A company that makes fleece clothing uses fleece produced from two farms, Northern Farm and Western Farm. Let the random variabl
2 answers:
Answer:
D)
Step-by-step explanation:
Let's start writing the data from the exercise.
The random variables are :
X : '' Weight of fleece produced by a sheep from Northern Farm ''
Y : '' Weight of fleece produced by a sheep from Western Farm ''
W : '' Total weight of fleece from 10 randomly selected sheep from Northern Farm and 15 randomly selected sheep from Western Farm ''
Let's use μ to denote mean, σ to denote standard deviation and VAR to denote variance.
In the exercise :
μ(X) = 14.1 pounds
σ(X) = 1.3 pounds
μ(Y) = 6.7 pounds
σ(Y) = 0.5 pounds
The equation that represents W is
Let's suppose that we have two random variables X1 and X2. Let's also assume that X1 and X2 are independent. If we have the following linear combination of the random variables :
aX1 + bX2
The variance of the linear combination is :
Applying this to the exercise :
(I)
We know that VAR(X) = σ²(X) ⇒
And also
If we replace in (I) ⇒
Given that we find the variance of W, If we want to obtain the standard deviation we need to apply square root to the variance of W ⇒
σ(W) =
Finally, the correct option is D)
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Check the picture below.
so notice, their perimeter is the same, because the perimeter is just one rod anyway, and all rods are the same length, thus
so notice, their perimeter is the same, because the perimeter is just one rod anyway, and all rods are the same length, thus
Answer:
a) R1ºR1 = R1
b) R1ºR2 = R1
c) R1ºR3 =
d) R1ºR4 =
e) R1ºR5 = R1
f) R1ºR6 =
g) R2ºR3 =
h) R3ºR3 = R3
Step-by-step explanation:
R1ºR1
(<em>a,c</em>) is in R1ºR1 if there exists <em>b</em> such that (<em>a,b</em>) is in R1 and (<em>b,c</em>) is in R1. This means that a > b, and b > c. That can only happen if a > c. Therefore R1ºR1 = R1
R1ºR2
This case is similar to the previous one. (<em>a,c</em>) is in R1ºR2 if there exists <em>b</em> such that (<em>a,b</em>) is in R2 and (<em>b,c</em>) is in R1. This means that a ≥ b, and b > c. That can only happen if a > c. Hence R1ºR2 = R1
R1ºR3
(a,c) is in R1ºR3 if there exists b such that a < b and b > c. Independently of which values we use for a and c, there always exist a value of b big enough so that b is bigger than both a and c, fulfilling the conditions. We conclude that any pair of real numbers are related.
R1ºR4
This is similar to the previous one. Independently of the values (a,c) we choose, there is always going to be a value b big enough such that a ≤ b and b > c. As a result any pair of real numbers are related.
R1ºR5
If a and c are related, then there exists b such that (a,b) is in R5 and (b,c) is in R1. Because of how R5 is defined, b must be equal to a. Therefore, (a,c) is in R1. This proves that R1ºR5 = R1
R1ºR6
The relation R6 is less restrictive than the relation R3, if we find 2 numbers, one smaller than the other, in particular we find 2 different numbers. If we had 2 numbers a and c, we can find a number b big enough such that a<b and b >c. In particular, b is different from a, so (a,b) is in R6 and (b,c) is in R1, which implies that (a,c) is in R1ºR6. Since we took 2 arbitrary numbers, then any pair of real numbers are related.
R2ºR3
This is similar to the case R1ºR3, only with the difference that we can take b to be equal to a as long as it is bigger than c. We conclude that any pair of real numbers are related.
R3ºR3
If a and c are real numbers such that there exist b fulfilling the relations a < b and b < c, then necessarily a < c. If a < c, then we can use any number in between as our b. Therefore R3ºR3 = R3
I hope you find this answer useful!
<u>Answer:</u>
<u>Step-by-step explanation:</u>
He has asked me to move the finish line 0.25 km forward
Now,
we know that
1 km = 0.621371 mile
⇒ 0.25 km = mile
= feet
(since 1760 yards = 1 mile and 3 feet = 1 yard)
= 820.20972 feet
. (Answer)