Velocity slope refers to the rate at which velocity changes over time. A positive velocity slope indicates an increase in velocity, while a negative velocity slope indicates a decrease in velocity. The steeper the slope, the greater the rate of change in velocity.
There is no such thing as a "slope under the curve", so I assume that you mean "slope of the curve". If the curve is d vs. t, where d is displacement and t is time, then the slope at any given point will yield (reveal) the velocity, since velocity is defined as the rate of change of distance with respect to time. Mathematically speaking, velocity is the first derivative of position with respect to time. The second derivative - change in velocity with respect to time - is acceleration.
Yes, a steep slope on a displacement vs time graph indicates a large velocity. The slope of a displacement vs time graph represents the velocity of an object because velocity is the rate of change of displacement with respect to time. A steep slope implies that the displacement is changing rapidly over time, resulting in a large velocity.
To determine velocity from a position-time graph, you can find the slope of the graph at a specific point. The slope represents the rate of change of position, which is the velocity at that point. A steeper slope indicates a higher velocity, while a flatter slope indicates a lower velocity.
constant slope. really anything will work as long as it stays the same. so if your line is straight then you have a constant velocity. :)
False. It means it is slowing Down!
Acceleration , which is change of velocity over time.
Velocity is the slope of the position vs. time curve.
There is no such thing as a "slope under the curve", so I assume that you mean "slope of the curve". If the curve is d vs. t, where d is displacement and t is time, then the slope at any given point will yield (reveal) the velocity, since velocity is defined as the rate of change of distance with respect to time. Mathematically speaking, velocity is the first derivative of position with respect to time. The second derivative - change in velocity with respect to time - is acceleration.
That slope is the 'speed' of the motion. If the slope is changing, then the speed is changing. That's 'accelerated' motion. (It doesn't matter whether the speed is growing or shrinking. It's still 'accelerated' motion. 'Acceleration' does NOT mean 'speeding up'.)
Yes, a steep slope on a displacement vs time graph indicates a large velocity. The slope of a displacement vs time graph represents the velocity of an object because velocity is the rate of change of displacement with respect to time. A steep slope implies that the displacement is changing rapidly over time, resulting in a large velocity.
The slope of a velocity-time graph represents acceleration. A positive slope indicates an increase in velocity over time, while a negative slope indicates a decrease in velocity (deceleration). The steeper the slope, the greater the acceleration or deceleration experienced by the object.
To determine velocity from a position-time graph, you can find the slope of the graph at a specific point. The slope represents the rate of change of position, which is the velocity at that point. A steeper slope indicates a higher velocity, while a flatter slope indicates a lower velocity.
constant slope. really anything will work as long as it stays the same. so if your line is straight then you have a constant velocity. :)
No, acceleration is the rate of change of velocity with respect to time. It is the derivative of the velocity function, not the slope of the velocity vs. time graph. The slope of the velocity vs. time graph represents the rate of change of velocity, not acceleration.
False. It means it is slowing Down!
The tangent at a point on the position-time graph represents the instantaneous velocity. 1. The tangent is the instantaneous slope. 2. Rather than "average" velocity, the slope gives you "instantaneous" velocity. The average of the instantaneous gives you average velocity.
if there is a slope, the velocity is either increasing or decreasing. This is acceleration.