Beispiel #1
0
# measure version 1.8.11s
from measure import sqrt, val, npfarray, pltext, plt, linreg, pi, dev, arccos, cos, curve_fit, nplinspace, deg_to_rad, rad_to_deg

# Daten für Spule
r_h = 0.295 / 2
s_h = 0.147
N_h = 124

N_i = 4000
A_i = 41.7e-4

# Aufgabe 2a
I_2a = 4.00
I_2a_dsys = sqrt(0.02**2 + 0.005**2 + (0.012 * I_2a)**2)
f_2a = npfarray([3.1, 6.1, 8.8, 11.8, 14.9])
f_2a_dsys = npfarray([0.02, 0.10, 0.10, 0.10, 0.10])
Vss_2a = npfarray([0.88, 2.70, 4.80, 7.00, 9.30])
Vss_2a_dsys = npfarray([0.02, 0.05, 0.10, 0.10, 0.10])

Uind_2a = Vss_2a / 2
Uind_2a_dsys = Vss_2a_dsys / 2

pltext.initplot(
    num=1,
    title='Abbildung   : Induktionsspannung als Funktion der Frequenz',
    xlabel='Drehfrequenz in Hz',
    ylabel='Induktionsspannung in V')
[slope_2a, dslope_2a] = linreg(f_2a,
                               Uind_2a,
                               Uind_2a_dsys,
                               f_2a_dsys,
Beispiel #2
0
# measure version 1.9.1s
from measure import npfarray, pltext, plt, sqrt, expreg, val, linreg, tbl, lst, exp, mv, dtot_mv

# Aufgabe 2
ug_5min = 120
ug_5min_err = sqrt(ug_5min)
ug_1s = ug_5min / (5 * 60)
ug_1s_err = ug_5min_err / (5 * 60)

print('\nAufgabe 2:\n')
print(val(ug_1s, ug_1s_err, name='Untergrund / s'))

# Aufgabe 3
t = npfarray(
    [30, 30, 30, 30, 30, 30, 30, 60, 120, 120, 120, 120, 120, 120, 300])
d = npfarray(
    [0, 0.3, 0.6, 0.9, 1.2, 1.5, 1.8, 2.1, 2.4, 2.7, 3.0, 3.3, 3.6, 3.9, 4.9])
N = npfarray(
    [1196, 677, 449, 289, 189, 143, 78, 86, 123, 91, 61, 68, 65, 42, 131])
N_err = sqrt(N)

N_t_ratio = N / t - ug_1s
N_t_ratio_err = sqrt((N_err / t)**2 + ug_1s_err**2)

pltext.initplot(num=1,
                title=r'Abbildung   : Absoprtion $\beta$-Strahlung',
                xlabel='Dicke in mm',
                ylabel='Ereignisse pro Sekunde',
                scale='linlog')
pltext.plotdata(d, N_t_ratio, N_t_ratio_err, label='Messwerte')
pltext.set_layout(xlim=(-0.2, 5.2), ylim=(1e-2, 6e1))
Beispiel #3
0
from measure import sqrt

ms.plt.rc('text', usetex=True)
ms.plt.rc('font', family='serif')

titles = [
    r'Ausgangsspannung $U_A$ in Abhängigkeit der Eingangsgleichspannung $U_E$ für verschiedene Gegenkopplungswiderstände',
    r'Ausgangsspannung $U_A$ in Abhängigkeit der Eingangswechselspannung $U_E$ für verschiedene Gegenkopplungswiderstände',
    r'Verstärkung $V$ in Abhängigkeit der Wechselspannungsfrequenz $f$ für verschiedene Schaltungskonfigurationen'
]

# (1) Dependency of input and output voltage
# DC
R1_G = 48.7 * cs.kilo
R1_E = 3 * cs.kilo
U1_E = npfarray([-250, -190, -120, -60.3, -1.3, 60.7, 120, 250]) * cs.milli / 2
d_U1_E = npfarray([1, 1, 1, 0.2, 0.2, 0.1, 1, 1]) * cs.milli / 2
U1_A = npfarray([4.24, 3.19, 2.11, 1.10, 0.16, -0.85, -1.80, -3.96]) / 2
d_U1_A = npfarray([0.01, 0.01, 0.01, 0.01, 0.01, 0.01, 0.01, 0.01]) / 2

R2_G = 274 * cs.kilo
R2_E = 3 * cs.kilo
U2_E = npfarray([-250, -190, -120, -60.1, -1.5, 80.0, 160, 250]) * cs.milli / 2
d_U2_E = npfarray([1, 1, 1, 0.1, 0.1, 0.1, 1, 1]) * cs.milli / 2
U2_A = npfarray([14.4, 14.4, 10.9, 5.28, 0.82, -6.80, -13.0, -13.0]) / 2
d_U2_A = npfarray([0.1, 0.1, 0.1, 0.01, 0.01, 0.01, 0.1, 0.1]) / 2

# AC
R3_G = 274 * cs.kilo
R3_E = 3 * cs.kilo
U3_G = npfarray([150, 300, 450, 600, 750, 900, 950, 1000]) * cs.milli / 2
Beispiel #4
0
# measure version 1.8.8s
from measure import npfarray,plt,pltext,sqrt,mv,dtot_mv,tbl,lst,sig,dev

# Aufgabe 1
U1g = npfarray([-0.2,-0.15,-0.10,-0.05,0.04,0.08,0.12,0.18])
U1g_dsys = npfarray([3,1,1,1,1,1,1,1])*1e-3
Uag_48k7 = npfarray([3.32,2.60,1.80,1.00,-0.4,-1.0,-1.7,-2.7])
Uag_48k7_dsys = npfarray([50,10,10,10,1,10,100,100])*1e-3
Uag_274k = npfarray([14.6,14.4,9.6,5.0,-3.2,-6.90,-10.8,-12.8])
Uag_274k_dsys = npfarray([0.1,0.1,0.01,0.01,0.01,0.1,0.1,0.1])

U1w = npfarray([1.0,0.852,0.748,0.500,0.300,0.150]) / 10
U1w_dsys = npfarray([10,5,5,5,5,3])*1e-3 / 10
Uaw_274k = npfarray([8.76,7.48,6.46,4.38,2.61,1.28])
Uaw_274k_dsys = npfarray([0.05,0.05,0.03,0.03,0.02,0.02])
Uaw_680k = npfarray([21.9,18.7,16.1,10.8,6.52,3.25])
Uaw_680k_dsys = npfarray([0.1,0.1,0.1,0.1,0.05,0.02])

V_eg_48k7 = -1 * Uag_48k7 / U1g
V_eg_48k7_dsys = 1/abs(U1g) * sqrt(Uag_48k7_dsys**2 + (Uag_48k7 * U1g_dsys / U1g)**2)
V_eg_48k7_mv = mv(V_eg_48k7)
V_eg_48k7_mv_dtot = dtot_mv(V_eg_48k7,V_eg_48k7_dsys)

V_eg_274k = -1 * Uag_274k / U1g
V_eg_274k_dsys = 1/abs(U1g) * sqrt(Uag_274k_dsys**2 + (Uag_274k * U1g_dsys / U1g)**2)
V_eg_274k_mv = mv(V_eg_274k)
V_eg_274k_mv_dtot = dtot_mv(V_eg_274k,V_eg_274k_dsys)

V_ew_274k = Uaw_274k / U1w
V_ew_274k_dsys = 1/U1w * sqrt(Uaw_274k_dsys**2 + (Uaw_274k * U1w_dsys / U1w)**2)
V_ew_274k_mv = mv(V_ew_274k)
Beispiel #5
0
# measure version 1.8.2
from measure import np, plt, pltext, npfarray, curve_fit, mv, dsys_mv, dsto_mv, dtot, dsto, val, sqrt, pi, kB, sig, T0
from scipy.stats import norm

# Messwerte
t = npfarray([
    2.001, 3.001, 4.001, 5.002, 6.002, 7.003, 8.003, 9.105, 10.105, 11.106,
    12.106, 13.107, 14.107, 15.208, 16.208, 17.309, 18.309, 19.41, 20.41,
    21.511, 22.511, 23.612, 24.612, 25.712, 26.714, 27.814, 28.815, 29.915,
    30.916, 32.016, 33.017, 34.117, 35.118, 36.218, 37.219, 38.319, 39.32,
    40.42, 41.421, 42.521, 43.522, 44.623, 45.624, 46.724, 47.725, 48.825,
    49.826, 50.926, 51.927, 53.027, 54.028, 55.128, 56.129, 57.229, 58.23,
    59.33, 60.331, 61.432, 62.433, 63.533, 64.534, 65.634, 66.635, 67.735,
    68.736, 69.836, 70.837, 71.937, 72.938, 74.038, 75.039, 76.139, 77.14,
    78.24, 79.242, 80.342, 81.343, 82.443, 83.444, 84.544, 85.545, 86.645,
    87.646, 88.746, 89.747, 90.847, 91.847, 92.948, 93.948, 95.048, 96.049,
    97.151, 98.151, 99.252, 100.252, 101.253, 102.253, 103.254, 104.254,
    105.255, 106.255, 107.256, 108.256, 109.256, 110.257, 111.257, 112.258,
    113.258, 114.26, 115.26, 116.261, 117.261, 118.262, 119.262, 120.363,
    121.363, 122.464, 123.464, 124.565, 125.565, 126.666, 127.666, 128.767,
    129.767, 130.868, 131.869, 132.97, 133.97, 135.071, 136.071, 137.172,
    138.172, 139.273, 140.273, 141.374, 142.374, 143.475, 144.475, 145.576,
    146.576, 147.676, 148.677, 149.779, 150.779, 151.88, 152.88, 153.981,
    154.981, 156.081, 157.082, 158.182, 159.183, 160.283, 161.284, 162.384,
    163.385, 164.485, 165.486, 166.587, 167.588, 168.688, 169.689, 170.789,
    171.79, 172.89, 173.891, 174.991, 175.992, 177.089
])
x = 1e-6 * npfarray([
    59.849, 59.304, 59.576, 59.122, 59.394, 58.667, 58.213, 57.667, 58.122,
    58.758, 58.849, 57.394, 57.122, 56.485, 57.485, 57.576, 57.667, 57.304,
    55.849, 56.031, 56.031, 56.758, 56.485, 55.667, 55.576, 55.667, 55.485,
    56.213, 57.394, 57.667, 58.758, 60.122, 60.304, 59.031, 58.304, 57.031,
Beispiel #6
0
# measure version 1.8.4
from measure import npfarray, np, exp, sqrt, ln, mv, dsto_mv, dsys_mv, dtot, val, tbl, lst, T0, p0, plt, pltext, linreg, sig, curve_fit

# Messwerte
wl_sa = npfarray([-36, 0, 200, 404, 706]) * 1e-6
wl_sa_dsys = npfarray([10, 10, 10, 10, 10]) * 1e-6
wl_se = npfarray([2930, 2951, 3155, 3370, 3677]) * 1e-6
wl_se_dsys = npfarray([10, 10, 10, 10, 10]) * 1e-6
wl_m = npfarray([11165, 11136, 11134, 11163, 11170])
wl_m_dsys = npfarray([2, 2, 2, 2, 2])
wl_lit = 532e-9
wl_lit_dsys = 1e-9

bi_T = mv([23.3, 23.4]) + T0
bi_T_dtot = sqrt(2) * 0.1
bi_a = 50e-3
bi_a_dsys = 0.05e-3
bi_m1 = npfarray([0, 5, 10, 15, 20, 25, 30, 35])
bi_m2 = npfarray([0, 5, 10, 15, 20, 25, 30, 35])
bi_m3 = npfarray([0, 5, 10, 15, 20, 25, 30, 35])
bi_p1 = npfarray([540, 470, 395, 320, 245, 175, 100, 25]) * 101325 / 760
bi_p1_dsys = npfarray([5, 5, 5, 5, 5, 5, 5, 5]) * 101325 / 760
bi_p2 = npfarray([700, 625, 555, 480, 410, 340, 265, 190]) * 101325 / 760
bi_p2_dsys = npfarray([5, 5, 5, 5, 5, 5, 5, 5]) * 101325 / 760
bi_p3 = npfarray([630, 550, 485, 410, 335, 265, 190, 115]) * 101325 / 760
bi_p3_dsys = npfarray([5, 5, 5, 5, 5, 5, 5, 5]) * 101325 / 760
bi_n0_lit = 1.00028

kl_t = npfarray([
    -2.9599994e-02, -2.9399995e-02, -2.9199995e-02, -2.8999995e-02,
    -2.8799992e-02, -2.8599992e-02, -2.8399993e-02, -2.8199993e-02,
Beispiel #7
0
    tbl([['Peak:', ' A', ' mu', ' sig', ' Ug', ' FWHM', ' l', ' Abw'],
         lst([*p_opt_kb1o, fwhm_kb1o, l_kb1o],
             [*p_err_kb1o, fwhm_kb1o_err, l_kb1o_err], 'kb1o') +
         [dev(l_kb1o, l_kb1o_err, l_kb_lit, perc=True)],
         lst([*p_opt_ka1o, fwhm_ka1o, l_ka1o],
             [*p_err_ka1o, fwhm_ka1o_err, l_ka1o_err], 'ka1o') +
         [dev(l_ka1o, l_ka1o_err, l_ka_lit, perc=True)],
         lst([*p_opt_kb2o, fwhm_kb2o, l_kb2o],
             [*p_err_kb2o, fwhm_kb2o_err, l_kb2o_err], 'kb2o') +
         [dev(l_kb2o, l_kb2o_err, l_kb_lit, perc=True)],
         lst([*p_opt_ka2o, fwhm_ka2o, l_ka2o],
             [*p_err_ka2o, fwhm_ka2o_err, l_ka2o_err], 'ka2o') +
         [dev(l_ka2o, l_ka2o_err, l_ka_lit, perc=True)]]))

# Aufgabe 1c
U = npfarray([20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30, 31, 32, 33, 34, 35])
rate = npfarray([
    1.00, 1.90, 2.25, 8.00, 37.55, 72.20, 104.0, 134.4, 160.2, 180.5, 212.5,
    245.6, 264.6, 284.8, 314.1, 339.1
])
rate_err = sqrt(rate)

pltext.initplot(num=5,
                title='Abbildung   : Zählrate als Funktion der Spannung (LiF)',
                xlabel='Spannung in kV',
                ylabel='Zählrate in 1/s')
pltext.plotdata(U, rate, rate_err, label='Messwerte')
[slope, slope_err, yitc, yitc_err] = linreg(U[3:],
                                            rate[3:],
                                            rate_err[3:],
                                            plot=True,
Beispiel #8
0
# measure version 1.8.7
from measure import npfarray, sqrt, ln, exp, arctan, lst, tbl, sig, val, mv, dsto_mv, dsys_mv, dtot_mv, plt, pltext, expreg, pi, curve_fit

# Aufgabe 1
R_A1 = npfarray([1, 10, 1]) * 1e3
R_A1_dsys = 0.05 * R_A1
C_A1 = npfarray([470, 4.7, 47]) * 1e-9
C_A1_dsys = 0.10 * C_A1
g_thalb = npfarray([312, 32.6, 32.6]) * 1e-6
g_thalb_dsys = npfarray([4, 0.6, 0.6]) * 1e-6

tau = R_A1 * C_A1
tau_dsys = sqrt((R_A1 * C_A1_dsys)**2 + (R_A1_dsys * C_A1)**2)
b_thalb = ln(2) * tau
b_thalb_dsys = ln(2) * tau_dsys

print()
print('Aufgabe 1:\n')
print(
    tbl([
        lst(R_A1, R_A1_dsys, 'R'),
        lst(C_A1, C_A1_dsys, 'C'),
        lst(tau, tau_dsys, 'Tau')
    ]))
print(
    tbl([
        lst(b_thalb, b_thalb_dsys, 'T_1/2 (b)'),
        lst(g_thalb, g_thalb_dsys, 'T_1/2 (g)'), ['Abw'] + [
            sig('', b_thalb[i], b_thalb_dsys[i], g_thalb[i], g_thalb_dsys[i])
            for i in range(len(b_thalb))
        ]
Beispiel #9
0
# measure version 1.8.4
from measure import plt, pltext, np, npfarray, linreg, sqrt, val, curve_fit

laser = 635e-9
schirmabstand = 1

# Eichung
links = npfarray([554.48, 584.99, 616.35, 644.31, 677.36])
rechts = npfarray([446.01, 413.80, 383.30, 355.33, 322.28])
diff = links - rechts
diff_err = sqrt(2) * 3 * diff / diff
sbreite = 2e-3 / 100 * npfarray([43, 70, 90, 104, 132])
sbreite_err = 1e-3 / 100 * sbreite / sbreite
pltext.initplot(num=0, title='Eichung', xlabel='Pixel', ylabel='Meter')
[mpp, dmpp, itc, ditc] = linreg(x=diff,
                                y=sbreite,
                                dx=diff_err,
                                dy=sbreite_err,
                                plot=True)
print()
print(val('Meter pro Pixel', mpp, dmpp))

# Einzelspaltbreite
lage_es_hmax = 499.79
lage_es_min = (npfarray([529.91, 561.26, 590.92, 623.13, 653.63]) -
               lage_es_hmax) * mpp
lage_es_max = (lage_es_hmax -
               npfarray([456.82, 424.68, 394.69, 363.78, 333.80])) * mpp
lage_es_d = npfarray([3, 3, 3, 3, 3]) * mpp
n_es = npfarray([1, 2, 3, 4, 5])
Beispiel #10
0
import numpy as np
import scipy.constants as cs

from measure import npfarray as npfarray
from measure import pi
from measure import sqrt, sin, cos, tan, exp, ln

ms.plt.rc('text', usetex=True)
ms.plt.rc('font', family='serif')

titles = [
  r'Phasenverschiebung $\varphi$ eines Hochpassfilters ($C = 47$ nF, $R = 1$ k$\Omega$) in Abhängigkeit der Frequenz $f$.'
]

# (1) Determination of the response time of a RC-element
C1 = npfarray([470, 4.7, 47]) * cs.nano
d_C1 = 0.10 * C1
R1 = npfarray([1, 10, 1]) * cs.kilo
d_R1 = 0.05 * R1
T1_12 = npfarray([0.32, 0.04, 0.04]) * cs.milli
d_T1_12 = npfarray([0.03, 0.01, 0.01]) * cs.milli
f1 = npfarray([110, 600, 600])
U1_pp = npfarray([0.95, 0.95, 0.95])
d_U1_pp = npfarray([0.02, 0.02, 0.02])

tau1_O = T1_12 / ln(2)
d_tau1_O = d_T1_12 / ln(2)
tau1_T = R1 * C1
d_tau1_T = tau1_T * sqrt((d_R1 / R1)**2 + (d_C1 / C1)**2)

print()
Beispiel #11
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# measure version 1.8.6
from measure import plt, np, npfarray, sqrt, pltext, curve_fit, val, c, h, sig

Z = npfarray([26, 42, 29, 22, 47, 40, 30, 28])

# Literaturwerte
sqrt_Er_lit = sqrt(13.6e-3)
sig12_lit = 1
p0 = npfarray([sqrt_Er_lit, sig12_lit])

print()
print(val('Literaturwert sqrt(Er)', sqrt_Er_lit))

# K_alpha
K_alpha = npfarray([6.42, 17.47, 8.08, 4.49, 21.90, 15.79, 8.68, 7.51])
Delta_K_alpha = npfarray([0.16, 0.17, 0.15, 0.16, 0.20, 0.17, 0.16, 0.15])
sqrt_K_alpha = sqrt(K_alpha)
Delta_sqrt_K_alpha = 1 / 2 * 1 / sqrt(K_alpha) * Delta_K_alpha

pltext.initplot(num=1,
                title=r'$\sqrt{E_\alpha}$ als Funktion von $Z$',
                xlabel=r'$Z$',
                ylabel=r'$\sqrt{E_\alpha}$ in $\sqrt{keV}$')
pltext.plotdata(x=Z, y=sqrt_K_alpha, dy=Delta_sqrt_K_alpha)

n1 = 1
n2 = 2


def fit_func_alpha(x, sqrt_Er, sig12):
    return sqrt_Er * (x - sig12) * sqrt(1 / n1**2 - 1 / n2**2)
Beispiel #12
0
roh_w_dsys = 1.0

U_mot = 24.0
U_mot_dsys = 0.1
I_mot = 2.3
I_mot_dsys = 0.1

km_U_heiz = 5.58
km_U_heiz_dsys = 0.04
km_I_heiz = 1.14 * 5
km_I_heiz_dsys = 0.02 * 5
km_f = 325.2 / 60.
km_f_dsys = 0.1 / 60.
km_dT = 22.1 - 18.65
km_dT_dsys = sqrt(0.25**2 + 0.1**2)
km_Vps = npfarray([199.5,198.4,200.7,200.1,200.5]) / 6e7
km_Vps_mv = mv(km_Vps)
km_Vps_dsys = dsto_mv(km_Vps)

gf_t = 180.
gf_t_dsys = 15.
gf_V = 1e-6
gf_V_dsys = 0.5e-6
gf_f = 306.5 / 60.
gf_f_dsys = 0.1 / 60.

wk_l = 0.250
wk_l_dsys = 0.005
wk_Vps = 199.0 / 6e7
wk_Vps_dsys = 1.5 / 6e7
wk_dT = 26.3 - 19.0
Beispiel #13
0
# measure version 1.7.1
from measure import npfarray, sqrt, mv, dsto_mv, dsys_mv, val, sig, tbl

# values
cd_h1r = npfarray([0.610, 0.626, 0.569, 0.630, 0.570])
cd_h1l = npfarray([0.489, 0.471, 0.530, 0.467, 0.529])
cd_h3r = npfarray([0.565, 0.569, 0.553, 0.570, 0.556])
cd_h3l = npfarray([0.533, 0.530, 0.545, 0.529, 0.544])
cd_hix_dsys = npfarray([1e-3 for i in range(5)])

rh_50T_air = 50.04
rh_50T_arg = 46.57
rh_50T_dsys = 0.3
rh_V_air = 5370e-6
rh_V_arg = 5460e-6
rh_V_dsys = 5e-6
rh_m_air = 26.116e-3
rh_m_arg = 26.006e-3
rh_m_dsys = 0.002e-3
rh_2r_air = 15.95e-3
rh_2r_arg = 15.97e-3
rh_2r_dsys = 0.02e-3
rh_p = 994.15e2
rh_p_dsys = 0.15e2

k_air_lit = 0.78 * 1.401 + 0.21 * 1.398 + 0.01 * 1.648
k_arg_lit = 1.648

# Clément & Desormes
h1 = cd_h1r - cd_h1l
h3 = cd_h3r - cd_h3l
Beispiel #14
0
# measure version 1.8.12s
from measure import plt, pltext, npfarray, linreg, sqrt, val, dev, exp, pi, spcurvefit, nplinspace, tbl
from numpy import loadtxt
from scipy.special import gamma

# Aufgabe 2
U = npfarray([420, 445, 470, 495, 520, 545, 570])
N = npfarray([1887, 2330, 2337, 2359, 2407, 2374, 2310])
N_dsto = sqrt(N)

pltext.initplot(num=1,
                title='Abbildung   : Zählrohrcharakteristik',
                xlabel='Spannung in V',
                ylabel='Ereignisse')
pltext.plotdata(U, N, N_dsto, label='Messwerte')
[slope, dslope] = linreg(U[1:],
                         N[1:],
                         N_dsto[1:],
                         plot=True,
                         prange=(410, 580))[0:2]
pltext.set_layout(xlim=(410, 580), ylim=(1800, 2500))

U0 = 510

print('\nAufgabe 2\n')
print(val(slope, dslope, name='Steigung'))

# Aufgabe 3
U = [510, 610]
N1min = npfarray([9838, 9871])
N1min_dsto = sqrt(N1min)
Beispiel #15
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pltext.plotdata(f[17:-45], g[17:-45], label='Messwerte')
f_array = nplinspace(4e2, 1.2e5)
plt.plot(f_array, fitfunc(f_array, *popt), label='Fit')
pltext.set_layout(legend=True, xlim=(4e2, 1.2e5), ylim=(1e1, 2e3))


def fitfuncsquare(f, V, W1, W2, n1, n2):
    return fitfunc(f, V, W1, W2, n1, n2)**2


B = integrate.quad(fitfuncsquare, f[17], f[-45], args=tuple(popt))[0]
B_dsys = 0.02 * B

print(val(B, B_dsys, name='Integral'))

R = npfarray([5, 10, 15, 20, 25, 30]) * 1e3
R_dsys = 0.005 * R
U_aus = npfarray([2.4146, 3.1253, 3.7027, 4.2104, 4.6677, 5.0843]) * 1e-3
U_aus_err = npfarray([0.00961, 0.0113, 0.0135, 0.0165, 0.0182, 0.0190]) * 1e-3
U_V = 1.3841 * 1e-3
U_V_err = 0.00524 * 1e-3
D = U_aus**2 - U_V**2
D_err = 2 * sqrt((U_aus * U_aus_err)**2 + (U_V * U_V_err)**2)


def linear(x, c):
    return c * x


popt, pcov = curve_fit(linear, R, D, sigma=D_err)