ISI 2007 ME-I - Doubts

Question paper - http://economicsentrance.weebly.com/uploads/1/1/0/5/1105777/isi2007.pdf

Q8) if P= log(base x)xy and Q = log(base y)xy then P+Q =
A)PQ
B) P/Q
C) Q/P
D) (PQ)/2

Q12) - I got (A) exactly but Amit sirs solution says B -- someone please explain how? http://economicsentrance.weebly.com/uploads/1/1/0/5/1105777/isi2007.pdf

Q14) What does notation f(x;1) and f(x;0) mean?

Q21) Again I got (A) = 1 .. please explain how the answer is B?

23) How to approach this question?!

25) Again I got 240 possibilities.. please explain how the answer is 168

27) M=n/2 I get that.. but how to calculate variance?

28) ?? They all seem correct to me!! What am I missing?

Please respond!! Thank you!

For 12, take log on both sides and then differentiate wrt x. put x = 0 , you will get (B)

Thanks a lot Tsuki..

For 12 I differentiated directly and got (A).. why is it wrong to differentiate directly?

Q14) Here, f(x;θ)=θ*f(x;1)+(1-θ)*f(x;0), where both f(x;1) and f(x;0) are pdf’s,
Now, ∫ f(x;θ)dx= θ*∫ f(x;1)dx+ (1-θ)*∫ f(x;0)dx.
Since ∫ f(x;1)dx=∫ f(x;0)dx=1.
∫ f(x;θ)dx=θ+(1-θ)=1.
Hence option d, f(x;θ) is a pdf for every θ

Q21) Integrate the function over (0,1), then (1,sqrt(2)), then (sqrt(2),3/2)) and you will get b as answer.

Q23) Just use normal algebraic equation and then compare the options, dats the easiest way to get the answer, u will get a relationship in the form of this identity (p1+2*p2) = 750*p1*p2, compare the options and u will get that both p1=p2 and p2=(3/4)p1 satisfies the identity.

Thanks a lot Subhayu.. got these!!

Also I think you have posted the ans to 29 instead of 28..

for Q28..all of the options seems to go with the problem given..

Question 21, could someone share the workings for integral of fractional function.

Thanks

The working has been shared..u just check the previous posts..!!

Just noticed above workings.

thanks.

Subhayu, could you briefly elaborate on how you derived the second step in the solution

Right, how does that lead to the next equation exactly?

Sorry for the bother!

In the interval [0,1], [x] =[x^2]=0, in the interval [1, sqrt(2)], [x]=[x^2]=1 and in the interval [sqrt(2), 3/2], [x]=1 and [x^2]=2.

Its not at all bothering brother..absolutely ok..!

Grateful!

I got 25

number 3 can only be in 3rd , 4th or 5th positions as it must be preceeded and suceeded by 2 numbers.
Now if it is in 3rd place -> it can be preceeded in 2! ways and succeded in 4! ways. So total = 48. Exactly the reverse argument holds when 3 is in 5th place. So again there are 48 cases.

When 3 is in 4th place .. there are 3 places before and 3 after. in the 3 places before 1 and 2 must be there.. so we need to do 3P2 = 6. similarly, in the 3 places after 3 we can do 3P2 for finding correct places of 6 and 7.. so we have 6*6=36 ways so far and in addition the 2 empty places can be filled by 4 or 5.. so 36*2=72

now 48 + 48 + 72=168

I hope this helps someone :D

Hi Subhayu, can you please explain this question again?