SOLUTION: 400 students are surveyed about the pets they have. 250 have a dog, 190 have a cat and 160 have a dog and a cat. What is the probability that a student has a dog? And what is t

Question 1134540: 400 students are surveyed about the pets they have. 250 have a dog, 190 have a cat
and 160 have a dog and a cat. What is the probability that a student has a dog?
And what is the probability the student has a dog OR a cat?
Found 2 solutions by ikleyn, Edwin McCravy:
Answer by ikleyn(52778)   (Show Source): You can put this solution on YOUR website!
.

There is a universal set U of 400 students. There is a subset D of 250 students that have a dog. There is a subset C of 190 students that have a cat. And there is the intersection (D n C) of these subsets, which contains 160 students that have a dog AND a cat. Then the number of students who have a dog OR a cat is n(D U C) = n(D) + n(C) - n(D n C) = 250 + 190 - 160 = 280. The answer to the first question is P(D) = = = . The answer to the second question is P(D U C) = = = .

Solved, answered and completed.

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If you want to learn more about the formula to calculate the union of subsets, look into my lesson
    - Counting elements in sub-sets of a given finite set
in this site.

Answer by Edwin McCravy(20054)   (Show Source): You can put this solution on YOUR website!
400 students are surveyed about the pets they have. 250 have a dog, 190 have a
cat and 160 have a dog and a cat. What is the probability that a student has a
dog?

The probability of a dog is 250 out of 400 = 250/400 = 5/8 For the other question I think a Venn diagram is better. Let D = the set of students who own dogs. Let C = the set of students who own cats. Let w = the number of students with dogs but NO cats. Let x = the number of students both cats and dogs. Let y = the number of students with cats but NO dogs. Let z = the number of students with NO dogs and NO cats.
400 students are surveyed about the pets they have.
So w + x + y + z = 400.
250 have a dog,
So w + x = 250
190 have a cat,
So x + y = 190
160 have a dog and a cat.
So x = 160 Substitute 160 for x in w + x = 250 w + 160 = 250 w = 90 Substitute 160 for x in x + y = 190 160 + y = 190 y = 30 Substitute w=90, x=160, y=30, in w + x + y + z = 400 90 + 160 + 30 + z = 400 280 + z = 400 z = 120 [You weren't asked for z, but you should know how to find it anyway, in case you'd have been asked about petless students]
And what is the probability the student has a dog OR a cat?
That's the number in both circles over 400, or (w+x+y)/400 = (90+160+30)/400 = 280/400 = 7/10 Edwin

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