There are infinitely many ordered pairs. One of these is (0, 0).
I am sorry but the question is incomplete. You have not mentioned the ordered pairs and the equation is incomplete as well.
There are an infinite number of ordered pairs that satisfy the equation.
1,6 2,12 3,18 4,24 5,30
None. There is no equation or inequality in the question - only an expression. An expression cannot have a solution.
To determine if ordered pairs satisfy an exponential function, you can check if they follow the form (y = ab^x), where (a) is a constant, (b) is the base (a positive number), and (x) is the independent variable. For each pair ((x, y)), calculate (b) by rearranging the equation as (b = \frac{y}{a}) for a given (x) and (y). If the ratio of (y) values corresponding to successive (x) values remains constant, the pairs likely satisfy an exponential function. Additionally, plotting the points should show a characteristic exponential curve.
3x
I am sorry but the question is incomplete. You have not mentioned the ordered pairs and the equation is incomplete as well.
There are an infinite number of ordered pairs that satisfy the equation.
1,6 2,12 3,18 4,24 5,30
7
(1, 0.2), (2, 0.1)
The question does not contain an equation nor an inequality. There cannot, therefore be any ordered pairs which can satisfy an expression.
It is the set of infinitely many ordered pairs, (x, y) such that the two satisfy the given equation.
Any pair of numbers at all, as long as one of them is triple the other one.
The question cannot be answered unless a specific equation is cited.
it is 7yx978
That will depend entirely on the equation which has not been given.