Universidad Católica Boliviana "San Pablo"

n T (años) I (mm/hr) D (min) Y = log i X1 =Log T X2 = Log D Y*X1 Y*X2 X1*X2 X1^2 X2^2 1 2 120.643 30 2.082 0.30 1.48 0.63 3.07 0.44 0.09 2.18 2 5 140.311 30 2.147 0.70 1.48 1.50 3.17 1.03 0.49 2.18 3 10 159.357 30 2.202 1.00 1.48 2.20 3.25 1.48 1.00 2.18 4 25 186.668 30 2.271 1.40 1.48 3.17 3.35 2.06 1.95 2.18 5 50 208.368 30 2.319 1.70 1.48 3.94 3.43 2.51 2.89 2.18 6 2 75.889 60 1.880 0.30 1.78 0.57 3.34 0.54 0.09 3.16 7 5 90.742 60 1.958 0.70 1.78 1.37 3.48 1.24 0.49 3.16 8 10 98.455 60 1.993 1.00 1.78 1.99 3.54 1.78 1.00 3.16 9 25 116.756 60 2.067 1.40 1.78 2.89 3.68 2.49 1.95 3.16 10 50 122.943 60 2.090 1.70 1.78 3.55 3.72 3.02 2.89 3.16 11 2 48.354 120 1.684 0.30 2.08 0.51 3.50 0.63 0.09 4.32 12 5 55.423 120 1.744 0.70 2.08 1.22 3.63 1.45 0.49 4.32 13 10 59.564 120 1.775 1.00 2.08 1.77 3.69 2.08 1.00 4.32 14 25 68.210 120 1.834 1.40 2.08 2.56 3.81 2.91 1.95 4.32 15 50 78.436 120 1.895 1.70 2.08 3.22 3.94 3.53 2.89 4.32 16 2 25.064 240 1.399 0.30 2.38 0.42 3.33 0.72 0.09 5.67 17 5 28.641 240 1.457 0.70 2.38 1.02 3.47 1.66 0.49 5.67 18 10 30.105 240 1.479 1.00 2.38 1.48 3.52 2.38 1.00 5.67 19 25 33.557 240 1.526 1.40 2.38 2.13 3.63 3.33 1.95 5.67 20 50 36.974 240 1.568 1.70 2.38 2.66 3.73 4.04 2.89 5.67 21 2 15.000 360 1.176 0.30 2.56 0.35 3.01 0.77 0.09 6.53 22 5 18.258 360 1.261 0.70 2.56 0.88 3.22 1.79 0.49 6.53 23 10 19.984 360 1.301 1.00 2.56 1.30 3.32 2.56 1.00 6.53 24 25 21.164 360 1.326 1.40 2.56 1.85 3.39 3.57 1.95 6.53 25 50 24.340 360 1.386 1.70 2.56 2.36 3.54 4.34 2.89 6.53 26 2 11.976 720 1.078 0.30 2.86 0.32 3.08 0.86 0.09 8.16 27 5 12.649 720 1.102 0.70 2.86 0.77 3.15 2.00 0.49 8.16 28 10 15.613 720 1.193 1.00 2.86 1.19 3.41 2.86 1.00 8.16 29 25 16.984 720 1.230 1.40 2.86 1.72 3.51 3.99 1.95 8.16 30 50 18.668 720 1.271 1.70 2.86 2.16 3.63 4.85 2.89 8.16 Y = log i X1 =Log T X2 = Log D Y*X1 Y*X2 X1*X2 X1^2 X2^2 49.69 30.581 65.641 51.723 103.57 66.914 38.519 150.156 ∑Sumatoria = Aplicando leyes Logaritmicas y Métodos matriciales 6 Valores de duración para 5 tiempos de retorno en total 6x5=30 valores. Determinar una sola ecuación que reemplaza a las curvas IDF = + ∙ + ∙ ( ) = = = 1 = 2 = ( ) = − UNIVERSIDAD CATOLICA "SAN PABLO" ________________________________________________________________________________________________________________ ANEXOS JOHN DEYBI CHINO CONDORI _________________________________________________________________________________________________________________ 13