solution since (x = -1) is not an integer. Solutions depend on the specific equation and its constraints, and rational or real solutions may exist instead.
not always but most of the time yes
Does a multi-step equation sometimes, always, or never have a solution?
On the list that accompanies the question, there is no equation with that solution.
an equation ---------- has a soultion? a)always B)sometimes C)never
included would be the solution...
It is an equation in a single variable, x.And, although the question does not ask, the solution is x = 5.It is an equation in a single variable, x.And, although the question does not ask, the solution is x = 5.It is an equation in a single variable, x.And, although the question does not ask, the solution is x = 5.It is an equation in a single variable, x.And, although the question does not ask, the solution is x = 5.
It is a trial solution, as mentioned in the question!
If this question is asking: is the point (6,9) a solution of the equation y = 12x + 6, then NO, it's not a solution.
A solution to an question makes the equation true. For example a solution to the equation 3x = x + 6 is x = 3, since 3(3) = 3+6.
Since there is no equation given, there can be no answer to the question.
No, an equation with integer coefficients does not always have an integer solution. For example, the equation (x + 1 = 2) has an integer solution, (x = 1), but the equation (2x + 3 = 1) has no integer solution since (x = -1) is not an integer. Solutions depend on the specific equation and its constraints, and rational or real solutions may exist instead.
not always but most of the time yes
plug your answer it to the original question