Answer:
4 units
Step-by-step explanation:
You use the less than simple. This one: <
Answer: ( 1. ) Negative Correlation.
Use bottom info to Justify answer.
Step-by-step explanation:
As x increases y decreases = Positive Correlation
As x increases y decreases = Negative Correlation
As x increases y stays the same = No Correlation.
Hope this helps. :)
The probability that any given car will have a brake failure if it is make a is 0.0065%
<h3>How to determine the probability?</h3>
The complete question is added as an attachment
From the table in the question, we have:
P(Brake failure|car a) = 0.0065%
The above represents the required conditional probability
Hence, the probability that any given car will have a brake failure if it is make a is 0.0065%
Read more about probability at:
brainly.com/question/2479210
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Answer:
The coordinates of B' and C' are
and
.
Step-by-step explanation:
Vectorially speaking, the translation of a point is represented by the following operation:
(1)
Where:
- Original point.
- Translated point.
- Translation vector.
First, we need to calculate the translation vector after knowing that
and
. That is:
![T(x,y) = A'(x,y) - A(x,y)](https://tex.z-dn.net/?f=T%28x%2Cy%29%20%3D%20A%27%28x%2Cy%29%20-%20A%28x%2Cy%29)
![T(x,y) = (6,2) - (3,4)](https://tex.z-dn.net/?f=T%28x%2Cy%29%20%3D%20%286%2C2%29%20-%20%283%2C4%29)
![T(x,y) = (3, -2)](https://tex.z-dn.net/?f=T%28x%2Cy%29%20%3D%20%283%2C%20-2%29)
Finally, we determine the coordinates of points B' and C':
, ![T(x,y) = (3, -2)](https://tex.z-dn.net/?f=T%28x%2Cy%29%20%3D%20%283%2C%20-2%29)
![B'(x,y) = (1,6) + (3,-2)](https://tex.z-dn.net/?f=B%27%28x%2Cy%29%20%3D%20%281%2C6%29%20%2B%20%283%2C-2%29)
![B'(x,y) = (4,4)](https://tex.z-dn.net/?f=B%27%28x%2Cy%29%20%3D%20%284%2C4%29)
, ![T(x,y) = (3, -2)](https://tex.z-dn.net/?f=T%28x%2Cy%29%20%3D%20%283%2C%20-2%29)
![C'(x,y) = (5,1) + (3,-2)](https://tex.z-dn.net/?f=C%27%28x%2Cy%29%20%3D%20%285%2C1%29%20%2B%20%283%2C-2%29)
![C'(x,y) = (8, -1)](https://tex.z-dn.net/?f=C%27%28x%2Cy%29%20%3D%20%288%2C%20-1%29)
The coordinates of B' and C' are
and
.