In NORMAL arithmetic, x equals 0
A domain is the x value or values of a set of points of a graph. do not repeat them. It should be written in the following fashion... d={enter x values here with commas between each} The concept of the domain of a function applies not just in algebra, but most areas of mathematics.
The answer depends on the values of x and y. The answer depends on the values of x and y. The answer depends on the values of x and y. The answer depends on the values of x and y.
To arrive at the coordinates for the function (y = x^3), you can choose various values for (x) and calculate the corresponding (y) values by cubing each (x). For example, if (x = -2), then (y = (-2)^3 = -8); if (x = 0), then (y = 0^3 = 0); and if (x = 2), then (y = 2^3 = 8). Plotting these pairs ((-2, -8)), ((0, 0)), and ((2, 8)) will give you points on the graph of the cubic function. You can repeat this process with more (x) values to get a more comprehensive set of coordinates.
Trigonometric functions are periodic - they repeat after a period of pi, or 2 x pi.Trigonometric functions are periodic - they repeat after a period of pi, or 2 x pi.Trigonometric functions are periodic - they repeat after a period of pi, or 2 x pi.Trigonometric functions are periodic - they repeat after a period of pi, or 2 x pi.
Suppose you have a function f, of a variable X. You select a value for X, say x. Calculate the value of f(x) that is, the value of the function when X takes that value x. Then, instead of writing the result in a table, mark the point [x, f(x)] on the coordinate plane. Repeat with other values for X and join up the points.
Yep. No values of X will ever repeat themselves.
Yes, none of the X values repeat, therefore it is a function. X=0 is not a function though.
No. If an x-value is repeated but both values have the same image, you can still have a valid function. x values not repeating is not sufficient if there is no image. For example, consider 1/x and the domain as the integers -3, -2, -1, 0, 1, 2, 3. None of the x values repeats but there is no functional relationship because 1/x is not even defined for x = 0.
Replace a value for x, then solve for y, to find the corresponding value for y. Repeat for other values of x.
Suppose the equation is y = f(x) where f(x) is a function of x.On a coordinate grid, let the horizontal axis represent the x values and the vertical axis represent the y values. Select a set of value for x and calculate the corresponding values of y using the equation. Mark the point (x, y) on the graph. Repeat for other values of x. Join these points with a smooth curve to give you the required line.
The range in a function is the y values, and yes it can repeat
a vertical line is not a function because the x-values repeat!
A domain is the x value or values of a set of points of a graph. do not repeat them. It should be written in the following fashion... d={enter x values here with commas between each} The concept of the domain of a function applies not just in algebra, but most areas of mathematics.
A domain is the x value or values of a set of points of a graph. do not repeat them. It should be written in the following fashion... d={enter x values here with commas between each} The concept of the domain of a function applies not just in algebra, but most areas of mathematics.
In the context of databases, domain values can repeat depending on the specific constraints of the database schema. For example, in a relational database, a column that allows duplicate values (like a "city" column) can have repeated domain values, while a primary key column must have unique values. Therefore, whether domain values can repeat depends on how the data is structured and the rules set for that particular dataset.
The answer depends on the values of x and y. The answer depends on the values of x and y. The answer depends on the values of x and y. The answer depends on the values of x and y.
To arrive at the coordinates for the function (y = x^3), you can choose various values for (x) and calculate the corresponding (y) values by cubing each (x). For example, if (x = -2), then (y = (-2)^3 = -8); if (x = 0), then (y = 0^3 = 0); and if (x = 2), then (y = 2^3 = 8). Plotting these pairs ((-2, -8)), ((0, 0)), and ((2, 8)) will give you points on the graph of the cubic function. You can repeat this process with more (x) values to get a more comprehensive set of coordinates.