The graph of a linear function is a line with a constant slope. The graph of an exponential function is a curve with a non-constant slope. The slope of a given curve at a specified point is the derivative evaluated at that point.
The graph is a straight line. Its slope is the speed.
The slope of the speed/time graph is the magnitude of acceleration. (It's very difficult to draw a graph of velocity, unless the direction is constant.)
The slope (technically, the slope of the tangent at each point) of a distance-time graph gives the instantaneous velocity. Therefore, if the graph has a constant slope - i.e. it is a straight line - then that indicates a constant velocity (zero acceleration).
No - a line graph may peak and trough depending on the data marked on the graph - a bit 'like join the dots'.
The motion at constant speed.
Motion at constant speed.
The Slope (which represents acceleration) of a constant velocity graph is Zero.
The slope of each point on the line on the graph is the rate of change at that point. If the graph is a straight line, then its slope is constant. If the graph is a curved line, then its slope changes.
It means the velocity is constant.
A line. The derivative of a function is its slope. If the slope is a constant then the graph is a line.
find the constant of variation and the slope of the given line from the graph of y=2.5x
It means that the velocity is constant, or not changing.
The graph of a linear function is a line with a constant slope. The graph of an exponential function is a curve with a non-constant slope. The slope of a given curve at a specified point is the derivative evaluated at that point.
The highest point on a graph is when the derivative of the graph equals 0 or the slope is constant.
acceleration is the slope of the v t graph... so the acceleration is constant and negative. In other words, the object is slowing down at a constant rate.
The graph is a straight line. Its slope is the speed.