Dear all,
I am reading the Ngene handbook and have a problem understanding the calculation on page 95, referring to Table 7.1.
It is said that "the full factorial design has 2^1 x 3^8 x 4^2 = 209,952 choice situations".
I don't understand how exactly this is calculated, particularly the 3^8 part.
I thought that you would multiply the number of levels, but I really don't get where there are 8 times 3 levels.
Can anybody help me?
Thanks a lot in advance!
Calculate no. of choice situations (labeled, full factorial)
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Calculate no. of choice situations (labeled, full factorial)
by greenvanilla » Tue Jul 16, 2019 6:33 am
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Re: Calculate no. of choice situations (labeled, full factor
by Michiel Bliemer » Thu Jul 18, 2019 6:53 am
Yes you can simply multiply the levels, so in that example that would be (looking at Table 7.1):
3*3*4*3*3*4*3*2*3 = 2^1 * 3^6 * 4^2 = 23,328.
So it seems that the calculation in the manual is wrong, it should be 3^6 instead of 3^8. We will correct this in the manual.
Michiel
3*3*4*3*3*4*3*2*3 = 2^1 * 3^6 * 4^2 = 23,328.
So it seems that the calculation in the manual is wrong, it should be 3^6 instead of 3^8. We will correct this in the manual.
Michiel
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Re: Calculate no. of choice situations (labeled, full factor
by greenvanilla » Thu Jul 18, 2019 8:00 pm
Thank you very much for your helpful reply, Prof. Bliemer!
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