I think you are going for continuous variable, as compared with discrete variables.
Ratio - because there is a meaningful zero and an equal distance between points.
A discrete probability distribution is defined over a set value (such as a value of 1 or 2 or 3, etc). A continuous probability distribution is defined over an infinite number of points (such as all values between 1 and 3, inclusive).
If the line graph has a broken line between the points, it indicates that there are gaps in the data or that the values are not continuous. This could signify missing data points, changes in measurement conditions, or intervals where no observations were made. Such breaks can highlight important shifts or anomalies in the dataset. It’s essential to interpret these breaks carefully to understand the context of the data being represented.
Yes, a line graph is designed to display continuous data, as it connects individual data points with lines to illustrate trends over a period of time or across different categories. This visual representation helps to highlight the relationships and changes between the data points. Line graphs are commonly used in contexts such as tracking temperature changes, stock prices, or any variable that can take on an infinite number of values within a range.
more data points give you a much closer estimate to the slope of the graph at one single point. The slope of the graph between two points is the average velocity between two points, but with more points present, the data points will be closer together to give you a much closer approximation of the slope at one single point
Continuous data has an infinite number of points between each measurement. This type of data can take any value within a given range, allowing for an infinite number of possible values, such as height, weight, or temperature. In contrast to discrete data, which consists of distinct and separate values, continuous data can be measured with great precision.
There are an infinite number of points on the circumference of a circle and an infinite number of points on a semi-circle so the answer to your question is "An infinite number of pairs of points."
Data with an infinite number of points between each measurement is known as continuous data. This type of data can take any value within a given range, meaning that between any two measurements, there can be countless possible values. Examples include measurements like height, weight, temperature, and time, where you can have decimals or fractions that represent values not limited to whole numbers.
The radius of a circle or a sphere has infinite number of points.
Generally, no. All circles contain an infinite number of chords, as a chord can be created between any two points on the circle. With an infinite number of points on the circle we can create an infinite number of chords.
There are an infinite number of points between any two numbers on the real number line.
Between any two points on Earth, no matter how close together they are, there are an infinite number of latitudes and an infinite number of longitudes.
Continuous data has an infinite number of points between each measurement. This type of data can take on any value within a given range, allowing for fractional values and representing measurements like height, weight, and temperature. Unlike discrete data, which consists of distinct or separate values, continuous data can be subdivided infinitely.
Between 2 distinct points, there are an infinite number of planes that can be drawn in 3 dimensions
Yes, there are an infinite number of decimal points between any two consecutive whole numbers.
A line in Euclidean geometry contains an infinite number of points. This is because a line extends indefinitely in both directions, and there are no gaps between the points along the line. Therefore, regardless of how you look at it, the number of points on line ( f ) is infinite.
Length is the measurement of distance between two points.