Difference between revisions of "GATE2010 q26"

Latest revision as of 11:53, 15 July 2014

Consider a company that assembles computers. The probability of a faulty assembly of any computer is $p$. The company therefore subjects each computer to a testing process. This testing process gives the correct result for any computer with a probability of $q$. What is the probability of a computer being declared faulty?

(A) $pq + (1 - p)(1 - q)$

(B) $(1 - q)p$

(C) $(1 - q)p$

(D) $pq$

Solution by Happy Mittal

P(declared faulty) 
= P(actually faulty)*P(declared faulty|actually faulty) +  P(not faulty)*P(declared faulty|not faulty) 
= $p*q + (1-p)*(1-q)$

So, option (A) is correct.

@@ Line 1: / Line 1: @@
-Consider a company that assembles computers. The probability of a faulty
+Consider a company that assembles computers. The probability of a faulty assembly of any computer is $p$. The company therefore subjects each computer to a testing process. This testing process gives the correct result for any computer with a probability of $q$. What is the probability of a computer being declared faulty?
- assembly of any computer is $p$. The company therefore subjects each
- computer to a testing process. This testing process gives the correct result for
- any computer with a probability of $q$. What is the probability of a computer
- being declared faulty?
- '''(A) $pq + (1 - p)(1 - q)$'''
+'''(A) $pq + (1 - p)(1 - q)$'''
- (B) $(1 - q)p$
+(B) $(1 - q)p$
- (C) $(1 - q)p$
+(C) $(1 - q)p$
- (D) $pq$
+(D) $pq$
 ==={{Template:Author|Happy Mittal|{{mittalweb}} }}===
@@ Line 23: / Line 19: @@
 [[Category: GATE2010]]
-[[Category: Probability questions]]
+[[Category: Probability questions from GATE]]

Difference between revisions of "GATE2010 q26"

Latest revision as of 11:53, 15 July 2014

Solution by Happy Mittal

Solution by Happy Mittal[edit]