KAP 1
22.26/0.05 * (0.000615^4)/(0.011^2)*997*9.81/(8*0.23)*(0.49 - 0.05/2) 
.00130097677051948961
( .00130097677051948961 - .000954 )/0.000954 * 100
36.37073066242029454900

sqrt( ( 4*0.00002/0.00123)^2 + (0.0005/0.230)^2 + (4*0.0001/0.022)^2 + (0.0005/0.05)^2 + (0.5/22.26)^2)
.07190357254600184140


KAP 2
6.6/0.05 * (0.00088^4)/(0.011^2)*997*9.81/(8*0.231)*(0.49 - 0.05/2) 
.00161003160444342857
(.00161003160444342857 - .000954 )/0.000954 * 100
68.76641556010781656100

sqrt( ( 4*0.00002/0.00176)^2 + (0.0005/0.231)^2 + (4*0.0001/0.022)^2 + (0.0005/0.05)^2 + (0.5/6.6)^2)
.09077769312535430204


KAP 3
73.83/0.05 * (0.0004385^4)/(0.011^2)*997*9.81/(8*0.231)*(0.49 - 0.05/2) 
.00111037836993134163
(.00111037836993134163 - .000954 )/0.000954 * 100
16.39186267624126100600

sqrt( ( 4*0.00002/0.000877)^2 + (0.0005/0.235)^2 + (4*0.0001/0.022)^2 + (0.0005/0.05)^2 + (0.5/73.83)^2)
.09381935075851633295


Integral Kap 3
1/(-0.00146677) * 997 * -9.81 * (0.0004385^4)/(0.011^2) /(8*0.235)
.00108377037453872867
(.00108377037453872867 - .000954 )/0.000954 * 100
13.60276462670111844800

sqrt( ( 4*0.00002/0.000877)^2 + ((1.7*10^-6)/-0.00146677)^2 + (0.0005/0.235)^2 + (4*0.0001/0.022)^2)
.09304595440831108273
-> 9.3% relativer Fehler
