Y is the second number in a set of ordered pairs.
They are coordinates that are plotted on the Cartesian plane.
y=3x-5
To find ordered pairs of an equation, you can choose a value for one variable and then solve for the other variable. For example, if you have the equation (y = 2x + 3), you might choose (x = 1), which gives (y = 5). This results in the ordered pair (1, 5). Repeat this process with different values of (x) or (y) to generate more ordered pairs.
To find the domain and range in ordered pairs, first, identify the set of all first elements (x-values) from each ordered pair for the domain. For the range, identify the set of all second elements (y-values) from the same pairs. For example, in the ordered pairs (2, 3), (4, 5), and (2, 6), the domain is {2, 4} and the range is {3, 5, 6}. Make sure to list each element only once in the final sets.
They are the elements from the first set in the original Carestian product. For example, if you make ordered pairs on an x-y plane, then they are the elements of the set X.
A set of ordered pairs that assign to each x-value exactly one y-value is called a function.
They are coordinates that are plotted on the Cartesian plane.
y=3x-5
A set of ordered pairs (x, y) where x and y are real numbers.
They are elements of the infinite set of ordered pairs of the form (x, 0.1x+1). It is an infinite set and I am not stupid enough to try to list its elements!
To find ordered pairs of an equation, you can choose a value for one variable and then solve for the other variable. For example, if you have the equation (y = 2x + 3), you might choose (x = 1), which gives (y = 5). This results in the ordered pair (1, 5). Repeat this process with different values of (x) or (y) to generate more ordered pairs.
The function table will have two columns, one for the x-value and one for the y-value. Form ordered pairs (x,y) by inserting the values from one row of the table.
There are infinitely many ordered pairs. One of these is (0, 0).
They are the elements from the first set in the original Carestian product. For example, if you make ordered pairs on an x-y plane, then they are the elements of the set X.
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It is the set of infinitely many ordered pairs, (x, y) such that the two satisfy the given equation.
(y2-y1)/(x2-x1) y=mx+b