Answer :
Answer:
1. The p-value for Factor A is:__0.4194________. e. greater than0 .10
2. What is your conclusion with respect to Factor A?b. Factor A is not significant
3. What is your conclusion with respect to Factor B?b. Factor B is not significant
4. The p-value for the interaction of factors A and B is:__0.1621_____.e. greater than .10
5. There is no effect of decreasing the waiting time and changing the loading and unloading methods between the rides.
Step-by-step explanation:
Performing 2 way ANOVA
Observation A B C
1 41, 43, 49 52, 44, 46 50, 46, 48
2 49, 50, 48 50, 46, 48 48, 44, 46
Row and column sums
A B C Row total (xa)
1 133 142 144 419
2 147 144 138 429
Col total (xb) 280 286 282 848
∑x²=412+432+492+...+482+442+462=40088→(A)
∑x²b/ra =1/3⋅2(280²+286²+282²)
=1/6(78400+81796+79524)
=1/6(239720)
=39953.3333→(B)
∑x²a/rb=1/3⋅3(419²+429²)
=1/9(175561+184041)
=1/9(359602)
=39955.7778→(C)
∑∑x²ab/r=
1/3(133²+142²+144²+147²+144²+138²)
=1/3(17689+20164+20736+21609+20736+19044)
=1/3(119978)
=39992.6667→(C)
(∑x)²/rab
=(848)²/3⋅2⋅3
=719104/18
=39950.2222→(D)
Sum of squares total
SST=∑x²-(∑x)²/n
=(A)-(D)
=40088-39950.2222
=137.7778
Sum of squares between rows
SSA=∑x²a/rb-(∑x)²/n
=(C)-(D)
=39955.7778-39950.2222
=5.5556
Sum of squares between columns
SSB=∑x²b/ra- (∑x)²/n
=(B)-(D)
=39953.3333-39950.2222
=3.1111
Sum of squares between columns
SSAB=∑∑x²ab/r-(∑x)²/n-SSA-SSB
=(B)-(D)-SSA-SSB
=39992.6667-39950.2222-5.5556-3.1111
=33.7778
Sum of squares Error (residual)
SSE=SST-SSA-SSB-SSAB
=137.7778-5.5556-3.1111-33.7778
=95.3333
ANOVA table
Source Sums Degrees Mean Squares
of Variation of Squares of freedom
SS DF MS F p-value
A SSA=5.5556 a-1=1 MSR=5.5556 0.6993 0.4194
B SSB=3.1111 b-1=2 MSC=1.5556 0.1958 0.8247
AB SSAB=33.7778 2 MSAB=16.8889 2.1259 0.1621
Error (residual)SSE=95.33 12 MSE= 7.9444
Total SST=137.7778 17
Conclusion:
1. F for between columns
The critical value F(1,2) at 0.05 level of significance is 4.7472
As calculated FR=0.6993<4.7472
H0 is accepted, there is no significant difference between rows.
P value is 0.4194 > 0.05 we fail to reject H0
2. F for between columns
The critical value F(2,2) at 0.05 level of significance is 3.8853
As calculated FC=0.1958<3.8853
H0 is accepted there is no significant difference between columns.
P value is 0.8247 > 0.05 we fail to reject H0
3. Interaction between the Factors AB
There is not sufficient evidence to support the claim of interaction between factors.
P value is 0.1621 > 0.05 we fail to reject H0