Wiki User
β 6y agoIt is 4.
Wiki User
β 6y agoAnything you like - it depends on the function that relates the output to the input.
The output is tripled.
You how to remember input and output is like a machine do the rest.
It is a bijective function.
A function is a rule which assigns exactly one output f(x) to every input x.
Anything you like - it depends on the function that relates the output to the input.
The rule of a function in math is what relates the input value to the output value. For example, if f(x) = x2, the "function rule" is to square the input value to get the output value.
The value that results from the substitution of a given input into an expression or function is the output. The value substituted into an expression or function is an input.
Anything you like - it depends on the function that relates the output to the input.
Suppose a function takes values of a variable, X, as its input, and that it converts it into an output value Y.Then the graph of the function, in the X-Y coordinate plane, is the set of all points (x, y) such that when you input the value x into the function, the output is y.Suppose a function takes values of a variable, X, as its input, and that it converts it into an output value Y.Then the graph of the function, in the X-Y coordinate plane, is the set of all points (x, y) such that when you input the value x into the function, the output is y.Suppose a function takes values of a variable, X, as its input, and that it converts it into an output value Y.Then the graph of the function, in the X-Y coordinate plane, is the set of all points (x, y) such that when you input the value x into the function, the output is y.Suppose a function takes values of a variable, X, as its input, and that it converts it into an output value Y.Then the graph of the function, in the X-Y coordinate plane, is the set of all points (x, y) such that when you input the value x into the function, the output is y.
The output is tripled.
You how to remember input and output is like a machine do the rest.
No, not every relation is a function. In order for a relation to be a function, each input value must map to exactly one output value. If any input value maps to multiple output values, the relation is not a function.
A constant function is a function that always yields the same output value, regardless of the input. In other words, the function's output is a fixed value and does not depend on the input variable. Graphically, a constant function appears as a horizontal line.
The output is multiplied by 5.
The output is multiplied by 5.
The output is multiplied by 3.