Hello David,
In pdf document you propose, for Q:32-4, I try to find a reasoning to reach at formula used (i.e. T=(t-stat/IR)^2).
1/If we set Alpha as random variable with mean 1% and Standard Deviation=10% (IR ?); and if we scale mean by nb of period (n) we obtain Mean(n)=1%*n and if we scale SD we obtain SD(n)=SD*sqrt(n). That's the scaling rule used to extrapolate SD from one to n period.
2/ if we want to calculate nb of period to wait until we are sure that Alpha is significantly different from 0, is it equivalent to construct a two-tailed test for which Ho (null hypothesis) is Alpha=0%, at 95% confidence level. We want to test when alpha is different from 0 (zero) with a level of confidence.
So I have these computations:
Alpha SD Alpha
Period
1 1,00% 10,00%
383 383% 195,82%
t calc=1,96 (=(1%*n-0%)/(SD*SQrt(n))
P(Alpha>0%)=0,974897286 (N(x))
And I solve for n to obtain P(Alpha>0%)=97.5% b/c it is a two tail test.
I not sure if I am correct or not. Could you help me?
Thank you very much
Hervé
In pdf document you propose, for Q:32-4, I try to find a reasoning to reach at formula used (i.e. T=(t-stat/IR)^2).
1/If we set Alpha as random variable with mean 1% and Standard Deviation=10% (IR ?); and if we scale mean by nb of period (n) we obtain Mean(n)=1%*n and if we scale SD we obtain SD(n)=SD*sqrt(n). That's the scaling rule used to extrapolate SD from one to n period.
2/ if we want to calculate nb of period to wait until we are sure that Alpha is significantly different from 0, is it equivalent to construct a two-tailed test for which Ho (null hypothesis) is Alpha=0%, at 95% confidence level. We want to test when alpha is different from 0 (zero) with a level of confidence.
So I have these computations:
Alpha SD Alpha
Period
1 1,00% 10,00%
383 383% 195,82%
t calc=1,96 (=(1%*n-0%)/(SD*SQrt(n))
P(Alpha>0%)=0,974897286 (N(x))
And I solve for n to obtain P(Alpha>0%)=97.5% b/c it is a two tail test.
I not sure if I am correct or not. Could you help me?
Thank you very much
Hervé
