GPT Lösung der Fördererberechnung hinzugefügt

This commit is contained in:
Simon Schmutzler
2024-05-27 17:46:46 +02:00
parent e50b9d2248
commit 2b2c3229bb
@@ -89,3 +89,46 @@ $$
$$
{tan(\alpha_F)} \geq {\frac{H_1 - H_0}{L_1}}
$$
///
C-GPT
# Bekannte Werte:
L1, H0, H1, alpha_F, alpha_S, H_SEA, L_SEA, H_FEA, L_FEA
# Gesucht:
# L_F, L_S, ΔH_F, ΔH_S, (→ H_Max)
# Beziehungen:
# [1] (ΔH_F - H_FEA) / (L_F - L_FEA) = tan(alpha_F)
# [1.2] ΔH_F = tan(alpha_F) * (L_F - L_FEA) + H_FEA
# [2] (ΔH_S - H_SEA) / (L_S - L_SEA) = tan(alpha_S)
# [2.2] ΔH_S = tan(alpha_S) * (L_S - L_SEA) + H_SEA
# [4] H_0 + ΔH_F = H_1 + ΔH_S
# [4.2] ΔH_F = H_1 - H_0 + ΔH_S
# [5] L_1 = L_F + L_S
# [6] L_1 = L_F * x_Verhältnis
# Umstellen der Gleichungen für ΔH_F und ΔH_S:
ΔH_F = tan(alpha_F) * (L_F - L_FEA) + H_FEA
ΔH_S = tan(alpha_S) * (L_S - L_SEA) + H_SEA
# Einsetzen von L_S = L_1 - L_F:
tan(alpha_F) * (L_F - L_FEA) + H_FEA = H_1 - H_0 + (tan(alpha_S) * ((L_1 - L_F) - L_SEA) + H_SEA)
# Auflösen nach L_F:
tan(alpha_F) * L_F - tan(alpha_F) * L_FEA + H_FEA = H_1 - H_0 + tan(alpha_S) * L_1 - tan(alpha_S) * L_F - tan(alpha_S) * L_SEA + H_SEA
# Gruppieren der Terme:
tan(alpha_F) * L_F + tan(alpha_S) * L_F = tan(alpha_S) * L_1 + H_1 - H_0 - tan(alpha_F) * L_FEA - H_FEA + tan(alpha_S) * L_SEA - H_SEA
# L_F isolieren:
L_F = (tan(alpha_S) * L_1 + H_1 - H_0 - tan(alpha_F) * L_FEA - H_FEA + tan(alpha_S) * L_SEA - H_SEA) / (tan(alpha_F) + tan(alpha_S))
# Berechnung von x_Verhältnis:
x_Verhältnis = L_F / L_1
x_Verhältnis = (tan(alpha_S) + (H_1 - H_0 - tan(alpha_F) * L_FEA - H_FEA + tan(alpha_S) * L_SEA - H_SEA) / L_1) / (tan(alpha_F) + tan(alpha_S))
# Vereinfachte Formel für x_Verhältnis:
x_Verhältnis = (tan(alpha_S) + ((H_1 - H_0) - tan(alpha_F) * L_FEA - H_FEA + tan(alpha_S) * L_SEA - H_SEA) / L_1) / (tan(alpha_F) + tan(alpha_S))