User Guide
Page 129
Example 14: To compare the correlation coefficient for logarithmic, e exponential, ab exponential, power, and inverse regression. (FREQ: OFF) 17(S-MENU)1(Type) cccE(In X)A STAT 17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT ccccE(e^X)A 17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT cccccE(A•B^X) A17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT ccccccE(A•X^B) A17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT cccccccE(1/X) A17(S-MENU)7(Reg) 3(r)E E-127 Comparison of Regression Curves • The following example uses the data input in Example 7 (page E-119).
Example 14: To compare the correlation coefficient for logarithmic, e exponential, ab exponential, power, and inverse regression. (FREQ: OFF) 17(S-MENU)1(Type) cccE(In X)A STAT 17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT ccccE(e^X)A 17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT cccccE(A•B^X) A17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT ccccccE(A•X^B) A17(S-MENU)7(Reg) 3(r)E 17(S-MENU)1(Type) STAT cccccccE(1/X) A17(S-MENU)7(Reg) 3(r)E E-127 Comparison of Regression Curves • The following example uses the data input in Example 7 (page E-119).