It makes sense to connect the points on a coordinate graph when the data represents a continuous relationship, such as time versus distance or temperature changes over time. In these cases, connecting the points helps visualize trends and patterns. However, for discrete data, where each point represents separate, distinct values, connecting the points may misrepresent the relationship. Always consider the context of the data when deciding whether to connect the points.
An isolated graph typically refers to a graph in which there are no edges connecting any of its vertices, meaning that all the vertices stand alone without any relationships or connections to each other. In this context, each vertex is an isolated point, and the graph is essentially a collection of disconnected points. This type of graph can be represented mathematically, but it does not have any paths or interactions between the vertices.
A scatter graph. A line graph need not involve minute changes.
Yes, a critical point can be where the graph changes its shape without changing its increasing or decreasing behavior. This typically occurs at points of inflection, where the concavity of the graph changes, but the function may still be increasing or decreasing. In such cases, the first derivative does not change sign, while the second derivative does, indicating a change in the curvature of the graph rather than a change in the overall trend.
The turning point of a graph is called a "critical point" or "extremum." In calculus, these points occur where the derivative of a function is zero or undefined, indicating a local maximum or minimum. At these points, the graph changes direction, which can represent peaks or valleys in the function's behavior.
y = x!
Turning points are the points at which a graph changes direction from increasing o decreasing or decreasing to increasing.
They make points in space related to each other. Now they are connected in the problem, instead of just points on the graph.
A broken line graph shows information by plotting points of info on the graph, with dots and connecting them with a line.
Instead of connecting points with a line, a bar graph uses bars to represent data.
It makes sense to connect the points on a coordinate graph when the data represents a continuous relationship, such as time versus distance or temperature changes over time. In these cases, connecting the points helps visualize trends and patterns. However, for discrete data, where each point represents separate, distinct values, connecting the points may misrepresent the relationship. Always consider the context of the data when deciding whether to connect the points.
It is improper to connect the dots on a graph because experimental data never makes a straight line. the dots in a graph (points) are not guaranteed to be right. hopes this helps SR. :)
Anywhere you like.Anywhere you like.Anywhere you like.Anywhere you like.
An isolated graph typically refers to a graph in which there are no edges connecting any of its vertices, meaning that all the vertices stand alone without any relationships or connections to each other. In this context, each vertex is an isolated point, and the graph is essentially a collection of disconnected points. This type of graph can be represented mathematically, but it does not have any paths or interactions between the vertices.
You do not connect the dots on a graph when the data points are discrete and not continuous. In other words, when the values represent distinct and unrelated data points rather than a continuous sequence. Connecting the dots in such cases would imply a relationship or trend between the points that does not exist. It is important to consider the nature of the data being represented to determine whether connecting the dots is appropriate.
A negative correlation.
A negative correlation.