Answer:
naturalistic observation
Explanation:
Naturalistic observation -
It is the method of observation in the research field , where the method used is observing the object of study in their particular natural environment , is referred to as naturalistic observation.
This helps to get a pure and proper source of knowledge for the research work , and helps to understand the subject is the best possible way.
Hence, from the given scenario of the question,
Chan Lee observe the gorillas in their natural habitat , i.e. ,in the subtropical forests , to get the best information , showcasing naturalistic observation.
Answer: True
Explanation:
In that way, Ben was attempting to establish identification and confidence with his audience because he was pointing on something that worried the audience. Changing general education requirements should always take in consideration opinion of the audience and when talking to audience about things that they are interesting in, it can make a great and successful discussion or presentation.
According to the Constitution, the right of freedom of religion supports all religions in the world. This goes in hand with the right to free speech, as well as a certain right to privacy.
I believe the answer is: testing effects
Testing effects refers to the perception long term memories tend to be increased when our brain is dedicated to retrieving a certain type of information over and over again. When studying, this tend to make people become bias and overconfident after repeating a certain topic, making them believe that they do not need to study the topic again before test.
Answer:
P = 5.2 × 10^12 years
Explanation: Given that the size of asteroid = 2.0 AU from the sun.
Since 1 AU - 150 million km,
Size of the asteroid = 300 million km
it is expressed in astronomical units (1 AU equals the average distance between the Earth and Sun)
The period (P) is measured in years, using Kepler's Third Law
P^2 = R^3
Where
P is in Earth years, and R is in AU
P^2 = (300 million)^3
P^2 = 2.7 × 10^25
P = 5.2 × 10^12 years
The asteroid's orbital period in Earth years is 5.2 × 10^12
