The measure of angle bcd of the polygon abcd is 40°.
Hence, option b) 40° is the correct answer.
<h3>
What is a polygon?</h3>
A polygon is simply a two-dimensional a plane shape enclosed by line segments called sides.
The sum of the exterior angles of a regular polygon will always equal 360
Given that;
- Exterior angle a = 25 degrees
- Exterior angle b = 146 degrees
- Exterior angle d = 149 degrees
25° + 146° + 149° + c = 360°
320° + c = 360°
c = 360° - 320°
c = 40°
The measure of angle bcd of the polygon abcd is 40°.
Hence, option b) 40° is the correct answer.
Learn more about polygons here: brainly.com/question/22408868
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I believe the correct answer is D.
Answer:
At least one student is 23: Must be true
Some students are younger than 15: Could be true
Step-by-step explanation:
Statement 1: A median is a number in the middle for ex. 1, 2, 3, 4, 5 in this example 3 is the median. Another ex could be 1, 2, 3, 4, 5, 6. This time you would have to add (3 + 4), divide by 2, which equals 3.5.
Since there are 21 students in class making it an odd number 23 must be true.
Statement 2: Based on the information I am given, I would say could be true because the difference between the oldest and the median is 29 - 23 = 6 so it could be true.
Answer:
Step-by-step explanation:
x = -4 and x=1
The solutions to the equation x^2 +3x -4 = 0 will be given by the points at which the graph intercepts the x-axis.
By looking at the graph, we can clearly see that the graph intercepts the x-axis at x=-4 and x=1.
One of the roots is located between -4 and -3, and the other one between 0 and 1.
Answer:
For positive linear association, both variables increase and decrease concurrently hence the correct answer is
a. Neighborhoods with a higher number of liquor stores tend to have a higher amount of crimes.
Step-by-step explanation:
A positive linear association exists when both variables increase or decrease proportionately to each other while a negative linear relationship exists when one molecule increases while the second variable decreases simultaneously.
An example of a positive linear association diagram in graph form is attached
It is essential to find out how two or more variables are related during the course of appraising their relationship.
Although linear associations are very common, there are other types of associations and sometimes no associations at all between variables.
When you attempt to evaluate the association between variables it simplifies the evaluation if one starts by plotting out the values on a graph to form a scatter plot.