data
horizontal | anamoly |
0.1 | -1.45 |
0.2 | -1.36 |
0.3 | -1.27 |
0.4 | -1.17 |
0.5 | -1.07 |
0.6 | -0.96 |
0.7 | -0.85 |
0.8 | -0.74 |
0.9 | -0.64 |
1 | -0.56 |
1.1 | -0.49 |
1.2 | -0.44 |
1.3 | -0.4 |
1.4 | -0.36 |
1.5 | -0.32 |
1.6 | -0.27 |
1.7 | -0.22 |
1.8 | -0.16 |
1.9 | -0.1 |
2 | -0.03 |
result from regression
SUMMARY OUTPUT | ||||||
Regression Statistics | ||||||
Multiple R | 0.98432299 | |||||
R Square | 0.968891748 | |||||
Adjusted R Square | 0.967163512 | |||||
Standard Error | 0.080054232 | |||||
Observations | 20 | |||||
ANOVA | ||||||
df | SS | MS | F | Significance F | ||
Regression | 1 | 3.592863759 | 3.592863759 | 560.6246123 | 5.13243E-15 | |
Residual | 18 | 0.115356241 | 0.00640868 | |||
Total | 19 | 3.70822 | ||||
Coefficients | Standard Error | t Stat | P-value | Lower 95% | Upper 95% | |
Intercept | -1.414789474 | 0.037187709 | -38.04454527 | 1.18732E-18 | -1.492917951 | -1.336660996 |
horizontal | 0.735037594 | 0.0310437 | 23.6775128 | 5.13243E-15 | 0.669817201 | 0.800257987 |
y^= -1.4148 + 0.7350 *x
when x = 0.75
y^= -1.4148 + 0.7350 *0.75
= -0.8635
residual
= yi - y^
= (-0.85 - 0.74)/2 - (-0.8635)
= 0.0685
Please answer what’s required from the following question correctly. The curve in the following diagram represents...
Please answer what’s required from the following question correctly. Prepare a drift curve for the following data and make drift corrections. Convert your corrected data to milliGals. The data were collected by a gravimeter with a dial constant of 0.0869 mGal/dial division. Station Base GNI GN2 GN3 GN4 Base me 11:20 11:42 12:14 12:37 12:59 13:10 Reading in Dial Divisions 762.71 774.16 759.72 768.95 771.02 761.18