To describe a relationship given a graph, one can analyze the key features such as the shape of the graph (linear, quadratic, exponential), the direction of the trend (increasing, decreasing, constant), and any notable points (intercepts, maxima, minima). Conversely, to sketch a graph from a description, you identify the type of relationship (e.g., linear, polynomial) and its characteristics, like slopes or curvature, and then plot key points and features based on that information. Using these details, you can create an accurate representation that reflects the described relationship.
The locus of all points that are a given distance from a given point of origin is a circle.To draw this, use a compass set to 2in and centered on the point of origin. Graph paper is recommended.
The description given fits that of an isosceles trapezoid whereas non parallel sides are equal in length and base angles are equal in sizes.
The opposite angles are congruent and all add to 360 degrees
A rhombus would fit the given description
A cone would fit the given description.
A polygon would seem to fit the given description
The locus of all points that are a given distance from a given point of origin is a circle.To draw this, use a compass set to 2in and centered on the point of origin. Graph paper is recommended.
IS, not ARE: "A full description of his conduct and activities is given in this report." (description is given)
Sketch.
With probability ratios the value you get to describe the strength of the relationship when you compare (A given B) to (A given not B) is not the same as what you get when you compare (not A given B) to (not A given not B). This is, IMHO, a big problem. There is no such problem with odds ratios.
With probability ratios the value you get to describe the strength of the relationship when you compare (A given B) to (A given not B) is not the same as what you get when you compare (not A given B) to (not A given not B). This is, IMHO, a big problem. There is no such problem with odds ratios.
Given two variables n a linear relationship, the conversion factor between them is the gradient of their graph.
Your description of an event.
The description given fits that of an isosceles trapezoid whereas non parallel sides are equal in length and base angles are equal in sizes.
No sn or description given.
Editor picks are given out to animations of good quality on sketch star.
The opposite angles are congruent and all add to 360 degrees