Answer:
The correct option is 4.
Step-by-step explanation:
From the given graph it is clear that the line passes through the points (1,15) and (2,30).
If a line passes through two points then the slope of the line is
The line passes through the points (1,15) and (2,30). So, slope of the line is
Slope of the line is 15. Therefore the correct option is 4.
Data points
a data series
an x axis
a y axis
a legend
hope this helps (:
Answer:
E(1,1/2)
would be another point at left of c
Answer:
LMN is <u>not a right triangle.</u>
Step-by-step explanation:
To verify that the lengths of a triangle for a right triangle, all we need to do is to check it they satisfy the <u>Pythagoras Theorem.</u>
Pythagoras Theorem:
The Hypotenuse is always the longest side.
Since no angle is given, the two other sides can be alternated.
Given lengths of triangle LMN: 18.5 inches, 10, inches, and 15.5 inches
Answer:
Correct option:
(1) the eastern gray squirrels that live in New York City's Central Park
Step-by-step explanation:
A population in Statistical analysis represents the set of all possible values a random variable, <em>X</em> can assume. For example, all the registered voters of the United States form a population, the weight of all the newborn babies in the country form a population.
All the mammals living in the region of Boulder, Colorado cannot form a population. This is because the set consists of <em>n</em> different species in the region.
And the gray squirrels and fox squirrels are two different species. So, together they cannot form a population.
The red foxes found east of the Mississippi River in the United States and in eastern Europe cannot form a population because the red foxes selected are from two different regions.
The eastern gray squirrels that live in New York City's Central Park can form a population because the set consists of one one species, i.e. the eastern gray squirrels from a particular region, i.e. New York City's Central Park.
Thus, the example of a population is "the eastern gray squirrels that live in New York City's Central Park."