The area under an acceleration-time graph is equal to the object's velocity (not change in velocity).
By using the distance, speed, and acceleration, to show on the graph the constant speed of each car
acceleration.
The answer depends on what is plotted on the graph and what is happening with the acceleration then.
The answer depends on the variables in the graph! In a graph of age against mass there is nothing that represents acceleration.
The acceleration of an object.
The area under an acceleration-time graph is equal to the object's velocity (not change in velocity).
By using the distance, speed, and acceleration, to show on the graph the constant speed of each car
The answer depends on what the graph is meant to show. The first step would be to read the axis labels.
acceleration.
Acceleration=change in y graph/change in x graph
The answer depends on what is plotted on the graph and what is happening with the acceleration then.
On a graph of acceleration vs. time, during deceleration the line is below zero. On a graph of speed vs. time, during deceleration the line has a negative slope (sloping downward from left to right).
The answer depends on the variables in the graph! In a graph of age against mass there is nothing that represents acceleration.
If you want the graph to show the acceleration of the ball against time, then the graph is a horizontal line. If you want the graph to show the velocity of the ball against time, then the graph is a straight line sloping downward. If you want the graph to show the height of the ball against time, then the graph is a parabola that opens downward.
A distance vs time squared graph shows shows the relationship between distance and time during an acceleration. An example of an acceleration value would be 3.4 m/s^2. The time is always squared in acceleration therefore the graph can show the rate of which an object is moving
This depends on what the graph represents. If it is a graph of velocity on the vertical and time on the horizontal, then if acceleration is at a constant rate, the graph will be a straight line with positive slope (pointing 'up'). If acceleration stops, then the graph will be a horizontal line (zero acceleration or deceleration). If it is deceleration (negative acceleration), then the graph will have negative slope (pointing down).