By using the distance, speed, and acceleration, to show on the graph the constant speed of each car
If the graph is a non-vertical straight line, then the rate of change is constant. If the line is curved, then the rate of change (slope) varies.
as a horizontal straight line
yes
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 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.
The answer is : (B) A constant rate of acceleration. :)
By using the distance, speed, and acceleration, to show on the graph the constant speed of each car
If the graph is a non-vertical straight line, then the rate of change is constant. If the line is curved, then the rate of change (slope) varies.
On a V-t graph, constant speed is shown as a horizontal line.
When something has a constant rate of change it means that it has a linear graph. The function can be written in the slope intercept form of y = mx + b.
If the constant acceleration is positive, the graph would be an exponential (x2) graph. If there is constant acceleration, then velocity is always increasing, making the position change at an ever increasing rate.
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.
because the number of protons increase constant across the period
If the line formed by the graph is straight, the speed is constant. A horizontal line would show the object as stationary.
A line graph.
as a horizontal straight line