Among 13 electrical components exactly 4 are known not to function properly. If 6 components are randomly selected, find the following probabilities:(i) The probability that all selected components function properly.(ii) The probability that exactly 3 are defective.(iii) The probability that at least 1 component is defective.a) (i) 0.5105 (ii) 0.1958 (iii) 0.2937b) (i) 0.5105 (ii) 0.0490 (iii) 0.2937c) (i) 0.0490 (ii) 0.1958 (iii) 0.2937d) (i) 0.0490 (ii) 0.2937 (iii) 0.9510e) (i) 0.0490 (ii) 0.1958 (iii) 0.9510f) None of the above

Among 13 electrical components exactly 4 are known not to function properly. If 6 components are randomly selected, find the following probabilities:(i) The probability that all selected components function properly.(ii) The probability that exactly 3 are defective.(iii) The probability that at least 1 component is defective.a) (i) 0.5105 (ii) 0.1958 (iii) 0.2937b) (i) 0.5105 (ii) 0.0490 (iii) 0.2937c) (i) 0.0490 (ii) 0.1958 (iii) 0.2937d) (i) 0.0490 (ii) 0.2937 (iii) 0.9510e) (i) 0.0490 (ii) 0.1958 (iii) 0.9510f) None of the above

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A First Course in Probability (10th Edition)

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ISBN:9780134753119

Author:Sheldon Ross

Publisher:Sheldon Ross

Chapter1: Combinatorial Analysis

Section: Chapter Questions

Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...

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Concept explainers

Contingency Table

A contingency table can be defined as the visual representation of the relationship between two or more categorical variables that can be evaluated and registered. It is a categorical version of the scatterplot, which is used to investigate the linear relationship between two variables. A contingency table is indeed a type of frequency distribution table that displays two variables at the same time.

Binomial Distribution

Binomial is an algebraic expression of the sum or the difference of two terms. Before knowing about binomial distribution, we must know about the binomial theorem.

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Question

a) (i) 0.5105 (ii) 0.1958 (iii) 0.2937
b) (i) 0.5105 (ii) 0.0490 (iii) 0.2937
c) (i) 0.0490 (ii) 0.1958 (iii) 0.2937
d) (i) 0.0490 (ii) 0.2937 (iii) 0.9510
e) (i) 0.0490 (ii) 0.1958 (iii) 0.9510
f) None of the above

Expression, rule, or law that gives the relationship between an independent variable and dependent variable. Some important types of functions are injective function, surjective function, polynomial function, and inverse function.

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