Бақылау сұрақтары:
1. Сызықтық теңдеулер жүйесінің жалғыз шешімінің болуының жеткілікті және қажетті шарты?
2. Кері матрицаның анықтамасы?
3. Бірлік матрица дегеніміз не?
4. Сызықтық теңдеулер жүйесін есептеудің негізгі әдістері?
5. Якоби, Зейдель итерациондық әдістер?
6. Якоби, Зейдель итерациондық әдістерінің жинақталуының жеткілікті шарты.
Практикалық жұмыс №8
Тақырыбы: Интерполяция есебінің математикалық қойылымы. Шеткі айырымдар мен олардың қасиеттері. Лагранж интерполяциялық көпмүшесі. Лагранж интерполяциялық формуласының ауытқу шамасы.
Мақсаты: Лагранж интерполяциялық формуласын қолданып есеп шығарып үйрету.
Формуласы:
Бір келкі қадаммен берілген Лагранж интерполяциялық формуласы егер
H=xi+1-xi t=(x-x0)/h; Ci=(-1)n-I i! (n-i)! Пn+1(t)=t(t-1)(t-2)…(t-n) болса, онда
мынадай формуламен есептелінеді.
Мысалы:
Егер
Хi
|
0,101
|
0,106
|
0,111
|
0,116
|
0,121
|
0,126
|
Yi
|
1,26183
|
1,27644
|
1,29122
|
1,30617
|
1,3213
|
1,3266
|
берілсе, онда х=0,1157 мәнінде у(х) функциясының жуық мәнін табыңыз.
Есептелуін Microsoft Excel программасы арқылы жүзеге асыруға болады. Ол үшін Microsoft Excel қосыңыз да.
мынадай етіп толтырыңыз.
Алдымен h ты есептеу үшін B10 ұяшығына =B3-B2 формуласын енгізіңіз.
t ты есептеу үшін B11 ұяшығына (B9-B2)/B10 формуласын енгізіңіз.
Енді t-i бағанасын толтыру үшін D2 ұяшығына барып =2,94-A2 жазасыз да D 3тен D7ге дейін осы формуланы сәйкес көшіресіз.
Сi бағанасын толтыру үшін Е2 ұяшығына барып =СТЕПЕНЬ(-1;5-A2)*ФАКТР(A2)*ФАКТР(5-A2)
жазасыз да Е3тен Е7 ге дейін осы формуланы сәйкес көшіресіз.
(t-i) Сi бағанасын толтыру үшін F2 ұяшығына барып =(2,94-A2)*E2 жазасыз да F3тен F7ге дейін формуланы сәйкес көшіресіз.
Уi /(t-i) Сi бағанасын толтыру үшін G2 ұяшығына барып =C2/F2 жазасыз да G3тен G7ге дейін осы формулан сәйкес көшіресіз.
P есептеу үшін B12 ұяшығына =D2*D3*D4*D5*D6*D7 формуласын енгізіңіз.
Summ есептеу үшін B13 ұяшығына =СУММ(G2:G7) формуласын енгізіңіз.
Cоңында F функциясын ес ептеу үшін В14 ұяшығына =B12*B13формуласын енгізесіз.
Сонда алдыңызға мынадай есептеулер шығады.
Демек х=0,1157 мәнінде F(x) у(х) функциясының жуық мәні 1,30524 болады.
у(0,1157) F(0,1157) 1,30524
Өздік жұмысы:
Лагранж интерполяционды көпмүшесі арқылы, функция таблицаның тең емес тұрған түйіндерінде берілген кезде функцияның жуық мәнін табыңыз.
1. Х=0,715
х
|
у
|
0,68
|
0,80866
|
0,73
|
0,89492
|
0,8
|
1,02964
|
0,88
|
1,20966
|
0,93
|
1,34087
|
0,99
|
1,52368
|
2. Х=0,186
х
|
у
|
0,11
|
9,05421
|
0,15
|
6,61659
|
0,21
|
4,69170
|
0,29
|
3,35106
|
0,35
|
2,73951
|
0,40
|
2,36522
|
3. Х=0,2244
х
|
у
|
0,210
|
4,83170
|
0,215
|
4,72261
|
0,220
|
4,61855
|
0,225
|
4,51919
|
0,230
|
4,42422
|
0,235
|
4,33337
|
4. Х=1,4315
х
|
у
|
1,415
|
0,888551
|
1,420
|
0,889599
|
1,425
|
0,890637
|
1,430
|
0,891667
|
1,435
|
0,892687
|
1,440
|
0,893698
|
Бақылау сұрақтары:
1. Түйіндер және тор.
2. Локалды және глобалды интерполяция, экстраполяция.
3. Сызықтық және квадраттық интерполяция дегеніміз не?
4. Сызықтық және квадраттық интерполяция кезінде туындының мінез-құлқы.
Практикалық жұмыс №9
Тақырыбы: Бір келкі түйіндер үшін бірінші Ньютон интерполяциялық формуласы. Екінші Ньютон интерполяциялық формуласы. Ньютон интерполяциялық формуласының қателіктерін бағалау.
Мақсаты: Ньютон интерполяциялық формулаларын қолданып есеп шығарып үйрену.
Формуласы:
Бір келкі қадаммен берілген Ньютон интерполяциялық формуласы алдыға қарай
H=xi+1-xi q =(x-x0)/h
Бір келкі қадаммен берілген Ньютон интерполяциялық формуласы арnқа қарай
мынадай формуламен есептелінеді. Мұндағы
H=xi+1-xi q =(x-xn)/h;
Мысалы:
Егер
Х
|
1,215
|
1,22
|
1,225
|
1,23
|
1,235
|
1,24
|
1,245
|
1,25
|
1,255
|
1,26
|
У
|
0,106044
|
0,113276
|
0,119671
|
0,125324
|
0,130328
|
0,134776
|
0,138759
|
0,142367
|
0,145688
|
0,148809
|
берілсе, онда х=1,2273 мәнінде у(х) функциясының жуық мәнін табыңыз.
Есептелуін Microsoft Excel программасы арқылы жүзеге асыруға болады. Ол үшін Microsoft Excel қосыңыз да.
мынадай етіп толтырыңыз.
Қажетті формулалар енгізген соң формулаларды енгізесіз. Сонда алдыңызға мынадай есептеулер шығады.
Демек х=1,2273 мәнінде F(x) у(х) функциясының жуық мәні 0,122358 болады.
у(1,2273) F(1,2273) 0,122358
Өздік жұмысы:
Ньютонның бірінші интерполяционды формуласын қолданып функция мәнін есептеңіз.
Х
|
У
|
0,45
|
20,1946
|
0,46
|
19,6133
|
0,47
|
18,9425
|
0,48
|
18,1746
|
0,49
|
17,3010
|
0,50
|
16,3123
|
Х 1=0,4675; Х 2=0,4423;
Ньютонның бірінші интерполяционды формуласын қолданып функция мәнін есептеңіз.
Х
|
У
|
0,45
|
20,1946
|
0,46
|
19,6133
|
0,47
|
18,9425
|
0,48
|
18,1746
|
0,49
|
17,3010
|
0,50
|
16,3123
|
Х 1=0,4732; Х 2=0,445;
Ньютонның екінші интерполяционды формуласын қолданып функция мәнін есептеңіз.
Х
|
У
|
0,51
|
15,1984
|
0,52
|
13,9484
|
0,53
|
12,5508
|
0,54
|
10,9937
|
0,55
|
9,2647
|
0,56
|
7,3510
|
Х 1=0,5568; Х 2=0,57;
Ньютонның екінші интерполяционды формуласын қолданып функция мәнін есептеңіз.
Х
|
У
|
0,51
|
15,1984
|
0,52
|
13,9484
|
0,53
|
12,5508
|
0,54
|
10,9937
|
0,55
|
9,2647
|
0,56
|
7,3510
|
Х 1=0,5511; Х 2=0,58;
Бақылау сұрақтары:
Лагранж көпмүшесі үшін формула.
Лагранж жинақталған көпмүшесінің формуласы.
Интерполяции қателігі.
Интерполяция қателігінің бақылау формуласы.
Интерполяция қателігін азайту үшін түйіндерді таңдау.
Практикалық жұмыс №10
Тақырыбы: Интегралды жуықтап есептеу: Тік төрт бұрыш әдісі.
Мақсаты: Интерполяциондық формулаларын қолданып туындыларын тауып үйрену.
Мақсаты: Интегралды оң және сол тіктөртбұрыштар формуласымен есептей білу.
I= 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VHG5S9rly5cvny5evXr1PbKHuxrPxV5v3798+fPw8LC1OU16xZs0ePHr/++usPP/yg9xaDEdq5c+f06dPpA0I/Z2dni92c/xede9BJyMOHD+lTEBsbS/+mpqZ++fLl8+fP9C99UdBJiJWVFX1U6TykQoUKdB7i5uZG5yF0fiV220EqEMsApCgrK2vp0qWLFi2i1KLlWyi60forV66cP3/+xIkTxbpyJkiQui+zePHi7t27U+KsVq0a/zrBNISGho4fPz48PFzshvyfxMTEmzJ0UhEZGUkhjH19+lynpaXRRzU6Ovrq1auKcldX127dug0YMKBy5cr6bTFIHmIZgPB49vePj4+n7+iIiAgO76WT8smTJx87duzo0aN0Us6nGaLLzs4+cuRIUFDQzJkzZ82aJbVbtGBglIGmTp26Z88e6TxPU6ZMGUHquStDZyBt27al06oGDRoIUi0YI8QyAGmJiorq0KFDUlKSSrmlpaWPjw/FNXd3d3t7e4pfcXFxly5d+uOPP+7fv6+y8j///OPh4XHu3LmKFSsaquG5cHFxad68ef369d3c3EqUKFG8eHEzM7N37969ffs2MjLyypUrgYGB8ntSKjIzM+fNmxceHr5//35ra2vDtxxEl56evnz5cn9//7S0NLHbokcUN8/KDBw4cO3atUWKFBG7RSACxDIACYmNjVWbyRo3brx3796yZcsqSgoWLFhLZsyYMRs3bpw0aZLK7c7nz5+3a9fu+vXr4nY1o60PGzbM29ubmspcWkqmRo0aP//88+rVqylizp0798OHD8w1g4OD+/TpQ9GNwpz+Ww0Scvjw4cmTJ8fExIjdEB3QSVSzZs3oJKRu3bqVK1d2kPn27Vtqaiqdijx48IA+mOfPn793757at+/atYtOVE6dOkUnMwZuOYgOsQyAFwH7+1Ou6ty5MzOTeXp6UigpVKiQpjeOHj26atWqXbt2VUlmz54969at27Vr18SKMgMGDNiyZQtLy5XRkWz8+PGtWrXq1KlTYmIicwU6Ss2fP9/Pz0/oZoJE3b17d8KECZcuXRK7IdoqUKAAfYR/+eUX+rdw4cLMFaytrUuXLl2zZk06x6CXISEhCxYsUO5kpkAxtEmTJvS7qz2fAROGWAYgFdOmTaPTaJVCZ2fngwcP5pps2rRps3bt2uHDh6uU37x5U8Qo4+3trWUmU3B1dQ0KCvLw8MjKymIuXbJkyc8//4xLCCbvzZs3s2fPDggIYH+SV1LKlSt3/vz5SpUqaf8W+ti2bt166tSpy5cvZy59+/Ztx44db9++Le4FbzAwxDIAgXHrjxweHr5u3Tpm+erVq4sVK6ZNDUOHDj18+PCZM2dUyhcvXty3b9/q1atzaBVP9evX5/Aud3f3//3vf0uXLmUuoqy2YMGCv//+m3fTQKIoh61fv55OJHJ9qlFqKGDplMnk8ufP//vvv9O/y5YtYy5NSEgYNmzY8ePHhWggGAfEMgBJmDJlCjPPubm59erVS/tK6Jv97NmzKvXQcW7y5MknTpwQoJW6KFeuXPHixbm9d9y4cfS7qB2PiqLnxo0b0RvaJNHeO3HixIcPH6qUFypUqFOnTkePHhWlVVpq1KgR5/cuWrTo4sWLt27dYi4KCgqi/5Z27drxaBoYE8QyAPFduHDh8uXLzPJRo0bpVE+tWrXolD0kJESl/OTJkzdu3OBz2OCA26UyOScnJ/pFzp07x1yUnp4eHBzcr18/Hk0DyXny5Mlvv/2mcvKQP3/+Zs2a9e/fv0+fPnZ2dhIfIYXP58vc3HzevHldunRRu3ThwoWIZXkHYhkAd0L191+zZg2zsGDBgt7e3rpWNXz4cGYsyye7GWpEsYw0b95cbSwjV69eRSwzJX/++SedgWRkZChK6ATjFxmhBgbTtyJFitSoUYNPDZ06dapcuTLFU+aia9euUTlGms0jEMsARBYXFxccHMwsb9q0qZ2dna610Ze7lZXVly9fVMqPHj2amJhYunRpjq3UHc9Y9uOPP2papGlYATBSd+7ckWcyZ2dnCtz9+/d3dXUVu1G68fDw4H+SRh/etWvXql106tSpsWPH8qwfjAJiGYCQOPT337t3r9pOVG3atOHQAGtr65YtW9KXuEp5VlbWgQMHJkyYwKFODugQVbduXT41sDxuaVxDWEmEpjuAUphQsmjRooMHD6Y0Rruu/maY1StBLkU3bNhQUyy7evUqYlkegVgGILLDhw+rLafvaG4VtmjRghnLyMGDBw0Qy4Q6zLN06je6Z/SA3YIFC8RuAl+CxDKWa4SPHj3iXz8YBcQyADElJSWpffyKcL7a1KRJE7XloaGhr1694vx0pIGxxDLmLVoAUQh7rdHe3l7TooSEBAE3BFKGWAbAkSB3WzSNYO7s7Mx5DAhN59zfv3+nzcmHF5c+c3ON3062traGbAmAYRQtWlTTok+fPhmwISAmxDIAMakdF4NUq1aNc52UWsqVKxcXF8dcdPHiRWOJZR8/ftS0SMvxdQGMC8skaVLoAgiGgVgGIBgO/f1DQ0PVllOu4tOSSpUqqY1lmjYnQSyxDHPRgEli2eetra0N2RIQEWIZgGiysrKYA5rLlS1blk/NFStWvHjxIrOcNvft2zexZi7XyYsXLzQtqlevnk5V9ejRg336mvz58z979qx8+fLa1LZs2bKpU6eqXbR+/frRo0fr1DYABZZY5ujoaMiWgIgQywBEEx0dnZmZqXZRqVKl+NSsaRDO9PT0R48e8Rz30jD+/fdfTYt0fUY113HOvn//vnXrVi2fB2Spbd68eYhlwBlLBzKel8/BiCCWAXAhSH9/TZfKiIODA5+aWW7zURY0ilh2+/ZtteXm5ua6juh29+5dqi1U5ubNm2ofavvzzz8pVGlzHXHKlCn29vYBAQGfP39WWfTt2zedGgagLDExUdOiWrVqGbIlICLEMgDRxMbGalrE8qi8NkqWLMlho9KRmZl57NgxtYu6d+/O8tupZWVl1VRG/tLDwyM8PFxlHToiBgcHd+3aNdfaatasuWrVKh8fnzp16qgs0jSnIYA27t+/r2kRzzkzwIgglgEIg0N/f7W98uU4j44hx/KsIstGpSMwMPDdu3dqF40bN45n5b6+voMGDWKWb9myRZtYJufs7KxSYm5uPn36dJ5tg7zswYMHmha1bdvWkC0BESGWAYgmPj5e0yKeQ3OxTKbJ0pVeItLT0zX1qf/1118VF70469u376RJk16/fq1Sfvr0afqLaDk39r59+1RKqM18hjUB0NRtsXnz5jw7m4IRQSzTl8TExPPnz9+6dev+/ftxcXGvXr36/PmzmZmZo6Ojg4PDDz/8QJ+0Fi1auLu7G+kccMDfmzdvNC2ysbHhUzNLLHv79i2fmg1g7Nixz549Y5bTp2blypX867ewsBg6dKi/v79KeXZ29tatW+fNm5drDfSHU3k+oHHjxtq8EUCT1NRUTRN+DB8+3MCNAREhlgns3bt3u2QiIiKYSzMzM+Nl/v33X/kT++XLl58wYcKQIUN4HobBGGm6T0csLS351GxlZaVpkZRj2ZcvXyiTbd++nbmIMtnFixd53ttVGDVq1LJly5g99GnTc+bM0TSrt4KPj4/yxbZy5codOXLEKIYdAck6depUVlYWs9ze3r53796Gbw+IBbFMMHSIXbx48ebNm9PS0rR/V2xs7MSJE+k8mw4SdAavv+aBgIS6wMkSywoVKsSnZpZYxrJREX369ImSDUUitV3f3N3djx07xnMsN2VUlZeXF/OpAjploqNj586dWd47Y8aMkydPKl7SUZNeYoRb4CkoKEht+fjx4y0sLAzcGBARYpkw6CR76tSpLPek2L1//3748OHHjx/ftm0bvt/zDpYEzzOWsVxs0+m0QVjp6envlLx9+/bVq1fPnj17/Pjx1atXaSnzLXRAmj179rRp0wS/FjVmzBi1D3tu2bKFJZbReZfy3U8bG5vg4GCjGHAEpOz169dqRzwuU6bMpEmTDN8eEBFiGV+pqamDBg0KDAzkXxV9vzds2PD8+fMVKlTgXxsYEofHMElGRoamRTxTCMs83ywb1TeWa3hMJUuWHDJkyMiRI7Xsg68rT0/PatWqRUdHq5SfPHkyMTGxdOnSzLfs27ePwpziZeHChWllDw8PfTQP8pR169Z9+fKFWb5o0SKdPjVgAhDLePnvv/+8vLzoXF+oCmNiYtq2bXvjxo3ixYsLVSdIlqYh/kmu3ZvYsbydZaOiK1iwYMuWLZvItGjRgiVcCsLX13fs2LEqhd++fdu+ffusWbNUyunUa+DAgYoZo21tbek8iv9joQAUyDZu3Mgsb9OmzYABAwzfHhAXYhl39+7do49NSkqKsNU+e/aMvv1PnTolbLUgQWp7+Mrx7L7GcrFNyrGM2nb16tXExEQ64aHPl6enZ+3atfW3OR8fnxkzZjAnIty2bdvMmTOV/wQnT5786aefFH+vIkWKnD59Wtc5oITCM7ILUpsingJ/S5YsYXaAKVGixF9//SVKe0BciGUcPX78mI4ZzKGPBHHmzJk9e/b8/PPP+qgceBJwQBM6Iuppuh6Wm6rCHtQF9/Xr1/syu3fvppelS5fu06fPsGHD9NF/y8bGhk6BNmzYoFIeGxtLn8EOHTrIX547d65Xr16Km79FixalpRh1HQTx8OHD33//XaWQvmR27typ62wWYBoQy7hISUmhr2xNmczS0pIOJF26dHF3d3dycqLjLn2JBwUFnTp1SvtnAubNm4dYZvIKFiyoKZZlZ2fzyU8saY82yrlanihyvX///sOHD4p/U1NTExMTExIS7t27d+vWLeYsk7R0jUzHjh2XLFni6uoqbJPGjBnDjGUkICBAHssuXrzYvXt3xeMI9vb2lNLooy1sMyDPGjFiBLO756JFi9q3by9Ke0B0iGU6o+Olt7d3TEyM2qU+Pj506qPSM6yPDH2z0xm2pnGcVTx58uTSpUstW7bk3V7QO279/fPJEhIlFbWLTDKWWVhYFJdRu5TafOPGja1btx48eJDZ/ZnOas6ePTt58uQFCxYI+FSmi4tL69atz58/r1JO51EvX758/Pixl5eXojGOjo4hISGCR0PIs+bMmXPt2jWVQl9f32nTponSHpACxDKdzZ49+/Lly8xyOoj+8ccfQ4YM0fTGX3/9VctMJnfixAnEMtPGMhxRZmYmnw7vLI9b8hx6Q38obMknFF+yZMnw4cODg4NVVqDc5u/vf+vWrWPHjllbWwu13TFjxjBjWVZW1vjx40+ePKm4gFeiRIkLFy5gLAwQCu3GixYtUins2bPn2rVrRWkPSARimW5CQ0OZ/QDk1qxZw5LJtmzZsnfvXp22dfPmTd0aB8amSJEimu5rp6en83kwXtNFuHy8J0E3ACcnp6CgIEpgM2bMYC4NCQkZOHDgoUOHhNqcl5dXuXLlmMPYHjhwQLlJlMlcXFyE2ijkcXSK7uPjo3KhvWvXrnSYwHR8eRximQ7oBPrXX39Ve3uoR48evr6+mt749u1bDhelnzx5outbQN+E/cYsVqzY8+fP1S5SO7aq9tSOgSRXtGhRPjUbDH1kPn78uGTJEuaiI0eOzJMRZEMFChQYOXKk2ggo5+zsfPHixcqVKwuyOQD6bm/Xrp3KI8C9evWiTKbvQWFA+rAH6GD16tXMwSfzyfr40yKWN+7evTs1NVXXzXF4CxgXimWaFjE7v+uEZSh/lo1KzcKFC0+ePPnvv/8yFy1evHjQoEE//PCDIBsaNmyYn5+f2ihcrlw5ymQY4RmEEhcX17p16+TkZOVCb2/vv//+G9OqQj7EMu29efNmwYIFahf5+Piwz9Z3+PBhDlvER9QocO7vT1gGDWYOpqUTlkxvRCMV58+ff8WKFW3atGEuysrKotC2detWQTbk4OBAx8Vdu3YxFy1btkxqmYzbmGGaniDBCGSG9OLFC8pk9K9yoa+v79q1a3HvEuQQy7S1ZMkSTUfKkSNHsr/3v//+47BFDFrDn/I3HZ/8pCcsaf7Tp098an7//r2mReXKleNTs4F5enq6ubmpvWBGKYoyk1AX/3799Ve1sWz37t19+vQRZBOQxz19+pQymUovxkWLFk2fPl2sJoEEIZZp5dWrV2onxyBVqlShwwb727mNOqvX8c1NHvPUU14iqXDGkpDevXvHp2aWXY79yq4Ede/eXW0sy8rKunTpUo8ePfhv4u3bt5omhD5x4kRMTIxQd0shz3rw4EHbtm2TkpIUJebm5lu3bh04cKCIrQIJQizTypo1azQ92qYYCpyFra0tfe/rulFtaga1WG4H0CLOyUzwuwzly5fXtIjDDqPs5cuXHDYqTSxzHJ0/f55/LEtOTqbj5f3799Uuzc7OplMyTc9fA2gjLCysc+fOyo9dFy1a9NChQ56eniK2CqQJsSx3X7582bRpk6alzZs3z7UGZ2dnXY+ylOS8vb11egvk0y458UlmwqpZs6amRTzn9WKZqtXoRt6qVKmSpkURERE8K4+NjW3Tps3Tp09Z1tm2bZufnx+f8UogL5NPqKr8EA/t0sHBwVWrVhWxVSBZiGW527t3L8sdJW2mYWncuHFUVJROGx0zZowRPTEnEYbvM8sz3lWoUMHGxkZtN7KEhAQ+NWuahaJw4cJS68Ceq1KlSmla9OrVKz41P3r0iDKZ4r/a0tLSy8vr4MGDKqvRx3/37t1Dhw7lsy3Im7Zv3z5y5EjFJPekWbNmR48etbe3F7FVIGWIZbnbvHmzpkV0Al2xYsVca+jTp88ff/yh/RZdXFxmzZql/fpgvA8x1apVKzQ0lFkeHx/Pp1pNw6GxXJ+TLJbLVNpPMssUGRnZvn17RbCjTHbs2LEGDRqcOHGCOerbunXrEMtAV/Pnz1cZXW/w4MF0QBFxAjSQPsSyXNy/f//WrVualmr5UJunp2fTpk2Zc5+pZWNjs2/fPtwx0R6HTCad+5iNGzdWG8s05SotaXr4lzbHp1pRKF9pUPHhwwdudV6/fr1z586K51Upkx0/frxt27b5ZCNI7dixQ2X9qKioK1euaNNjASCfbPK0YcOGKT/ba2ZmtmzZsgkTJojXKDAOiGW5+Pvvv1mWOjs7a1kPJS0PD49c70xRJjt9+nSuj3aCnCEvkulpW82aNVu5ciWzXO3AxVqKi4vTNECGMQYLliHcuM2MGRIS0r17d0VfH8pkgYGBitHRRo0axYxl+WQXzIzxfw8MLzU1tUePHspTJ9vZ2dEhoH379iK2CowFYlku2CeydHBw0LKe0qVLh4eHDx48+MyZM5rWadSo0bZt26pVq6ZbE/MqnjlJIhfM6EhPp9HMGb0oi7x48YLbYBaRkZFqywsUKEApkEOF4mKJZRz6Xx4/frxv376KAf2trKyoRHnE2vr169epU+fOnTsqbzx27Fh8fHyZMmV03SLkKc+fP+/UqdOjR48UJVWqVAkKCkIHf9ASYhmb27dvMycwVqbT9IKlSpU6depUREQERb3Q0NAnT57QSRUdKZ2dnevVq/fzzz/Th9l4+0jlQYKkOgoWFJUuXbrEXBQWFsYtll29elVteZMmTbQ/keDAwsJCfsMxISHByclJqGo1Pb6Qj/UhTbV2795Np0aKu6KUyQIDA1u3bq2y2qhRo4YNG6ZSSNF506ZNixYt0mmLkKfcuHGjW7duyo9RU+I/cOCAsUxEC1KAWMbm6NGj7CtYWlrqWqe7DNcWgQnq2bOn2lhGX/G9evXiUKHy3ROVDXGoTXuUcuRXtigX/vTTT0JV++DBA02LatWqpX09mzdv9vX1VYRpam1QUJDagaP69ev3v//9j9lxLSAgYM6cOYUKFdJ+o5B37N+/f9CgQcozq44dO3bVqlWapr0CUAuxjA19a7OvgAdqJIiOu1pedJTIfUxKMBQCMjMzVcrPnDmzfPlyXWtLTEy8ffs2s5z2VX2PhGdtba2PWHb37l1Ni1q2bKllJb///vu0adMUL6mp9Olu1aqV2pVp6cCBA9evX69S/vr163379vn4+Gi5Ucg7Fi5cOHfuXMX3CX3cNmzYgKd3gQPEMo2SkpJyHWwM9xylRv61qH0y05Je/9AlSpTo1asXHe9Vyu/fv89h2p/Dhw+rzZo9e/ZkGQBMEIoO+FeuXBGqTvpdNJ0d0ebUzmLONGvWrMWLFyteFipU6NixY5oymdzIkSOZsSyfrOM/Yhkoy8rKGjZs2M6dOxUlxYoVo4+h9ucMAMoQyzQ6e/as2E0ANoJc6JLIBbOxY8cyY1k+2Wzcc+bM0amqgIAAteXjxo3TsoZTp05t2rTp5s2bqampxYsXb9GiBTWPZQYkBUUsu3fvHr1XkP40ly5dSk5OVruod+/etra2udYwceLENWvWKF6amZkdOHAg1zxXo0aN5s2bM/PlnTt3bty40ahRo1y3CxLHeT9X9vHjRzqnCgkJUZRUrlz5xIkT6OAPnCGWaXThwoVc18nOzjZAS0CChA1zdJjv2LEjHSdUyiljTZs2zcLCQst6zpw5Q5GIWd6lSxctk8SYMWM2btyoeJmYmLhX5rfffsv1jqoiltF/zj///NO5c2ctm81i/vz5assLFCgwderUXN/u6+urMnPahg0bvLy8tNn0qFGj1F72W7duHWKZseOznyu/i3byf//9V1GCEfyBP8QyjTT1m1bGHNcAJMLoepj5+/tTqFIJ+gkJCZs3b9byQhe9V7n7lIK5ufmSJUu0qWHXrl3KxyplK1eupIPNjBkzWN6uPIoYBRr+sYxSqaaP4ZAhQ6pXr87+9vHjx6tkMkpaw4cP13LrPXv2LFGiBHN20cOHDycnJ+v7jjDoD8/9XO7+/fudOnV68eKFoqR///7btm1Dh2PgCbFMvTiZXFdjGX8cQCe1a9eePHny0qVLVcpnz57dvXt3beaTWLBggfKJu8LMmTO1nHOJfYqw+fPnDxgwgGXMDuWpKTQN0qG969ev//bbb2oXlS9fPtdLGosWLVq3bp1ySdWqVdWO3KsJHV8p/DETbWZmJmVllUl1wIjw3M/lmjZtqjJo898yArRPM9yfyQsQy9SjQ4I2qyGWSZlQHf8N9mAHHQ9Onz6tEq0+fvxIsezSpUtFihRhee++ffsoljHLGzZsqP38quzPuGRkZFAcYRm4S/lq2e3bt/n0wdq5c+fo0aOZc1MSW1vbwMBA9l5lR44cYfbJmzt3rq5jWwwfPpyCMvNYSMd1CrvGdV0ER3QFnvu5nKaJNAB4QixTLywsTJvVmIMagDGSyH1MOswHBQVRkEpMTFQuj4yMbN68+cGDB6tUqcJ8F7Xc39+fUgjzuFu5cmVKMGZmZlo2INfTjLNnz2oZy+ij0aRJk3r16vXt27djx4653nBUuHjxIsVTTfcuixYtSv9FtWvXZqkhISFhyJAhzD8oc9jYXJUvX54aHxwcrFL+8uVL+nP8/PPPulYIUsBzPwfQK8Qy9cLDw7VZDbFM4gQfKUNRreB1ypUpU+b06dPt27dPSkpSLr97926tWrX69+/fq1evOnXqODo6fv78OSYm5sKFC5s2bVI7MXnVqlWpKlpT+61T7GO/kMA+gTpzhspbMpMmTSpbtmzjxo3pV6BERVtxcnKysbEpUKDA169f379/Hx8f//DhQ/rQnThxIjY2VlP9Li4uhw4dyvWGrJ+fn9orGdyubY8aNYoZy8jatWsRywRHpxYUeRM00PQuOzs7+uA4q1OyZEnmNwDP/RxArxDL1KCDrqZZBVUoD+gMRk0iF8zyyUauDw0N7dKli8qRg84B/pTRphJPT8+DBw/qOmXksGHD2B8vYJmeMh/rxOEvXrzYL6NTexTMzc19fX0XLVqkzdzkR44cUVvetWvXZcuWsQ9XxtSxY8fy5cszw2JYWFipUqVcXV0paMr/pT+c9s/MgrLp06dfvHiRgldycjKH56hot3wow1xEew79mSif0d9RcV+b534OoFeIZWo8ffo0LS1NmzURy0AfypYtGx4e7ufnRzFC12s8dnZ2/v7+I0aM4LBdij7//PMPS3iiylnerk1m0hUFHW9v7xkzZri4uGj5Fk1dvu7cuTN27Fi1A4iwoLxO/5lqH81LSUkJkZG/PHPmTNu2bXWqHOSuXbumZb8RXdHHJ15GeRQ9nvs5gF4hlqmh9nE2tb5+/arXlgB/PO9jijWRA8WRRYsWDR8+fPny5Tt37vz06VOub6EwN3r06FGjRrE/HMCCftm9e/e2bNlyypQpai8YsM90PmvWrI4dO968eTM0NJQyUExMDOdu5ubm5h4eHn369KFMVrJkSZ3e26NHj82bN6tdpNMcmgpDhgyZN29eRkYG+2rcKgfD47mfA+gVYpkauc65pIBYZkqkcx9ToXz58uvWrVuxYkVISMiFCxdoz3z8+HFqaiqlNMpttra2FFlq1Kjh5ubWvn17d3d3QTY6YsSI7t27+/r6Mu8GVq5cmeWNlpaWTWTkL9PT06m10dHRT58+TUxMTJZJSUlJS0v7+v+h//BChQpZWVk5OjqWKlWqQoUK9Ov8+OOPjRs3Lly4MLf2b5Th9l61ihcvjk+6XvEfToUDzvu5HJ5sBT1BLFNDbR8FtfBlbRSE7fhv+OhGCayTjMG2SGnv0KFDQ4YMUenKptOAF5S3assI3ToAYQiynwMIC7FMDTq/13JNxDITI8ELZiJavHixyuGqWbNmYjUGQE+wn4OkIJapoXa4AbXUDncJYBpUbiNWrFgRhyswPdjPQVIQy1TFx8drfw3s8+fPem0MCIXbfUyx+vtLxJ07d5RfDhs2TKyWAOgP9nOQFMQyVc+ePdN+ZcQy04P7mAqrVq1S/Ozk5DRy5EgRGwOgJ9jPQVIQy1QhlpkqQTr+553EtmnTpuPHjyterl+/HoM5genBfg5Sg1imimXuF6b09PTs7OwCBQrorz1geHn8ghnt0n5+fgsXLlSUDB06tEePHiI2CUBw2M9BmhDLVL148UKn9T9//mxjY6OnxgAYEoXRoKCgmTNn3r9/X1HYp08fTaOzAhgj7OcgZYhlqnSNZWlpaYhlxkKn+5h5qr9/dHT0oUOHduzYoXITf+DAgVu3bsX1YDAN2M9B+hDLVCUkJOi0/qdPn3SdHAakL09lMlKjRg2VEktLy3Xr1g0ZMkSU9gDoA/ZzkD7EMlVJSUk6ra92SjWQLD4d//NOh7NWrVqtX7++evXqYjcEQI+wn4MEIZblkJmZ+e7dO53eos0c0gDGomXLltOmTWvXrp3YDQHQI+znIFmIZTmkpKTo+pa0tDR9tATAkKpVq9azZ8+BAwdWrVpV7LYA6Av2c5A+xLIcXr58qetbMP+S0RF25nLT8ODBA7GbAKB32M9B+hDLcnj9+rWub8GIsgAAACAIxLIc3r59q+tbEMuMEYcLZnmnvz8AAIgFsSwHxDIAAAAQC2JZDro+hpkPscxooYcZAABIDWJZDu/fv9f1LejyDwAAAIJALMvhw4cPur4FV8sAAABAEIhlOXCIZbhaZry0v4+J/v4AAGAAiGU5cJhJCbEMAAAABIFYlgOHIfsRy4waOv4DAIB0IJblwCFjIZYBAACAIBDLckAsy4NyvWCGjmUAAGAYiGU5cHisErEMAAAABIFYlkN6erqub/n69as+WgKGxHLBDJfKAADAYBDLcsjIyND1LYhlpgHxCwAARIdYlkNmZqaub+FwgQ0AAACACbEsBw5XyxDLAAAAQBCIZTlkZWXp+hbEMgAAABAEYlkO37590/UtiGUAAAAgCMSyHLKzs3V9C4f7ngAAAABMiGU5cIhlHO57AgAAADAhluXAYZQExDIAAAAQBGIZXxy6owEAAAAwIZYBAAAASAJiGQAAAIAkIJYBAAAASAJimcA0zXgNAAAAJkNPMykjlgkJmQwAACAvoCO+PpIZYhkAAACAzvSRzBDLAAAAACQBsQwAAABAEhDLAAAAAHSGvmVSR38h9PoHAAAweXgS0zjo6e8EAAAAJg+xDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDABAK5jxVq8wcx1APsQyAABtIJPpG/0PI5kBIJYBAIAkIJkBIJYBAAAASAJiGQAAAIAkIJYBAOQCHcsMA3cwARDLAABAfMhkAPkQywAAOECGAAB9QCwDAAAAkATEMgAAAABJQCwDAAAAkATEMgAANngMEwAMBrEMAAAAQBIQywAAdIPHMAFATxDLAAAAACQBsQwAAABAEhDLAAA0Qn9/ADAkxDIAAAAASUAsAwDQAfr7A4D+IJYBAAAASAJiGQAAAIAkIJYBAAAASAJiGQCAengMEwAMDLEMAAAAQBIQywAAtIXHMAFArxDLAAAAACQBsYyvAgUKiN0EAAAAMAWIZXwhlgGYJPT3BwDDQyzjC7EMAAAABIFYxhdOqQHyCPT3BwB9QyzLgTKWrt+85ub4PwQAAAABIFLkYGZmlpWVpdNbChYsqKfGAAAAQJ6CWJaDubk5YhkAAACIArEsBw53JC0sLPTREgAQEfqMAoAoEMty4HDpC1fLAAAAQBCIZTlwyFiWlpb6aAkASAoewwQAA0Asy4HDHUlra2t9tAQAAADyGsSyHAoVKqTrW6ysrPTREgAAAMhrEMtyQCwDgLzQ3//9+/eRkZERERH379+PlUlNTf38+fPXr1/pa7CITMmSJd3c3H788cdGjRpVr15d7CYD5AmIZTlwiGWFCxfWR0sAAPShT58+lMaePXumaYXPMsnJyY8fP7569aq80N3d3cfHZ8iQIfjGA9ArxLIcOPTft7W11UdLAEA6TKm//+HDhzm8K0JmxYoVGzdu7Ny5s+CtAgA5xLIcEMsAIE8pUqRIhw4dmjZtWqdOnXLlyjk4OBQoUODdu3fx8fE3btw4evTopUuXFCu/ePHCy8tr2rRpixcvFq/JAKYMsSwHDh3FEMsAwBjVqFFj3rx53bt3Zw6jXUqmXr16Y8eODQ0N7devX2xsrGKpv79/oUKF5s6da9j2AuQJiGU54GoZQB6XF/r7y1Hk6t27d66rNWzYMCwsjCLaixcvFIV+fn5t27Zt3LixPhsIkBchluXA4WpZsWLF9NESAAC9atq0qZZrFi9efOfOnZ6ensqFlOpu3bqVd1IsgGEgluXAIZbZ29vroyUAIBGm1N9fgc4na9asqf36LVu29PDwuHnzpqIkIiIiNDS0UaNGemgdQN6FWJYDhyH7EcsAwOhwiFN9+/ZVjmUkKCgIsQxAWIhlOXCIZbiJCQBGR/s7mAoNGzZUKbly5YpAzQGA/xdiWQ4cbmKWKFFCHy0BANCH7Oxsbm/84YcfVEqSkpL4tgYAckIsy4HDANaIZQAmAx3YWTDvDLx8+VKUlgCYMMSyHHS9iWljY4M5MQEAAEAQiGU56Hq1rGTJknpqCQBIgUk+hsnNx48fVUrwwBOA4BDLctD10lfp0qX11BIAAElhxrLixYuL0hIAE4ZYloOuNzGdnZ311BIAAEmJi4tTKalbt64oLQEwYYhlOSCWAeRZ6O/P7t69eyolTZo0EaUlACYMsSwHXfuWlSlTRk8tAQCQlKioKOWXZmZm7du3F6sxAKYKsSwHXfuWMQfyAQCTgf7+ys6cOaP8slOnTqVKlRKrMQCmCrEsB11vYlaoUEFPLQEAkI67d+/GxMQol/j6+orUFgBThliWA2IZAADTjh07lF96enq2a9dOpLYAmDLEshwsLS21X9nBwcHW1lZ/jQEAkIJ3794FBAQoXpqZma1YsULE9gCYMMSyHHSKZS4uLvprCQAYEh7DZPH777+npaUpXs6ePdvNzU3E9gCYMMSyHBDLAACU3bt3b+XKlYqXTZs2nTVrlojtATBtiGWqLCwsMjIytFmzWrVq+m4MAIgFj2GSzMzMIUOG0L/ylxUqVDh06FCBAgXEbRWACUMsU2VpaallLKtZs6a+GwMAIKJRo0aFh4fLf3ZwcDh9+nSJEiXEbRKAaUMsU0Wx7MOHD9qsWbt2bX03xpQ8fvw4JCTk1q1b0dHRsbGxHz9+/Pz5s4WFhZWVFf2fFytWzMnJqVSpUqVLl65cuXJVGSoRu9UAedeqVau2b98u/5k+oZTJqlSpIm6TQBDfv3+/cePG2bNno6Ki6Av59evX9IX87du3IkWKUPiuVq2aq6tru3btGjdujCujhodYpoqCgjar2dnZlS1bVt+NITt37pw+fXpycjL9nJ2dbYAtCisxMXGHzJMnT5hLv8rQD0lJSQ8ePFBZ6ujoWFdm4cKFhmgr5FXo78+0bdu2SZMmyX+2t7c/d+6cu7u7uE0C/uhQsm7duoCAAIpizKVvZOgUOjAwkL516Rt4xIgRY8eOlc4lUr3GRIkcYRHLVBUqVEib1ehkQt8tCQ0NHT9+vOIOgtF5+fLlokWLtmzZouVNYSb64jgjg1gGYEh///03HY/lvetKlSp1+vRpA3zjgV5lZWUtXbqUvpPlZ8LaoG9gWn/lypXz58+fOHEirpwZBmKZKi2vltWrV09/bUhMTJw6deqePXuMt9PxX3/9NW7cuPfv34vdEAAujPejx9/mzZt9fX3l/wOVKlU6e/Ysxs02dvHx8d26dYuIiODw3i9fvkyePPnYsWNHjx51dHQUvG2gArFMVcGCBbVZrX79+vrYenp6+vLly/39/ZVHCTIuGRkZgwcP3rt3L3NR/vz5PT09e/Xq1aBBg4oVK9ra2n769Ont27f//fff3bt3w8PDz58/Ty8N32YAkFu6dOn06dPlP9etWzc4OFg6N7CAm6ioqA4dOiQlJamUW1pa+vj4UFxzd3e3t7en+BUXF3fp0qU//vjj/v37Kiv/888/Hh4e586do69uQzU8j0IsU6Xl1TJ9xLLDhw/TSYnKxHPGJTU1lT7kV69eZS6iQLZy5UqVWyF2MnQuLp/IhU7Qw8LCdu3atWPHDvqOMFCjAUD26Rs3btyGDRvkL7t27bpnzx5d56MDqYmNjVWbyRo3bkwnz8o9pAsWLFhLZsyYMRs3bpw0aZLK7c7nz5/TF/X169eR1PUKsUyVmZlZruuULFmyUqVKAm707t27EyZMoNMUAes0PApSnTp1Cg0NVSnPnz//4sWLp06dmmsNtKaHTPHixefPn6+fZgKAKvrw9uvXLzAwUP6Svo5WrFiBJyGMHeWqzp07MzMZnSQHBwezdKQePXp01apVKZqrJLNnz57Rife1a9e0OVACN4hlqrTZ25o2bSrU5t68eTN79uyAgIBv374JVacosrOze/fuzcxkZMuWLUOGDNGptrZt2yKWgWEgfNBhm461t27dyie7ZLJ+/fphw4aJ3SgQwLRp05hPuDs7Ox88eDDXh9vatGmzdu3a4cOHq5TfvHmTvpz9/PyEbCgoQSxTpU0sa9asGf8NUQ6jrz/auVNTU/nXJrqFCxeeOnWKWT5jxgxdMxlp2LChjY3Np0+fhGgaAGgUGRnp5eWVkJCQTzYQxqFDh1q2bCl2o0AA4eHh69atY5avXr26WLFi2tQwdOjQw4cPnzlzRqV88eLFffv2rV69ugCt5EEi41kIDrFMlTanzq1bt+a5lbNnz06cOPHhw4cq5XQG06lTp6NHj/Ks38CuX7++YMECZnmDBg24XfSicEzHhhMnTvBuGoDO8s5jmIGBgb/88ov8AaNq1aoFBQUJ2z0DRDRlyhTmnuzm5tarVy/tK1m2bBkdrVTq+fbt2+TJk/H9rCeIZapy/UZ2cnLiM+3SkydPfvvtN5UdmrJgs2bN+vfv36dPHzs7O+MaHoZOWUaOHMm8CUu/RUBAAOffpU2bNvjYA+jP8uXLp02bJr/k0K5duwMHDhQpUkTsRoEwLly4cPnyZWb5qFGjdKqnVq1arVu3DgkJUSk/efLkjRs3GjVqxL2JoAFimSrFpLyatG3blnPlf/75J30qlIdXpZ3+F5kyZcpwrlZcmzZtunfvHrOcfik+81Px+X8GABZZWVl0KqWYWMnX13fNmjXGdTYI7OgPyiwsWLCgt7e3rlUNHz6cGcvyyW6GIpbpA2KZqlxjWZcuXThXfufOHXkmc3Z27tevX//+/Y197OyvX79quk2pGP2Im+rVq5tq1wGQjjzY3z81NbVnz57y574pitHBdcyYMWI3CoQUFxcXHBzMLG/atKmdnZ2utXXq1MnKyoo5YtHRo0cTExNLly7NsZWgAWKZqo8fP7IstbCw6NChA+fKixYtOnjwYEpjLVu2NI3jAZ1wv3r1ilnu6elZrVo1w7cHVGi6BILImzfFxMTQUTY6Opp+Lly48N69e/mcZ+YRRvchoj+r2ra1adOGQ23W1tZ0wGI+0ZWVlXXgwIEJEyZwqBNYIJapYp8vqHXr1jY2NpwrV9sv3nh9//595cqVahcNGDDAwI0BEIQJ9/cPCwvr2rVrSkpKPtlMlydOnKhTp47YjQLhHT58WG15w4YNuVXYokULtQ/aHzx4ELFMcEYfy759+3b06NEzZ86EhobS101qairFppIlS9L+16NHDy8vL10rZJ/8p2/fvjwaa2ouXLjw7NkzZnnBggW7detm+PYAAItWrVopbkUlJycLNbGvZC8a5U1JSUnyIeiY6taty63OJk2aqC2nw+6rV6+KFy/OrVpQy7hj2dmzZ8eMGfPkyRPlwncy0dHRO3bsoHNBivPaz7NLexhL3zJLS0uKerxabFr+/vtvteWNGzcuWrSoYdsCALnAhGZ5gabZYpydnTk/aaupD/T3799pc3369OFWLahlxLHszz//HD58OPvg+Hfu3PHw8Lh9+7byzF8s4uPjWZZSJuNzB9PEpKenHzlyRO0iOik3cGMAAICoHRcjn2xcOs512tralitXLi4ujrno4sWLiGXCMtZYFhERoXasLKbXr18PGjTo/Pnz2lT76NEjlqWYkETZlStXND0e0bx5cwM3BoAD03jsBkCZ2hnwCOUqPtVWqlRJbSzTtDngzFhjma+vb64jWShQnL9165Y2HSnkDyipVaVKFcxJoowl6bq7uxuyJZr06NHj+PHjLCvQUfnZs2fly5fXprZly5Zpmm19/fr1o0eP5tJEMHXYCcGQsrKymJPHyGl5y0iTihUr0pGUWU6b+/btG2YuF5BRxrJ///1X14S+f/9+bWJZWFiYpkXjx4/XaYsmT1Mso08vh6Fx9EHtILfKvn//vnXrVi0fj2Wpbd68eTgimgbBH8OU1E6IvvkmLzo6WtMFi1KlSvGpWdOA5+np6Y8ePapRowafykGZUcayY8eO6fqWmzdv5roOfT9qimXFihUbNGiQrhs1YRkZGRSO1S5ycXExcGM0uXv37u3bt0NlaAeQT8as4s8//6TjmTanelOmTLG3tw8ICPj8+bPKIm1upgN/yvccjWUYC+yEYEiaLpURBwcHPjWXKFFC0yLKgohlAjLKWBYeHq7rW54+fapNtZpGx5g4caK1tbWuGzVh9OHPyspSu0g6Ux1bWVk1lZG/9PDwYO45iYmJwcHBXbt2zbW2mjVrrlq1ysfHhznUEwbk1DdmJzB5ifTDGXZCMKTY2FhNiyjQ86m5ZMmSHDYKHBhlLGM5IdAkNTU113UCAwPVltPejDuYKlhupmg/HImB+fr6qr3kuWXLFm2OiHLOzs4qJebm5jynmQJ2LB3zaRHnZCZKf3/shKBXanvly/Gch75YsWIcNgocGGUs0yZjqaCvLfYV6Mt9165dahfNmDHD1tZW1y2aNpZnI5ycnAzZEu317dt30qRJr1+/Vik/ffp0fHy8llPF79u3T6Vk6tSpmGZKT0zvSUnshKBXLGM88TyKsfQYfvHiBZ+aQYVRxjL2aSvVyvU768iRI2p36CpVqowdO1bXzZk8tV1k5FiudYvLwsJi6NCh/v7+KuXZ2dlbt26dN29erjW8efNGpWt248aNtXkjcKBlJuNzwUyFAW6JYicEvaLdQ9MinoNussQy9qlxQFdGGcusra0/fPig01t69erFspS+E+fPn6920fr16wsWLKjTtvKCpKQkTYvUTsTx5cuXu3fvRkREREZGPnz4UD4TQ2pq6tevX62srOzt7cuWLVujRo0GDRq0b99ey2sGHIwaNWrZsmXMztHbt2+fM2eOpgmJFXx8fJSvc5QrV47SPJ4MF5zpXSRThp0Q9Ie+VzUtsrS05FMzfVFrWoRYJiyjjGWOjo46xTJbW9vBgwezrLBy5cqoqChmOb2rbdu2OrcvD0hOTta0SPlSeXR09AmZ69eva3pE4JNMXFzcP//8ExAQkE/WLXr06NG//PJLrocoXVH48/LyYj7JGx8ff+rUqc6dO7O8d8aMGSdPnlS8pChJL1meTgJuOGQyAS+YGQB2QtAfllhWqFAhPjWzxDKWjepVdnY2neTfv3//8ePHT58+ffHiRUpKyps3bz5+/Jienk5HHHNzc/qtCxcuXLx4cfqYVKxY0cXFpU6dOnT+T4WitFkbxhrL1M6QrcnkyZNZ5lK9du3azJkzmeX0J1y1ahWX9uUB7JfKaemOHTsoY9GnhUPlN2UWL168adMmwYfwHTNmjNoBVrZs2cJyRNy8ebPyjSf6HYODg/FMuLBM+yKZMuyEoCdpaWmaFvGMZSwX21g2qle2trbs07xmytBp/8uXL+nlhQsX5OVmZmYNGzbs1q1b//79eQ7npg9GGcvq1avHMu6rCjc3tylTpmhaSpmsS5cuzPH3aA8+cOAAz0dXTNjXr181LRo9enRgYCCdrPDcxKNHj9q0aTNHhmdVyjw9PatVq8Z8ZOHkyZOJiYmlS5dmvmXfvn10HFW8pNMsWtnDw0PAVoGBM5m4ERA7IehJRkaGpkU873SzPDbHslG9Ys9kLL59+/aPzMyZM3v16jV//vzKlSsL2zY+jDKW0dF648aNWq68fft2CwsLZjn9RZcvX75w4UK1YyLTu5gjA4ECSyw7ePCg8sty5crRwYMOQrTfV6pUiQ45dEShs5wCBQrQGUxCQsLZs2cPHTqkdsSN7OzsefPmvX79eu3atQI23tfXl/kYB31Q6Y8+a9YslXKKmAMHDlQMj04tDw4OVgxDBRJhXPcx82EnBP1gmZOQZ58QlrdrPxGi1FDL6YSHDkCTJ0/28/PLdcQGw5BEI3RF55rW1tbMca7VoixMZ5kdO3asWLEifXfTMZ4SwJkzZ3bv3p2SkqL2Lf7+/v369RO0yaaG/WJY2bJlO3Xq1KFDh4YNG7I8mFlWhtaZM2dOQEDAlClT3r9/z1xt/fr1FSpUmDhxogDtlvHx8ZkxYwbzed5t27bRyZPydZSTJ0/+9NNPil5xRYoUOX36NDVYqJboRNiedtxqM+HZewyc6ox0JzR2Jv8h0tSFNx/vK8QsF9vEimX0G9WqVatBgwZ16tSh0346TDg4OFhZWRUqVCgjI+Pr16+vXr1KTk6Ojo6+c+fOhQsXNHWqof+0JUuWXLx48cSJEzwH3RWEUcYy+mKiE82lS5dqs3JMTMwkGS0rX7hwIctNT5Bj+fBHRka6urrqWuGwYcPoo9WqVatPnz4xl06fPr1Nmza1a9fWtVq1bGxsBg4cuGHDBpXy2NhYyuuUJuUvz507R5lecX2+aNGitLR+/fqCtAG0RGnJ8CNlGAB2QtAHSop6moaL5cMl+LNZLJTHSLO1tdXU0aiQjJ2dHcU1xXVlCmerV6/es2eP2mQcGhrarFmza9eusQycaxhGGcvyyYZP3LJli7APgJibm2/cuHHo0KEC1mmqChYsqKk/AZ2+cKuzbt269IFRO9Y5bWvixIkhISHcamYaM2YM84hIAgIC5EdEOnPq3r274qIgnULRAdLd3V2oBoA2jChmcYCdEARH38yaYhllET75iSXtGXIMKeYUF9qjM/9du3b5+vr269cvJiaGucLDhw979ux5/vx5QwZNJmONZXTWeOTIEfry4t+1XI7+2Lt3727evLkgtZk8CwsLTbEsKytLbWc+bXTp0qVjx46nTp1iLrpw4QKdxwjVn8bFxaV169b08VMpDwoKevny5ePHj728vBT9SR0dHSkRcrgECNpjSWDaXzDTkkQe+cROCIKjhKSp469pxDL+PDw8rl+/3qJFi//++4+59PLly6tXr/7tt98M3zAFY41lhP5bKUj179+fpfu5lgYOHLhy5Uop3FQ2FizBi08sIxMmTFAby8imTZsE7OY8ZswY5hGRGj9+/PiTJ08qei6WKFGCEiGGITAKxnUfMx92QhAay3dvZmYmny7tLI9b8hx6w/BKlSp1/Phxd3d3tZd15s6dO2jQIBHzgBHHMtKzZ8+IiAgfHx/tx8tQ4enpuWDBgkaNGgnbMJNnY2OjaWRnOpZYW1tzrrl169YODg5qx0WjDxJ9NfDJfMq8vLzKlSvHnGT3wIEDip+dnJzocOji4iLIFoEzwS+YMevXX+UssBOCsIoUKaJpUEmKICxDwuaK5fKHMY4kVa1atd9++23JkiXMRWlpaWvXrhVxQjPjjmX5ZDcCrl+/fuTIkYCAgJCQEC2/XunA37t3b3k3c3230CTRfyDzWCJH+7SjoyPnmgsUKNCqVatDhw4xF1Hgu3z5slDzLtCGRo4cOWPGDE0rODs7X7x4UVLj2YCJwU4IwipWrNjz58/VLuLZ4YdlkLCiRYvyqVks48aNW7ZsmdrH13bs2IFYxgt9tfWWiY+P/+eff27fvn3nzp2kpKT3MrQzWVpaUpwvU6YMfbtRDmvatKmHh4dE+pcYKZbgpfZRSp3Uq1dPbSzLJ5sAQMDpsCiX+/n5qf22KleuHB0OK1SoINS2wDCM7j4mdkIQEMtThFoOKaUJy1D+oj+6yE3JkiUpDFy6dIm5KC4uLiwsrEGDBgZv1P8xhVimQMHLW0bshpg+lsms+E9bW716dU2LIiMjeVauzMHBgfaWXbt2MRfRWZTUDofchjvS1MnX6EYgE+o+ptTOx4xrJzR2Jv8hYvlmZg6Sp5PU1FQOG5W4Ro0aqY1l5OrVq4hlYEzKly+vaRHLdJlaKleunKZFsbGxPCtX8euvv6o9Iu7evbtPnz7CbgsMw+gumGEnBKGULVtW0yKe9zHUjvUtx/KNLXHVqlXTtCg8PNyQLVGGWAZcVKpUSdOiV69e8ayc5dwrMTGRZ+XK3r59q2mc4RMnTsTExPzwww8Cbg6kSdwMh50QBMSSkHgO8/n69WtNi1iyoMSx3JnR1EXPABDLgAuWWKY8CjM3LB1IeV6HV5acnNy2bdv79++rXZqdnb1x48bff/9dqM0Bf/p+HtPwsBOCsFjuY/DsXvLy5UsOG5U4lksA/A9knCGWARcsQ/lrekJTeyxDYLA8DaST2NjYNm3aPH36lGWdbdu2+fn58XmkHMRiFPcxsROC4GrWrKlpEcvlLm1omkKaGO+IejY2NpoW8X92jTPEMuDCwcHhhx9+UDt/xbNnz3hWzjInriBzYjx69IgOhwkJCfKXlpaWXl5eBw8eVFnt3bt3u3fvxmRckmIyF8ywE4I+VKhQgaKG2kih2Nm4UfttTwoXLmy8D6awxDKhLgFwgFgGHNWvX1/TtGI8a2b5PPC/bBAZGdm+fXtFBzg6HB47dqxBgwYnTpxgbnfdunU4IpoSiUQ67ISgP7Vq1QoNDWWWx8fH86lWU18rlutz0scy7QGfGRF4QiwDjpo3b848uc8nexLz5cuXJUuW5FwzSyzjOZz09evXO3furHikiA6Hx48flw+E5u3tvWPHDpX1o6Kirly5gplSjZFk72NiJwS9aty4sdpYxrMPu9oZJOWb41OtuFg6K/OZq4YnxDLgqGPHjpoWhYWFeXl5ca6ZJZY5OztzrjYkJKR79+6KMRXpcBgYGNimTRv5y1GjRjGPiPlk1ypwRJQUYe9jGji6YScEfWvWrNnKlSuZ5dHR0ZzrjIuL0zRAhlHvmSxj5JYqVcqQLVGGWAYcVaxY0cXF5dGjR8xF169f5xPLWLqmcn7k5/jx43379lWMpW5lZUUlisNhPtk92Tp16ty5c0fljceOHYuPjy9Tpgy37YKIpHbBDDshGADlJDMzs2/fvqmUf/z48cWLF9wGs9A0jneBAgUoBXKoUCJYnk4V8fFSxDLg7qefflqwYAGz/Ny5c2qngNUSy8V2V1dXDhXu3r178ODBirnP6HAYGBjYunVrldVGjRo1bNgwlUL6dtu0adOiRYs4bBdAATshGEaxYsUoKqkdvD4sLIxbLLt69ara8iZNmjg4OHCokAMLCwv5xychIcHJyUmQOh8/fqxpUe3atQXZBAeIZcDdoEGDFi5cyLwgERERkZSUxPmTo+mRn3yy6TJ1rW3z5s2+vr6KRtLhMCgoyNPTk7lmv379/ve//3348EGlPCAgYM6cOYUKFdJ106An3O5jitjfHzshGFLPnj3VxrIbN2706tWLQ4WXL1/WtCEOtXFDnxp5V7Br164JNfsFy41dDw8PQTbBAWIZcFehQgU6tJw/f16lnA4/+/fvnzBhArdqNY2uScckXS+Y//7779OmTVO8tLa2psNhq1at1K5MSwcOHLh+/XqV8tevX+/bt8/Hx0enTYMUSOE+JnZCMLCffvqJwn1mZqZK+ZkzZ5YvX65rbYmJibdv32aWFyxY0JAzUNNHQx7Lrl69KlQsu3Xrltpy+tWYV7INBrEMeJk6dSozluWTDYPJOZZduHBBbTl9TnQaIGPWrFmLFy9WvKRUd+zYMU2HQ7mRI0cyj4j5ZH2ucUSUFEE6/hsgsWEnBMMrUaJEr169KMerlNMZL4fpvA4fPqz2k9KzZ09D9otXPBqp6Y6qrtLS0iinql3k6elpZ2cnyFY4ECeWvXv3bubMmVu2bMmW0ffmBBmDNJ9sLhRB6pGOp0+f+vv7066ZkpJSsmTJTp06TZ48uWLFitrX0KZNGw8Pj5s3b6qU0+f/1KlTLE9rahIjo3bR4MGDta9n4sSJa9asUbw0MzM7cOCAcvdqtWrUqNG8efMrV66olN+5c+fGjRuNGjXSvgEA2AlBLGPHjmXGMrJr1645c+boVFVAQIDa8nHjxmlfCf9jjSKWRUVFffjwgedgSflkc85+/fpV7aJRo0bxrJwPQ8cyCt30N6ZM9ubNGwNvGlQEBgb269dPMRrFixcv/vjjj7/++mv//v2dO3fWvp5Vq1Y1adKEeTpFH/4OHTroeklD01dA2bJlu3btqmUlvr6+mzZtUi7ZsGGDlg+H0geSeUTMJ7tWgSOiMRLrPiZ2QhAR7Sd0Vkznxirl9AU7bdo0lgnuVFCQunfvHrO8S5cu2u+KghxrFLEsOzv7n3/+4XDOrywjI2Pu3LlqF9F5EZ+RBPgzaCy7efPmmDFj1N6lBgN78uSJ8udE4fPnz97e3nfv3tX+PKZhw4bDhw+nj5lKOf2h6Sii0xkVnQNt3LhR7aJZs2YVLFhQm0rGjx+vcjikgxy1UMs29OzZs0SJEswJ4A4fPpycnCziYDagQsoTMWEnBNHJr06p3ORJSEjYvHmzll/L9F7lbpEK5ubm2j9rL9SxRnl816tXr/KMZb///rumxzDXrFkj7heLgWLZq1evpk6dunPnTtG734Lc0qVLNY3aSp+WZcuWqRxU2NH6ly9fZj7VQh9pCm0NGjTQsp7ffvtN7aCFVMOQIUO0qWHRokWUBZVLqlatqnZwRU0o/NG2mF86mZmZ9HU2b9487asCiTDwlyx2QpCC2rVrT548mb7qVcpnz57dvXv3cuXK5VrDggUL/v33X2b5zJkztZ9zSahjjXLH4mvXrmm5dbWCgoLmz5+vdtHo0aNF7Owvp/dYRnF7w4YNc+bM0TRGMIhCU1dHuZMnT+pUm42NzdGjRz08PFQe7P/69auXl9epU6fq1KmTayV03Nq+fTuz3NbWdseOHdp0EDxy5Aiz28TcuXN1HVZg+PDh9FXC7Er4xx9/0PeRlhftJML0OkRKHHZC02O8HyIKH6dPn1aJVh8/fqRYdunSJfbuWfv27VM7LCWdac+aNUv7Ngh1rFG+WhYuU79+fe2bIff9+/c1a9ZMmTJFMYKgsqZNm+p0+qQn+o1lV69eHTNmTFRUlF63oj3j/XQJ7uXLl5yXquXi4kIfsI4dO6rMMvbq1auWLVvSAYalE+W7d+/Gjh27Z88e5iJzc/O9e/dWq1Yt1wYkJCQMGTKEeTmWw6lP+fLl6RcJDg5WKaf/loMHD/7888+6Vgh6wuc+pj6u3GMnBEmh+B4UFERBKjExUbk8MjJSPqlxlSpVmO+iHdjf35/OLphHzMqVKwcGBpqZmWnfBqGONcqxLD093cPDo0WLFj4+PnTmr+WQtnSE8vPzozyndilVSB837Xvd6Y++YllSUtKkSZPogKpcWLt2belENHHR7k67Y4IGmt5lZ2dXpkwZZ3VKliyp0/GJ1o+Pj2dZqtvvI9O4ceOzZ8/SeZjKJ+3Tp0++vr6rV6/+9ddfKaLRFwH9IqmpqbTao0ePjhw5Ql8czPEz88lGE9i/f3+nTp202Tp93tRekVV7VpQrCpHMIyJZu3YtjoigCXZCkBo6ZJw+fbp9+/Z0UFYuv3v3bq1atfr379+rV686deo4Ojp+/vw5JibmwoULmzZtUjsxedWqVakqWlOnBgh1rGHOHX5ZhjJio0aNGjRoQL9FjRo1qHn29vaWlpZfv36lowxt+sGDBzdv3qSjjEo2Vda3b9/t27fTu7RsjF4JH8voC2jVqlULFiygg7G8pGzZsv369aM/P+0EQo1VYaSmT59+8eJFCl7JycnMOcty9fHjx4cyzEXm5ualSpWifEZn2No8/9yhQ4etW7dqWqrTk5jK6ITjzp07tIszh5ahzzn9+tpXRadl+/bt0+bupxzFO7XlXbt2XbZsGftIUUz031i+fPnY2FiV8rCwMPp/dnV1pXMM+b+0V0vhBCvPklTHf+yEIEG0e4SGhnbp0kXlskhmZuafMtpU4unpefDgwWLFium6daGONcxYJkdH0msyujZMjmLc6tWrJXWeI3wso7/x1KlT6YeiRYv27t2b0phRzzAvLNp16CtVHzVTGo6Xof92bdanhLR37960tDTmIhsbG/lfkBsnJyc6g9mxY8eMGTMofXKowcrKatKkSdOmTdNp8FhNvW0oJo4dO1btM94s6Eg/YsQI+hWYi1JSUkJk5C/PnDnTtm1bnSoHU4WdEKSpbNmy4eHhfn5+dHqg67VbOzs7f39/2hW5bVqoY42mWMYZRcxx48ZNnDiR/xBowhI+ltFJW8+ePX/55RdKwTiBk6wKFSrQR8Xb21vlGRna9ffv30/n6DzrHzRoUN++fffs2bN582ZNE1wwubi4DBw4cPjw4Rymv+3RowdtS+0iOlnUtTYyZMiQefPmZWRksK/GrXIwSdgJQbLocLxo0SL6dl2+fPnOnTsVt7NYUJgbPXr0qFGj+AQXoY41M2fO9PT0lN+4pGPK58+fubWHzvZbtmz5888/9+7dW5qTzAofy3xkBK/WNAg1a4QgunTp8u+//y5evPjs2bOvXr0qWbJk+/btp02bVqlSJUHqt7S0/FUmMTGRzubDwsIePnz4/PnzDx8+0DeCmZkZfTwoftEnv2rVqvXq1WvRogX9wHlzG2UEablc8eLFNY0BDZLC4T6mnkbqwU4IEkcxaN26dStWrAgJCblw4UJUVNTjx49TU1PpO5lym62tLR0IatSo4ebmRocDd3d3QTYqyLGGjheeMvKXMTEx8i49sbGxL1++TE5Opn/p4JIuI//UUOqidzk6OpYuXZp+cVdXV/qNGjVqJPELRpgTM0+rXLmy2jEphEUficEy+t4QAADkinJJJxmDbVHwY80PMjwHlZUmxDIAAAAASUAsAwCjJ6nnMQEAOEMsAwAAAJAExDIAMAW4YAYAJgCxDAAAAEASEMsAAAAAJAGxDABMhJb3MfU0aBkAAH95K5ZdunQpMjLy8ePHz549S0xMTElJ+fDhQ0ZGhrm5eZEiRWxtbe3s7FxcXFxdXd3c3Fq0aFG4cGGxmwwAAAB5Rd6KZYoBglVQMnstQz9Tbtu/f38+2dQQPXr0GDRoUOvWrQ3aSgDgKtcLZrhUBgBSlrdimU4+f/68W6Zr164bNmxwdnYWu0UAAABgyvJELKtZs6b8BxsbGw8Pjzp16ri4uJQvX75IkSJWVlZZWVlfvnxJSUl5+vRpZGRkcHDwtWvXlN8eGBh48eLFAwcOtG/fXozmA4AOWC6Y4VIZAEhcnohlUVFRLEsLylBEq1y5MgWvqVOn3r17d9asWSdOnFCs8/Hjx27dup07d65Zs2b6by8A8KKIX4p8hkAGAEYhT8QyXbm6ugYGBs6fP3/evHmKwoyMDG9v74cPH9rZ2YnWMgDQBdIYABgXxDKN5syZQyFM3v1fLjk5eeHChcuWLROxVQAAAGCqEMvYrF+//ujRoxkZGYqSzZs3z5s3DwNnAAAAgOAQy9g4ODh06tTp2LFjipK0tLQTJ054e3uL1ygAAAAwTYhluWjXrp1yLMsnG5MWsQwAAAAEh1iWC8XgGgqRkZFiNAQAAABMHGJZLipWrKhSEhsbK0pLAAAAwLQhluXCxsZGpeT9+/eitAQAAABMG2JZLpixLDMzU5SWAAAAgGlDLMuF8ugYcvb29qK0BAAAAEwbYlkuPn36pFLi6OgoSksAAADAtCGW5SIlJUWlxMnJSZSWAAAAgGkz8VhmYWGRlZU1Z84c5dktdfLw4UOVkqZNm/JtFgAAAACDiccya2vrDx8+XLhwgXMsu337tkpJmzZt+DYLAAAAgMHEY1nhwoUplt28efPLly9WVlYcajh48KDyS0dHRw8PD4FaBwAAAPD/M6ZYFh4e7ufnd/v2bUpabm5u48aN69u3L/tbrK2t88mGtLh69Wq7du103eLJkyefPXumXDJq1Chzc2P6TwMAAABjYTQJ49SpU15eXtnZ2fKXoTIRERFLly5leVfhwoXlP5w/f17XWJaWlubr66tcUqpUqcmTJ+tUCQAAAICWjCaWzZ07V5HJFJYtW9axY8eWLVtqepf8ahm5cOGCTpt79+5dly5dlOdZKlCgwM6dO5mjywIAAAAIwmhiWVRUlNrydevWscQyxdWyiIiIKVOmDB8+vHLlyuwb+v79+/79+2fNmqVy+3LDhg1t27bVrdEAAAAAWhM+llGsSUlJSfj/xMfHK//MXN/Ozq5MmTLOzs7yfxU/0L/FixdXrGZjY5Oens58+/Xr11kao7halp2dvVzGxcWlffv2devWdXV1dXJyKlq0qJmZ2ZcvX5KTkx8/fky1HTp0iH5QqWTbtm3e3t5c/jsAAAAAtCN8LJs6dSqlH+3X//jx40MZ5qJ58+bNmTNH/vOgQYNWrFjBXOft27cslSuulik8ktG+eR06dFi/fn3FihW1fwsAAAAAB3q5WqaPqvz9/VNSUv766y+VdZjBS1nbtm0p8EVFRTH7pbGztLTs0aPHmDFjGjVqpNMbAQAAALgRPpYtkxG8WjMzs507dw4YMGDKlCmRkZGK8hIlSrC8a7DMhw8f7ty5I78mFxsbmyLz/v37dBlKbBYWFjY2Nk5OTj/88IOrq2vjxo1btmzJbZwzAAAAAG6Mpsu/XJs2bcLDw0eMGLF9+3Z5ibu7e67vKlKkSEsZ/TYOAAAAgAcji2X5ZJfNVq9erYhlzZo1E7c9AAAAAIIwvlhGPnz4IP/BwsICD0gCAACAaTDKWKbo+D9gwAAHBwdxGwMAAAAgCOOLZdeuXZs/fz79YG9v7+/vL3ZzAAAAAIRhTLEsIyNj9erVc+bMoR8KFiy4f/9+XCoDAAAAk2Ecsezhw4cUwrZs2ZKcnEwvCxUqtGvXrtatW4vdLgAAAADBGEcsq1mzpuLnsmXLHj58uF69eiK2BwAAAEBwxhHL5KytrSdNmjRlyhTFTJcAAAAAJsM4Ypmbm9ugQYP69++PzmQAAABgqowjlkVERIjdBAAAAAD9Mo5YBgAAAGDyEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEASEMsAAAAAJAGxDAAAAEAS/h+g1220bWzTvgAAAABJRU5ErkJggg==) 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) =2.3-1.5/10=0.08 қадамымен бөлеміз.
Алдымен 1-ші жолга мынаны енгіземіз:х; хi; 0,3xi+1,2; ![](data:image/png;base64,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) ; ![](data:image/png;base64,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) ; 1,6xi+ ![](data:image/png;base64,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) ; yi
А2-А12 ге дейін 0-ден 10-ға дейін сан енгіздім. В2 ұяшығына 1,5 ті жазамыз; ал В3 ұяшығына мына формуланы жазып =B3+0,08 В12ұяшығына дейін созамыз.
Енді С2 бағанасын толтыру үшін мына формуланы коямыз =0,3*B2+1,2 және оны С12 ге дейін созамыз.
Келесі Д2 бағанды толтыру үшін =КОРЕНЬ(C2) осыны теріп Д12-ге дейін созу керек. Ал Е2 ұяшық үшін мына формуланы жазамыз =КОРЕНЬ(B3*B3+0,5) оны Е12-ге дейін тартамыз. Келесі F2 бағанасы үшін мына формула =1,6*B2+E2 , F12 дейін. Соңғы баған G2-ні толтыруға Д2/ F2ге ол G12-ге дейін созылады.
Кестеден S 1 = =2.6997; S 2= ![](data:image/png;base64,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) =2.6091 мәндерін табамыз. Енді интегралдың жуық мәнін табамыз. Алдымен сол тіктөрбұрыштар формуласынан мынаны аламыз:
І 1=һ* =0,08*2.6997=0.2158;
Оң тіктөртбұрыштар формуласынан мынаны: І 2=һ* ![](data:image/png;base64,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) =0.08*2.6091=0.2087 табамыз.
Осы мәндер
Соңғы мәнді табу үшін табылған мәндердің қосындысының жартысын табу керек:
І= І1+ І2/2=0.212
Достарыңызбен бөлісу: |