Wiki User
∙ 6y agoIt is travelling in such a way that its distance from the origin is increasing at a constant rate. The car's speed need not be constant because its direction of travel could be changing.
Wiki User
∙ 6y agoThe slope for a straight line graph is the ratio of the amount by which the graph goes up (the rise) for every unit that it goes to the right (the run). If the graph goes down, the slope is negative. For a curved graph, the gradient at any point is the slope of the tangent to the graph at that point.
It is a straight line equation whereas m is the slope and b is the y intercept.
the gradient of a graph at any point.
Slope of a straight line on a Cartesian coordinated graph is 'rise over run' = y2-y1/x2-x1 = change in 'y'/change in 'x'
A straight line on the Cartesian plane
If velocity is constant, the slope of the graph on a position vs. time graph will be a straight line. The slope of this line will represent the constant velocity of the object.
If the slope is 'uphill' then the car is going faster
The graph of the equationy = 2x + any numberis a straight line with a slope of 2.
A line. The derivative of a function is its slope. If the slope is a constant then the graph is a line.
A straight line graph with negative slope slants downward from left to right.
ax + by = cThe graph if that equation is a straight line whose slope is (-a/b)and whose y-intercept is (c/b).
The slope for a straight line graph is the ratio of the amount by which the graph goes up (the rise) for every unit that it goes to the right (the run). If the graph goes down, the slope is negative. For a curved graph, the gradient at any point is the slope of the tangent to the graph at that point.
It is a straight line equation whereas m is the slope and b is the y intercept.
The slope of the graph does not exist. And in the context of "this" problem it means absolutely nothing.
The equation has no slope. The graph of the equation is a straight line with a slope of -1 .
The acceleration of the ball can be estimated by calculating the slope of the velocity versus time graph. If the graph is a straight line, the slope represents the acceleration. The steeper the slope, the greater the acceleration. If the graph is curved, the instantaneous acceleration can be estimated by finding the slope of the tangent line at a specific point on the curve.
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.