A linear function is a function, or equation, that when graphed, will form a straight line.
A linear function when graphed takes the form of a straight line.
A linear function.
A linear equation with an undefined slope is an equation where, when graphed, forms a vertical line. For example: when given 2 points: (2, 4) (2,7) ~ The x-values are the same, while the y-values differ, which would create a vertical line when the points are graphed
Points
It is a continuous function. If the line is a straight line, it is a linear function.
Any function of the form f(x) = ax + b, or any relation of the form Ax + By = C.This is the function that forms a line graphed. The slope of line can be taken out as C/A. * * * * * The above answer assumes that a line MUST be a straight line! Since the graph is a line, the domain must be an interval in the Real numbers. The interval may be finite, or infinite in one or both directions. In order that the graph does not have breaks in it the function must be continuous. Any such function will do.
y=mx+b
A linear function is a function, or equation, that when graphed, will form a straight line.
A linear function when graphed takes the form of a straight line.
A relation is an expression that is not a function. A function is defined as only having one domain per range, meaning that when graphed, a function will have no two points on the same vertical line. If your expression is graphed and two points do appear on the same vertical line, it is a relation, not a function.
y = -8 is a function because when graphed, it passes the vertical line test.
The part of the straight line that crosses y axis
As shown, the function has neither range nor domain.
A differentiable function, possibly - to distinguish it from one whose graph is a kinked curve.
Answer t What is the slope of the line graphed below?his question…
A linear or non linear function is a function that either creates a straight line or a crooked line when graphed. These functions are usually represented on a table under the headings x and y.