Answer:
Step-by-step explanation:
a) Maternal gene = 0.25; Paternal gene = 0.25
Probability having a birth defect = 0.25 X 0.25 = 0.625
b) P(A) = 0.30; P(B) = 0.70
P(A)*P(B) = 0.30 X 0.70 = 0.021
For marriage:
25%: P(A)*P(A)*0.25 = 0.09 X 0.25 = 0.0225
65%: P(B)*P(B)*0.65 = 0.049 X 0.65 = 0.03185
10%: P(A)*0.10 = 0.03 and P(B)*0.10 = 0.07
P(A)*P(B) = 0.03 X 0.07 = 0.0021
Probability of a defect birth in the next generation = 0.0225 + 0.03185 + 0.0021 = 0.05645
c) 1. P(A)*P(A) = 0.09
2. P(B)*P(B) = 0.049
3. P(A)*P(B) = 0.021
The point in <em>rectangular</em> form (x, y) = (-4, -6) means that a point is located 4 units to the left of the origin and 6 units below the origin. A representation is shown below.
<h3>How to located a point in a Cartesian plane</h3>
By <em>Euclidean</em> geometry we know that a plane is generated by two <em>non-co-linear</em> lines. <em>Cartesian</em> planes are generated by two <em>orthogonal</em> lines (axes x, y), whose interception is known as origin. The point in <em>rectangular</em> form (x, y) = (-4, -6) means that a point is located 4 units to the left of the origin and 6 units below the origin.
Finally, we proceed to present the location of the given point with the help of a graphing resource.
To learn more on Cartesian planes: brainly.com/question/13266753
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Answer:
Option (C): The Rome data center is best described by the mean. The New York data center is best described by the median.
Step-by-step explanation:
1. Rome
Minimum=0
Maximum=16
Median ,
Mean = 8
Standard Deviation(σ)=5.4
As, difference between , Maximum -Mean =Mean - Minimum=8
So, Mean will Worthy description to find the center of Data set, given about Rome.
2. New York
Minimum=1
Maximum=20
Median , Q2 = 5.5
Mean = 7.25
Standard Deviation(σ)=6.1
As, for New york , Mean is not the mid value, that is difference between Mean and Minimum is not same as Maximum and Mean.
As, you can see , the three Quartiles , are very close to each other, it means , other data values are quite apart from each other. So, Mean will not appropriately describe the given data.So, in this case Median will suitable to find the center.
I believe x= 32. 2(32) - 4 would equal 60. And due to all the angles and sides being the same, this would be correct.