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(analysis of variance) ,k(k3) :
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knnk6.16.1 nk
(
yiji=12kj=1,2n)1y11y12y1jy1nT12y21y22y2jy2nT2iyi1yi2yijyinTikyk1yk2ykjyknTk
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6.1nkv = nk1SST61C (62) i
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(61): 63 =()+ k v =k1 , SSt v =n1 k v = k (n1) , SSe (65) 64
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6.1(66) DFT =DFt +DFe :(67)
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[6.1] ABCD 4A4(cm)6.2 6.2 (cm) (66) DFT=(nk1)=(44)1=15
DFt=(k1)=41=3 DFe=k(n1)=4(41)=12
Ti A18 21 20 137218B20 24 26 229223C10 15 17 145614D28 27 29
3211629T=336 =21
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(63)
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A B
C
D
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FF s12 s22 s12 s22 F68Fs12 v1 s22 v2 F v1 v2 F F
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F1 =12[0]3 v1 v2 v1=1 v1=2FJ v13(6.1)6.1 Fv1v2
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F(1)yN( )(2) s12 s22 F F0.05H0
- [6.2] 310 s12 =1.6211395 s22 =0.1353139 H0139 =0.05v1=9v2
=4F0.05 =6.00 : F =1.621/0.135=12.01 F>F0.05P
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[6.3] 6.1st2=168.00se2=8.17 v1=3v2=12 =0.05 F0.05=3.49 F
=168.00/8.17=20.56 5 v1 =3v2=12 F0.05
=3.49F0.01=5.95F>F0.01>F0.05
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6.16.36.36.3
DFSSMSFF 3504168.0020.56F 0.05(3,12) = 3.49 ()12 98 8.17F
0.01(3,12) =5.9515602
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multiple comparisonskk(k1)/2 ( q) Duncan
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(least significant differenceLSD) t 1F 2( )
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|t| (69)n se2 MSe(69) (610)
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[6.4] LSD6.2 (6.3)F=20.56MSe=8.17DFe=12 4v =12t0.05
=2.179t0.01=3.055 LSD0.05 =2.1792.02=4.40(cm)
LSD0.01=3.0552.02=6.17(cm) 4.40cm6.17cm
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q qStudent-Newman-KeulSNKNK qk q
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q(611) (612) 2pkp() SEk1
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[6.5] 6.2q 6.1 7 qDF=12p=234 (611) 6.46.4 6.2 (q)
pq0.05q0.01LSR0.05LSR0.0123.084.324.406.1833.775.045.397.2144.205.506.017.87
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6.2, =29cm =23cm, =18cm =14cm----
p=2 =6(cm)5 =5(cm)5 =4(cm)p=3 =11(cm)1 =9(cm)1p=4 =15(cm)1
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D.B. Duncan(1955)p( shortest significant rangesSSR ) 613 p p
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[6.6] 6.2 =29cm =23cm =18cm =14cm MSe=8.17 8(613)p=234(6.5)p6.5
6.2LSR()
pSSR0.05SSR0.01LSR0.05LSR0.0123.084.324.406.1833.234.554.626.5143.334.684.766.69
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p=2 =6(cm) 5 =5(cm) 5 =4(cm) p=3 =11(cm) 1 =9(cm) 1p=4 =15(cm)1
6.24ACqq
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() () ()
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=0.05* =0.01*, =0.056.6()
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6.6 6.2()
( ) 14 18 23D2915**11**6*B239**5*A184C14
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() 12k16.20.01(q)
29cm(D)23cm(B)18cm(A)14cm(C)
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() 1 2aab() 3bb() bbc
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4 5
=0.05 =0.01
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16.7a 2 b 3 c 4 c 416.7[6.7] 6.6
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6.7 6.2() 6.7ACDBAC =0.05BADBACDACBC
(cm)0.050.01D29 a AB23 b ABA18 c BCC14 c C
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1 2H0H0
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1 2F 3
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6.13()6 (1)() (2)() (3)()
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3 (1) (additivity) (638)
-
:
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6.37(). 6.37
(lg10)121212A102010201.001.30B304030601.481.78
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(2) normality . Fkk pp(1p)/n
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(3)(homogeneity) N(0 ) ( ) ( )
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1 2 3
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( square root transformation ) poisson y 1
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( logarithmic transformation ) ylg y. 10lg(y+1)
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(arcsine transformation) pp0.7p 12p
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[6.15] 2 1 2 3 466.38
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6.38 (p)
123%979182857877957772645668937875766371706866495564
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6.38p70%126.38p6.39 6.39 ( )
12380.077.174.756.872.561.362.055.664.958.160.054.367.253.160.744.462.048.452.547.961.355.657.453.1407.9353.6367.3312.168.058.961.252.0
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6.39n6.40 6.40 6.39 LSD 6.41
DFSSMSFF0.05 3 780.48 260.164.573.10 20 1139.58 56.98 23
1920.06
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6.41 36.414(1)12.7%(2)9.2%(3)23.9%
(%) 68.086.0(1)58.99.1*73.3(2)61.26.876.8(3)52.016.0*62.1
