Magnetic surveying is one technique used by archaeologists to determine anomalies arising from variations in magnetic susceptibility. Unusual changes in magnetic susceptibility might (or might not) indicate an important archaeological discovery. Let x be a random variable that represents a magnetic susceptibility (MS) reading for a randomly chosen site at an archaeological research location. A random sample of 120 sites gave the readings shown in the table below.Magnetic Susceptibility Readings,centimeter-gram-second ✕ 10−6 (cmg ✕ 10−6)CommentMagneticSusceptibilityNumber ofReadingsEstimatedProbability"cool"0 ≤ x < 103030/120 = 0.25"neutral"10 ≤ x < 205454/120 = 0.45"warm"20 ≤ x < 302424/120 = 0.20"very interesting"30 ≤ x < 4066/120 = 0.05"hot spot"40 ≤ x66/120 = 0.05Suppose a "hot spot" is a site with a reading of 40 or higher.(c) What is the probability that you will need more than five readings to find the first "hot spot"? Compute P(n > 5). (Round your answer to three decimal places.)

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MATLAB: An Introduction with Applications

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ISBN:9781119256830

Author:Amos Gilat

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Magnetic surveying is one technique used by archaeologists to determine anomalies arising from variations in magnetic susceptibility. Unusual changes in magnetic susceptibility might (or might not) indicate an important archaeological discovery. Let x be a random variable that represents a magnetic susceptibility (MS) reading for a randomly chosen site at an archaeological research location. A random sample of 120 sites gave the readings shown in the table below.

Magnetic Susceptibility Readings, centimeter-gram-second ✕ 10⁻⁶ (cmg ✕ 10⁻⁶)
Comment	Magnetic Susceptibility	Number of Readings	Estimated Probability
"cool"	0 ≤ x < 10	30	30/120 = 0.25
"neutral"	10 ≤ x < 20	54	54/120 = 0.45
"warm"	20 ≤ x < 30	24	24/120 = 0.20
"very interesting"	30 ≤ x < 40	6	6/120 = 0.05
"hot spot"	40 ≤ x	6	6/120 = 0.05

Suppose a "hot spot" is a site with a reading of 40 or higher.

P(n > 5).

(Round your answer to three decimal places.)

Expert Solution

Step 1

(c)

Let n be the number of trails for getting first hotspot follows geometric distribution with p=0.05.

The probability mass function for n is,

$P (n) = 0.05 {(1 - 0.05)}^{n - 1}$

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