The slope is a basic idea in understanding the behavior of a function. It measures the magnitude and direction in which a function is changing.
In the case of a linear function, the slope is the same at every point along the line graphing the function. A linear function has a constant slope. If the slope is positive, the line rises from left to right. If the slope of the line is negative, the line falls from left to right. If the slope is zero, the line is parallel to the horizontal axis. If two lines have the same slope, they are parallel and will not intersect. If two lines have different slopes, they will intersect. If two lines both have positive slopes, the one with the slope of greater magnitude is rising at a steeper angle to the horizontal axis than the other. If two lines both have negative slopes, the one with the slope of greater magnitude is falling at a steeper angle to the horizontal axis than the other.
In fact, all that is necessary to determine everything there is to know about a linear function is the slope and the co-ordinates of just one point along the line graphing the function. A common form for describing a linear function is
\(\displaystyle y = a + bx.\) The coefficient of x (which I have indicated as b) is the slope. The known point is (0, a), called the y-intercept.
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