file: добавлены assets, Prog1, Perem

2026-02-11 12:28:34 +03:00
--- a/ТЕМА1/Perem
+++ b/ТЕМА1/Perem
@@ -0,0 +1,351 @@
 # Created by Octave 8.3.0, Wed Feb 11 12:16:26 2026 GMT <unknown@w10prog-84>
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 This is a symbols vector
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--- a/ТЕМА1/Prog1.m
+++ b/ТЕМА1/Prog1.m
@@ -0,0 +1,5 @@
 D1=D(3,5)
 D2=D(3,4:end)
 D3=D(2:3,3:5)
 D4=D(16:20)
 D5=D(3:4,[1,3,6])
--- a/ТЕМА1/report.md
+++ b/ТЕМА1/report.md
@@ -0,0 +1,418 @@
 #ОТЧЁТ
 ##2
 ##3
 ##4
 ##5
 >> help randn
 'randn' is a built-in function from the file libinterp/corefcn/rand.cc
 -- X = randn (N)
 -- X = randn (M, N, ...)
 -- X = randn ([M N ...])
 -- X = randn (..., "single")
 -- X = randn (..., "double")
 -- V = randn ("state")
 -- randn ("state", V)
 -- randn ("state", "reset")
 -- V = randn ("seed")
 -- randn ("seed", V)
 -- randn ("seed", "reset")
     Return a matrix with normally distributed random elements having
     zero mean and variance one.
 ##6
 матрица А со случайными, нормально распределенными элементами, с 4 строками и 6 столбцами
 >> A=randn(4,6)
 A =
  -0.7052  -0.8818  -1.1144  -0.4998   0.8084  -0.8141
  -0.7136   0.2865  -0.2747  -1.9414  -0.6845  -0.4213
  -0.9317   0.4764  -1.1302   0.2482  -1.3404  -0.6040
  -2.0625   1.1710   0.2332  -0.1656   0.3384  -1.2633
  матрица В 4х7 со случайными элементами, равномерно распределенными в диапазоне от 0 до 
  >> B=rand(4,7)
 B =
   0.302148   0.404094   0.234567   0.840058   0.376967   0.056362   0.878047
   0.432837   0.917329   0.366490   0.251031   0.275377   0.231369   0.144644
   0.838462   0.839366   0.019972   0.766134   0.849156   0.936181   0.652944
   0.910177   0.241217   0.295250   0.365846   0.103967   0.640409   0.132252
 вектор С с целыми числами от 4 до 27
 >> C = 4:27
 C =
    4    5    6    7    8    9   10   11   12   13   14   15   16   17   18   19   20   21   22   23   24   25   26   27
 - символьный вектор Н
 >> H="This is a symbols vector"
 H = This is a symbols vector
 - вектор-строка L с 2 комплексными элементами
 >> L=[-2+23.1j, 3-5.6j]
 L =
   -2.0000 + 23.1000i    3.0000 -  5.6000i
  ##7
  преобразование матрицы С в матрицу с 6 столбцами
  >> D=reshape(C,[],6)
 D =
    4    8   12   16   20   24
    5    9   13   17   21   25
    6   10   14   18   22   26
    7   11   15   19   23   27
 - матричное перемножение  В и А с транспонированием матрицы В (число столбцов в В должно совпадать с числом строк в А)
 >> E=B'*A
 E =
  -3.180346   1.322897  -1.191036  -0.933906  -0.867910  -2.084580
  -2.219046   0.588858  -1.594785  -1.814432  -1.344676  -1.527155
  -1.054488   0.253421  -0.315813  -0.872676   0.011914  -0.730410
  -2.239845   0.124593  -1.785729  -0.777626  -0.395859  -1.714559
  -1.467883   0.272803  -1.431254  -0.529445  -0.986784  -1.067140
  -2.397905   1.212558  -1.035136  -0.350995  -1.150975  -1.517838
  -1.603472  -0.266859  -1.725379  -0.579492  -0.219650  -1.337202
  - создание матрицы путем «горизонтального» соединения матриц А и В (числа строк у соединяемых матриц должны совпадать)
  >> F=[A,B]
 F =
 Columns 1 through 9:
  -0.705157  -0.881795  -1.114405  -0.499831   0.808407  -0.814087   0.302148   0.404094   0.234567
  -0.713565   0.286495  -0.274745  -1.941373  -0.684453  -0.421308   0.432837   0.917329   0.366490
  -0.931664   0.476435  -1.130236   0.248249  -1.340418  -0.604009   0.838462   0.839366   0.019972
  -2.062523   1.171037   0.233207  -0.165606   0.338372  -1.263280   0.910177   0.241217   0.295250
 Columns 10 through 13:
   0.840058   0.376967   0.056362   0.878047
   0.251031   0.275377   0.231369   0.144644
   0.766134   0.849156   0.936181   0.652944
   0.365846   0.103967   0.640409   0.132252
   - поэлементное перемножение матриц A и D (размеры матриц должны совпадать)
    G=A.*D
 G =
   -2.8206   -7.0544  -13.3729   -7.9973   16.1681  -19.5381
   -3.5678    2.5785   -3.5717  -33.0033  -14.3735  -10.5327
   -5.5900    4.7644  -15.8233    4.4685  -29.4892  -15.7042
  -14.4377   12.8814    3.4981   -3.1465    7.7826  -34.1085
  поэлементное деление элементов матрицы G на 4.5
   M=G./4.5
 M =
  -0.6268  -1.5676  -2.9717  -1.7772   3.5929  -4.3418
  -0.7929   0.5730  -0.7937  -7.3341  -3.1941  -2.3406
  -1.2422   1.0587  -3.5163   0.9930  -6.5532  -3.4898
  -3.2084   2.8625   0.7774  -0.6992   1.7295  -7.5797
 поэлементное возведение в степень элементов матрицы D
 >> DDD=D.^3
 DDD =
      64     512    1728    4096    8000   13824
     125     729    2197    4913    9261   15625
     216    1000    2744    5832   10648   17576
     343    1331    3375    6859   12167   19683
 создание логической матрицы, совпадающей по размерам с D  и с элементами по заданному условию
 >> DL=D>=20
 DL =
  0  0  0  0  1  1
  0  0  0  0  1  1
  0  0  0  0  1  1
  0  0  0  0  1  1
 превращение матрицы в вектор-столбец
 Dstolb=D(:)
 Dstolb =
    4
    5
    6
    7
    8
    9
   10
   11
   12
   13
   14
   15
   16
   17
   18
   19
   20
   21
   22
   23
   24
   25
   26
   27
   ##8
   математические функции:
    B1=sqrt(B)
 B1 =
   0.5497   0.6357   0.4843   0.9165   0.6140   0.2374   0.9370
   0.6579   0.9578   0.6054   0.5010   0.5248   0.4810   0.3803
   0.9157   0.9162   0.1413   0.8753   0.9215   0.9676   0.8080
   0.9540   0.4911   0.5434   0.6049   0.3224   0.8003   0.3637
   >> B2=log(B)
 B2 =
  -1.196838  -0.906107  -1.450013  -0.174285  -0.975597  -2.875958  -0.130055
  -0.837393  -0.086289  -1.003783  -1.382178  -1.289614  -1.463741  -1.933480
  -0.176186  -0.175109  -3.913414  -0.266398  -0.163512  -0.065946  -0.426264
  -0.094116  -1.422060  -1.219933  -1.005544  -2.263684  -0.445649  -2.023044
 B3=sin(B)
 B3 =
   0.297572   0.393186   0.232422   0.744682   0.368102   0.056332   0.769493
   0.419448   0.793981   0.358341   0.248403   0.271910   0.229310   0.144140
   0.743616   0.744220   0.019971   0.693355   0.750723   0.805300   0.607527
   0.789613   0.238884   0.290979   0.357739   0.103780   0.597523   0.131867
   операции с матрицами
   >> k=length(B1)
 k = 7
 >> nm=size(B1)
 nm =
   4   7
 >> elem=numel(B1)
 elem = 28
 >> NN=linspace(11.5,34.1,20)
 NN =
 Columns 1 through 15:
   11.500   12.689   13.879   15.068   16.258   17.447   18.637   19.826   21.016   22.205   23.395   24.584   25.774   26.963   28.153
 Columns 16 through 20:
   29.342   30.532   31.721   32.911   34.100
 >> FF=ones(2,4)
 FF =
   1   1   1   1
   1   1   1   1
 >> GG=zeros(5)
 GG =
   0   0   0   0   0
   0   0   0   0   0
   0   0   0   0   0
   0   0   0   0   0
   0   0   0   0   0
 >> B1D=diag(B1)
 B1D =
   0.5497
   0.9578
   0.1413
   0.6049
 >> DB=diag(B1D)
 DB =
 Diagonal Matrix
   0.5497        0        0        0
        0   0.9578        0        0
        0        0   0.1413        0
        0        0        0   0.6049
 >> BS1=sort(B)
 BS1 =
   0.302148   0.241217   0.019972   0.251031   0.103967   0.056362   0.132252
   0.432837   0.404094   0.234567   0.365846   0.275377   0.231369   0.144644
   0.838462   0.839366   0.295250   0.766134   0.376967   0.640409   0.652944
   0.910177   0.917329   0.366490   0.840058   0.849156   0.936181   0.878047
 >> BS2=sortrows(B,2)
 BS2 =
   0.910177   0.241217   0.295250   0.365846   0.103967   0.640409   0.132252
   0.302148   0.404094   0.234567   0.840058   0.376967   0.056362   0.878047
   0.838462   0.839366   0.019972   0.766134   0.849156   0.936181   0.652944
   0.432837   0.917329   0.366490   0.251031   0.275377   0.231369   0.144644
 >> DS1=sum(D)
 DS1 =
    22    38    54    70    86   102
 >> DS2=sum(D,2)
 DS2 =
    84
    90
    96
   102
 >> DP1=prod(D)
 DP1 =
      840     7920    32760    93024   212520   421200
 >> dt=det(A*A')
 dt = 407.92
 >> dinv=inv(A*A')
 dinv =
   2.7761e-01  -5.1542e-02  -5.5301e-03  -3.9597e-02
  -5.1542e-02   2.5608e-01  -6.5104e-02  -4.9109e-02
  -5.5301e-03  -6.5104e-02   2.8356e-01  -7.3056e-02
  -3.9597e-02  -4.9109e-02  -7.3056e-02   1.8320e-01
  ##9
  Изучите работу с индексацией элементов матриц.
  >> D1=D(3,5)
 D1 = 22
 >> D2=D(3,4:end)
 D2 =
   18   22   26
 >> D3=D(2:3,3:5)
 D3 =
   13   17   21
   14   18   22
 >> D4=D(16:20)
 D4 =
   19   20   21   22   23
 >> D5=D(3:4,[1,3,6])
 D5 =
    6   14   26
    7   15   27
 ##10
 цикл по перечислению
 >> Dsum=0
 Dsum = 0
 >> for i=1:6
 Dsum=Dsum+sqrt(D(2,i))
 endfor
 Dsum = 2.2361
 Dsum = 5.2361
 Dsum = 8.8416
 Dsum = 12.965
 Dsum = 17.547
 Dsum = 22.547
 - цикл пока выполняется условие
 >> Dsum2=0;i=1
 i = 1
 >> while (D(i)<22)
 Dsum2=Dsum2+sin(D(i))
 i=i+1
 endwhile
 Dsum2 = -0.7568
 i = 2
 Dsum2 = -1.7157
 i = 3
 Dsum2 = -1.9951
 i = 4
 Dsum2 = -1.3382
 i = 5
 Dsum2 = -0.3488
 i = 6
 Dsum2 = 0.063321
 i = 7
 Dsum2 = -0.4807
 i = 8
 Dsum2 = -1.4807
 i = 9
 Dsum2 = -2.0173
 i = 10
 Dsum2 = -1.5971
 i = 11
 Dsum2 = -0.6065
 i = 12
 Dsum2 = 0.043799
 i = 13
 Dsum2 = -0.2441
 i = 14
 Dsum2 = -1.2055
 i = 15
 Dsum2 = -1.9565
 i = 16
 Dsum2 = -1.8066
 i = 17
 Dsum2 = -0.8937
 i = 18
 Dsum2 = -0.057011
 i = 19
 условие if
 if (D(3,5)>=20)
 printf('D(3,5)>=20')
 else
 printf('D(3,5)<20')
 endif
 D(3,5)>=20>
 ##11
 рассмотрите функцию построения графиков
 >> plot(D(1,:),B([2,4],1:6))
 примените функцию расчета и построения гистограммы
 hist(A(:),6)
 >>pie(C)
 >> bar(C)
 ##12
 >> Prog1
 D1 = 22
 D2 =
   18   22   26
 D3 =
   13   17   21
   14   18   22
 D4 =
   19   20   21   22   23
 D5 =
    6   14   26
    7   15   27
 ##13
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