Which statement is true about whether Z and B are independent events?
2 answers:
The correct answer is:
A. Z and B are independent events because P(Z∣B) = P(Z).
Z and B are independent events because P(Z∣B) = P(Z) is true about whether Z and B are independent events.
Two events Z and B are said to be independent if event Z occuring does not prevent event B from happening. Then P(Z and B) = P(Z) · P(B)
Conditional event, P(Z | B) is given by P(Z and B)/P(B) = P(Z) · P(B) / P(B) = P(Z)
Now, P(Z | B) = P(Z and B) / P(B) = 126/280 = 0.45 and P(Z) = 297/660 = 0.45
Therefore, <span>Z and B are independent events because P(Z∣B) = P(Z).</span>
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Step-by-step explanation:
After one year
A=p(1+r/n)^nt
=2000(1+0.03/12)^12*1
=2000(1+0.0025)^12
=2000(1.0025)^12
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=$2060.8
After two-years
A=p(1+r/n)^nt
=2060.8(1+0.03/12)^12*2
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=2060.8(1.0618)
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After three years
A=p(1+r/n)^nt
=2188.157(1+0.03/12)^12*3
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=2188.157(1.0941)
=$2394.063
