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<?php function printTable($matrix) { $table = '<table border="1">'; $rows = count($matrix); for ($i = 0; $i < $rows; $i++) { $cols = count($matrix[$i]); $table .= '<tr>'; for ($j = 0; $j < $cols; $j++) { $table .= '<td>' . $matrix[$i][$j] . '</td>'; } $table .= '</tr>'; } $table .= '</table>'; echo $table; } function createMatrix($x, $y) { $matrix = []; for ($i = 0; $i < $x; $i++) { $row = []; for ($j = 0; $j < $y; $j++) { $row[] = rand(1, 100); } $matrix[] = $row; } return $matrix; } function transposeArray($array) { $i = 0; $transpose = []; while ($columns = array_column($array, $i++)) { $transpose[] = $columns; } return $transpose; } $table = createMatrix(10, 5); echo 'Matrix<br/>'; printTable($table); echo '<br/><br/><br/>'; echo 'Transposed Matrix<br/>'; $table = transposeArray($table); printTable($table);
Output for 7.2.0
Matrix<br/><table border="1"><tr><td>14</td><td>79</td><td>72</td><td>80</td><td>84</td></tr><tr><td>11</td><td>18</td><td>39</td><td>92</td><td>69</td></tr><tr><td>51</td><td>71</td><td>66</td><td>38</td><td>26</td></tr><tr><td>100</td><td>88</td><td>89</td><td>79</td><td>8</td></tr><tr><td>65</td><td>26</td><td>72</td><td>26</td><td>23</td></tr><tr><td>45</td><td>63</td><td>99</td><td>48</td><td>5</td></tr><tr><td>62</td><td>10</td><td>48</td><td>15</td><td>13</td></tr><tr><td>100</td><td>5</td><td>36</td><td>81</td><td>72</td></tr><tr><td>51</td><td>15</td><td>26</td><td>53</td><td>41</td></tr><tr><td>21</td><td>62</td><td>61</td><td>15</td><td>57</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>14</td><td>11</td><td>51</td><td>100</td><td>65</td><td>45</td><td>62</td><td>100</td><td>51</td><td>21</td></tr><tr><td>79</td><td>18</td><td>71</td><td>88</td><td>26</td><td>63</td><td>10</td><td>5</td><td>15</td><td>62</td></tr><tr><td>72</td><td>39</td><td>66</td><td>89</td><td>72</td><td>99</td><td>48</td><td>36</td><td>26</td><td>61</td></tr><tr><td>80</td><td>92</td><td>38</td><td>79</td><td>26</td><td>48</td><td>15</td><td>81</td><td>53</td><td>15</td></tr><tr><td>84</td><td>69</td><td>26</td><td>8</td><td>23</td><td>5</td><td>13</td><td>72</td><td>41</td><td>57</td></tr></table>
Output for 7.1.12
Matrix<br/><table border="1"><tr><td>45</td><td>16</td><td>30</td><td>81</td><td>86</td></tr><tr><td>20</td><td>71</td><td>40</td><td>37</td><td>94</td></tr><tr><td>26</td><td>98</td><td>96</td><td>41</td><td>55</td></tr><tr><td>62</td><td>50</td><td>14</td><td>68</td><td>70</td></tr><tr><td>90</td><td>50</td><td>6</td><td>30</td><td>64</td></tr><tr><td>26</td><td>2</td><td>29</td><td>39</td><td>65</td></tr><tr><td>70</td><td>31</td><td>7</td><td>34</td><td>73</td></tr><tr><td>20</td><td>18</td><td>50</td><td>32</td><td>29</td></tr><tr><td>59</td><td>99</td><td>38</td><td>80</td><td>8</td></tr><tr><td>16</td><td>32</td><td>56</td><td>18</td><td>11</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>45</td><td>20</td><td>26</td><td>62</td><td>90</td><td>26</td><td>70</td><td>20</td><td>59</td><td>16</td></tr><tr><td>16</td><td>71</td><td>98</td><td>50</td><td>50</td><td>2</td><td>31</td><td>18</td><td>99</td><td>32</td></tr><tr><td>30</td><td>40</td><td>96</td><td>14</td><td>6</td><td>29</td><td>7</td><td>50</td><td>38</td><td>56</td></tr><tr><td>81</td><td>37</td><td>41</td><td>68</td><td>30</td><td>39</td><td>34</td><td>32</td><td>80</td><td>18</td></tr><tr><td>86</td><td>94</td><td>55</td><td>70</td><td>64</td><td>65</td><td>73</td><td>29</td><td>8</td><td>11</td></tr></table>
Output for 7.1.11
Matrix<br/><table border="1"><tr><td>25</td><td>44</td><td>95</td><td>85</td><td>24</td></tr><tr><td>59</td><td>83</td><td>61</td><td>79</td><td>19</td></tr><tr><td>89</td><td>59</td><td>37</td><td>31</td><td>10</td></tr><tr><td>57</td><td>68</td><td>51</td><td>74</td><td>3</td></tr><tr><td>39</td><td>10</td><td>94</td><td>38</td><td>95</td></tr><tr><td>79</td><td>11</td><td>75</td><td>34</td><td>90</td></tr><tr><td>35</td><td>98</td><td>42</td><td>83</td><td>58</td></tr><tr><td>90</td><td>57</td><td>58</td><td>73</td><td>41</td></tr><tr><td>66</td><td>96</td><td>3</td><td>2</td><td>13</td></tr><tr><td>31</td><td>65</td><td>42</td><td>87</td><td>19</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>25</td><td>59</td><td>89</td><td>57</td><td>39</td><td>79</td><td>35</td><td>90</td><td>66</td><td>31</td></tr><tr><td>44</td><td>83</td><td>59</td><td>68</td><td>10</td><td>11</td><td>98</td><td>57</td><td>96</td><td>65</td></tr><tr><td>95</td><td>61</td><td>37</td><td>51</td><td>94</td><td>75</td><td>42</td><td>58</td><td>3</td><td>42</td></tr><tr><td>85</td><td>79</td><td>31</td><td>74</td><td>38</td><td>34</td><td>83</td><td>73</td><td>2</td><td>87</td></tr><tr><td>24</td><td>19</td><td>10</td><td>3</td><td>95</td><td>90</td><td>58</td><td>41</td><td>13</td><td>19</td></tr></table>
Output for 7.1.10
Matrix<br/><table border="1"><tr><td>86</td><td>70</td><td>57</td><td>36</td><td>90</td></tr><tr><td>35</td><td>72</td><td>1</td><td>91</td><td>60</td></tr><tr><td>42</td><td>20</td><td>63</td><td>33</td><td>77</td></tr><tr><td>37</td><td>19</td><td>15</td><td>100</td><td>34</td></tr><tr><td>28</td><td>43</td><td>19</td><td>74</td><td>50</td></tr><tr><td>26</td><td>77</td><td>71</td><td>2</td><td>45</td></tr><tr><td>26</td><td>84</td><td>63</td><td>64</td><td>14</td></tr><tr><td>53</td><td>2</td><td>68</td><td>89</td><td>68</td></tr><tr><td>30</td><td>56</td><td>80</td><td>90</td><td>52</td></tr><tr><td>72</td><td>100</td><td>17</td><td>17</td><td>3</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>86</td><td>35</td><td>42</td><td>37</td><td>28</td><td>26</td><td>26</td><td>53</td><td>30</td><td>72</td></tr><tr><td>70</td><td>72</td><td>20</td><td>19</td><td>43</td><td>77</td><td>84</td><td>2</td><td>56</td><td>100</td></tr><tr><td>57</td><td>1</td><td>63</td><td>15</td><td>19</td><td>71</td><td>63</td><td>68</td><td>80</td><td>17</td></tr><tr><td>36</td><td>91</td><td>33</td><td>100</td><td>74</td><td>2</td><td>64</td><td>89</td><td>90</td><td>17</td></tr><tr><td>90</td><td>60</td><td>77</td><td>34</td><td>50</td><td>45</td><td>14</td><td>68</td><td>52</td><td>3</td></tr></table>
Output for 7.1.9
Matrix<br/><table border="1"><tr><td>98</td><td>29</td><td>96</td><td>22</td><td>72</td></tr><tr><td>67</td><td>40</td><td>89</td><td>2</td><td>31</td></tr><tr><td>37</td><td>18</td><td>36</td><td>94</td><td>63</td></tr><tr><td>35</td><td>52</td><td>74</td><td>33</td><td>20</td></tr><tr><td>44</td><td>88</td><td>23</td><td>21</td><td>7</td></tr><tr><td>98</td><td>98</td><td>88</td><td>78</td><td>46</td></tr><tr><td>72</td><td>79</td><td>94</td><td>100</td><td>1</td></tr><tr><td>17</td><td>44</td><td>100</td><td>13</td><td>56</td></tr><tr><td>25</td><td>16</td><td>51</td><td>7</td><td>59</td></tr><tr><td>13</td><td>53</td><td>70</td><td>10</td><td>53</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>98</td><td>67</td><td>37</td><td>35</td><td>44</td><td>98</td><td>72</td><td>17</td><td>25</td><td>13</td></tr><tr><td>29</td><td>40</td><td>18</td><td>52</td><td>88</td><td>98</td><td>79</td><td>44</td><td>16</td><td>53</td></tr><tr><td>96</td><td>89</td><td>36</td><td>74</td><td>23</td><td>88</td><td>94</td><td>100</td><td>51</td><td>70</td></tr><tr><td>22</td><td>2</td><td>94</td><td>33</td><td>21</td><td>78</td><td>100</td><td>13</td><td>7</td><td>10</td></tr><tr><td>72</td><td>31</td><td>63</td><td>20</td><td>7</td><td>46</td><td>1</td><td>56</td><td>59</td><td>53</td></tr></table>
Output for 7.1.8
Matrix<br/><table border="1"><tr><td>53</td><td>38</td><td>17</td><td>31</td><td>63</td></tr><tr><td>6</td><td>25</td><td>67</td><td>19</td><td>89</td></tr><tr><td>23</td><td>78</td><td>33</td><td>6</td><td>14</td></tr><tr><td>36</td><td>93</td><td>48</td><td>83</td><td>15</td></tr><tr><td>42</td><td>95</td><td>2</td><td>89</td><td>52</td></tr><tr><td>88</td><td>95</td><td>68</td><td>36</td><td>35</td></tr><tr><td>30</td><td>38</td><td>71</td><td>87</td><td>74</td></tr><tr><td>67</td><td>50</td><td>64</td><td>8</td><td>67</td></tr><tr><td>78</td><td>33</td><td>48</td><td>20</td><td>88</td></tr><tr><td>48</td><td>98</td><td>11</td><td>32</td><td>58</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>53</td><td>6</td><td>23</td><td>36</td><td>42</td><td>88</td><td>30</td><td>67</td><td>78</td><td>48</td></tr><tr><td>38</td><td>25</td><td>78</td><td>93</td><td>95</td><td>95</td><td>38</td><td>50</td><td>33</td><td>98</td></tr><tr><td>17</td><td>67</td><td>33</td><td>48</td><td>2</td><td>68</td><td>71</td><td>64</td><td>48</td><td>11</td></tr><tr><td>31</td><td>19</td><td>6</td><td>83</td><td>89</td><td>36</td><td>87</td><td>8</td><td>20</td><td>32</td></tr><tr><td>63</td><td>89</td><td>14</td><td>15</td><td>52</td><td>35</td><td>74</td><td>67</td><td>88</td><td>58</td></tr></table>
Output for 7.1.7
Matrix<br/><table border="1"><tr><td>72</td><td>9</td><td>50</td><td>66</td><td>15</td></tr><tr><td>15</td><td>89</td><td>2</td><td>56</td><td>94</td></tr><tr><td>79</td><td>13</td><td>99</td><td>31</td><td>96</td></tr><tr><td>51</td><td>80</td><td>23</td><td>54</td><td>73</td></tr><tr><td>76</td><td>76</td><td>33</td><td>57</td><td>94</td></tr><tr><td>54</td><td>42</td><td>68</td><td>45</td><td>85</td></tr><tr><td>35</td><td>46</td><td>52</td><td>88</td><td>2</td></tr><tr><td>51</td><td>78</td><td>77</td><td>84</td><td>89</td></tr><tr><td>95</td><td>62</td><td>58</td><td>61</td><td>53</td></tr><tr><td>64</td><td>6</td><td>33</td><td>68</td><td>92</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>72</td><td>15</td><td>79</td><td>51</td><td>76</td><td>54</td><td>35</td><td>51</td><td>95</td><td>64</td></tr><tr><td>9</td><td>89</td><td>13</td><td>80</td><td>76</td><td>42</td><td>46</td><td>78</td><td>62</td><td>6</td></tr><tr><td>50</td><td>2</td><td>99</td><td>23</td><td>33</td><td>68</td><td>52</td><td>77</td><td>58</td><td>33</td></tr><tr><td>66</td><td>56</td><td>31</td><td>54</td><td>57</td><td>45</td><td>88</td><td>84</td><td>61</td><td>68</td></tr><tr><td>15</td><td>94</td><td>96</td><td>73</td><td>94</td><td>85</td><td>2</td><td>89</td><td>53</td><td>92</td></tr></table>
Output for 7.1.6
Matrix<br/><table border="1"><tr><td>42</td><td>21</td><td>86</td><td>61</td><td>51</td></tr><tr><td>39</td><td>41</td><td>10</td><td>49</td><td>81</td></tr><tr><td>89</td><td>60</td><td>76</td><td>59</td><td>14</td></tr><tr><td>76</td><td>33</td><td>56</td><td>87</td><td>27</td></tr><tr><td>55</td><td>56</td><td>80</td><td>13</td><td>75</td></tr><tr><td>71</td><td>3</td><td>41</td><td>35</td><td>32</td></tr><tr><td>10</td><td>16</td><td>89</td><td>100</td><td>19</td></tr><tr><td>83</td><td>90</td><td>91</td><td>39</td><td>70</td></tr><tr><td>16</td><td>85</td><td>91</td><td>12</td><td>85</td></tr><tr><td>59</td><td>62</td><td>83</td><td>32</td><td>45</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>42</td><td>39</td><td>89</td><td>76</td><td>55</td><td>71</td><td>10</td><td>83</td><td>16</td><td>59</td></tr><tr><td>21</td><td>41</td><td>60</td><td>33</td><td>56</td><td>3</td><td>16</td><td>90</td><td>85</td><td>62</td></tr><tr><td>86</td><td>10</td><td>76</td><td>56</td><td>80</td><td>41</td><td>89</td><td>91</td><td>91</td><td>83</td></tr><tr><td>61</td><td>49</td><td>59</td><td>87</td><td>13</td><td>35</td><td>100</td><td>39</td><td>12</td><td>32</td></tr><tr><td>51</td><td>81</td><td>14</td><td>27</td><td>75</td><td>32</td><td>19</td><td>70</td><td>85</td><td>45</td></tr></table>
Output for 7.1.5
Matrix<br/><table border="1"><tr><td>69</td><td>30</td><td>26</td><td>74</td><td>75</td></tr><tr><td>20</td><td>55</td><td>42</td><td>97</td><td>13</td></tr><tr><td>19</td><td>33</td><td>30</td><td>11</td><td>13</td></tr><tr><td>53</td><td>79</td><td>65</td><td>9</td><td>5</td></tr><tr><td>83</td><td>45</td><td>20</td><td>32</td><td>95</td></tr><tr><td>48</td><td>74</td><td>66</td><td>34</td><td>59</td></tr><tr><td>76</td><td>34</td><td>2</td><td>39</td><td>96</td></tr><tr><td>63</td><td>28</td><td>80</td><td>14</td><td>77</td></tr><tr><td>59</td><td>54</td><td>31</td><td>42</td><td>74</td></tr><tr><td>27</td><td>99</td><td>63</td><td>46</td><td>12</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>69</td><td>20</td><td>19</td><td>53</td><td>83</td><td>48</td><td>76</td><td>63</td><td>59</td><td>27</td></tr><tr><td>30</td><td>55</td><td>33</td><td>79</td><td>45</td><td>74</td><td>34</td><td>28</td><td>54</td><td>99</td></tr><tr><td>26</td><td>42</td><td>30</td><td>65</td><td>20</td><td>66</td><td>2</td><td>80</td><td>31</td><td>63</td></tr><tr><td>74</td><td>97</td><td>11</td><td>9</td><td>32</td><td>34</td><td>39</td><td>14</td><td>42</td><td>46</td></tr><tr><td>75</td><td>13</td><td>13</td><td>5</td><td>95</td><td>59</td><td>96</td><td>77</td><td>74</td><td>12</td></tr></table>
Output for 7.1.4
Matrix<br/><table border="1"><tr><td>10</td><td>70</td><td>88</td><td>94</td><td>52</td></tr><tr><td>62</td><td>77</td><td>93</td><td>89</td><td>47</td></tr><tr><td>6</td><td>85</td><td>87</td><td>56</td><td>87</td></tr><tr><td>20</td><td>99</td><td>14</td><td>65</td><td>82</td></tr><tr><td>30</td><td>9</td><td>19</td><td>49</td><td>40</td></tr><tr><td>70</td><td>53</td><td>46</td><td>39</td><td>38</td></tr><tr><td>27</td><td>81</td><td>26</td><td>82</td><td>73</td></tr><tr><td>75</td><td>49</td><td>86</td><td>57</td><td>26</td></tr><tr><td>8</td><td>46</td><td>96</td><td>49</td><td>80</td></tr><tr><td>47</td><td>24</td><td>55</td><td>25</td><td>58</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>10</td><td>62</td><td>6</td><td>20</td><td>30</td><td>70</td><td>27</td><td>75</td><td>8</td><td>47</td></tr><tr><td>70</td><td>77</td><td>85</td><td>99</td><td>9</td><td>53</td><td>81</td><td>49</td><td>46</td><td>24</td></tr><tr><td>88</td><td>93</td><td>87</td><td>14</td><td>19</td><td>46</td><td>26</td><td>86</td><td>96</td><td>55</td></tr><tr><td>94</td><td>89</td><td>56</td><td>65</td><td>49</td><td>39</td><td>82</td><td>57</td><td>49</td><td>25</td></tr><tr><td>52</td><td>47</td><td>87</td><td>82</td><td>40</td><td>38</td><td>73</td><td>26</td><td>80</td><td>58</td></tr></table>
Output for 7.1.3
Matrix<br/><table border="1"><tr><td>74</td><td>73</td><td>57</td><td>99</td><td>72</td></tr><tr><td>4</td><td>7</td><td>41</td><td>38</td><td>26</td></tr><tr><td>36</td><td>97</td><td>82</td><td>98</td><td>4</td></tr><tr><td>40</td><td>83</td><td>48</td><td>46</td><td>32</td></tr><tr><td>93</td><td>17</td><td>74</td><td>31</td><td>11</td></tr><tr><td>70</td><td>49</td><td>42</td><td>30</td><td>59</td></tr><tr><td>70</td><td>44</td><td>36</td><td>79</td><td>38</td></tr><tr><td>41</td><td>88</td><td>14</td><td>38</td><td>15</td></tr><tr><td>77</td><td>78</td><td>79</td><td>66</td><td>44</td></tr><tr><td>73</td><td>84</td><td>36</td><td>83</td><td>32</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>74</td><td>4</td><td>36</td><td>40</td><td>93</td><td>70</td><td>70</td><td>41</td><td>77</td><td>73</td></tr><tr><td>73</td><td>7</td><td>97</td><td>83</td><td>17</td><td>49</td><td>44</td><td>88</td><td>78</td><td>84</td></tr><tr><td>57</td><td>41</td><td>82</td><td>48</td><td>74</td><td>42</td><td>36</td><td>14</td><td>79</td><td>36</td></tr><tr><td>99</td><td>38</td><td>98</td><td>46</td><td>31</td><td>30</td><td>79</td><td>38</td><td>66</td><td>83</td></tr><tr><td>72</td><td>26</td><td>4</td><td>32</td><td>11</td><td>59</td><td>38</td><td>15</td><td>44</td><td>32</td></tr></table>
Output for 7.1.2
Matrix<br/><table border="1"><tr><td>53</td><td>74</td><td>38</td><td>88</td><td>82</td></tr><tr><td>15</td><td>30</td><td>33</td><td>62</td><td>48</td></tr><tr><td>85</td><td>41</td><td>64</td><td>9</td><td>93</td></tr><tr><td>82</td><td>65</td><td>100</td><td>31</td><td>97</td></tr><tr><td>67</td><td>7</td><td>78</td><td>28</td><td>50</td></tr><tr><td>70</td><td>29</td><td>79</td><td>96</td><td>11</td></tr><tr><td>42</td><td>73</td><td>83</td><td>86</td><td>30</td></tr><tr><td>67</td><td>31</td><td>46</td><td>35</td><td>3</td></tr><tr><td>88</td><td>2</td><td>2</td><td>38</td><td>11</td></tr><tr><td>54</td><td>95</td><td>80</td><td>64</td><td>75</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>53</td><td>15</td><td>85</td><td>82</td><td>67</td><td>70</td><td>42</td><td>67</td><td>88</td><td>54</td></tr><tr><td>74</td><td>30</td><td>41</td><td>65</td><td>7</td><td>29</td><td>73</td><td>31</td><td>2</td><td>95</td></tr><tr><td>38</td><td>33</td><td>64</td><td>100</td><td>78</td><td>79</td><td>83</td><td>46</td><td>2</td><td>80</td></tr><tr><td>88</td><td>62</td><td>9</td><td>31</td><td>28</td><td>96</td><td>86</td><td>35</td><td>38</td><td>64</td></tr><tr><td>82</td><td>48</td><td>93</td><td>97</td><td>50</td><td>11</td><td>30</td><td>3</td><td>11</td><td>75</td></tr></table>
Output for 7.1.1
Matrix<br/><table border="1"><tr><td>70</td><td>10</td><td>94</td><td>93</td><td>52</td></tr><tr><td>83</td><td>29</td><td>35</td><td>12</td><td>27</td></tr><tr><td>77</td><td>67</td><td>3</td><td>26</td><td>16</td></tr><tr><td>28</td><td>51</td><td>82</td><td>86</td><td>87</td></tr><tr><td>92</td><td>40</td><td>40</td><td>62</td><td>54</td></tr><tr><td>91</td><td>96</td><td>53</td><td>78</td><td>57</td></tr><tr><td>32</td><td>31</td><td>78</td><td>85</td><td>35</td></tr><tr><td>86</td><td>17</td><td>26</td><td>45</td><td>98</td></tr><tr><td>73</td><td>93</td><td>99</td><td>65</td><td>58</td></tr><tr><td>6</td><td>46</td><td>10</td><td>75</td><td>96</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>70</td><td>83</td><td>77</td><td>28</td><td>92</td><td>91</td><td>32</td><td>86</td><td>73</td><td>6</td></tr><tr><td>10</td><td>29</td><td>67</td><td>51</td><td>40</td><td>96</td><td>31</td><td>17</td><td>93</td><td>46</td></tr><tr><td>94</td><td>35</td><td>3</td><td>82</td><td>40</td><td>53</td><td>78</td><td>26</td><td>99</td><td>10</td></tr><tr><td>93</td><td>12</td><td>26</td><td>86</td><td>62</td><td>78</td><td>85</td><td>45</td><td>65</td><td>75</td></tr><tr><td>52</td><td>27</td><td>16</td><td>87</td><td>54</td><td>57</td><td>35</td><td>98</td><td>58</td><td>96</td></tr></table>
Output for 7.1.0
Matrix<br/><table border="1"><tr><td>10</td><td>56</td><td>57</td><td>69</td><td>51</td></tr><tr><td>28</td><td>93</td><td>40</td><td>64</td><td>2</td></tr><tr><td>90</td><td>43</td><td>45</td><td>42</td><td>28</td></tr><tr><td>89</td><td>90</td><td>80</td><td>77</td><td>28</td></tr><tr><td>88</td><td>26</td><td>54</td><td>31</td><td>53</td></tr><tr><td>57</td><td>51</td><td>11</td><td>85</td><td>3</td></tr><tr><td>95</td><td>11</td><td>77</td><td>73</td><td>54</td></tr><tr><td>70</td><td>10</td><td>43</td><td>43</td><td>43</td></tr><tr><td>89</td><td>31</td><td>9</td><td>52</td><td>35</td></tr><tr><td>32</td><td>86</td><td>28</td><td>64</td><td>50</td></tr></table><br/><br/><br/>Transposed Matrix<br/><table border="1"><tr><td>10</td><td>28</td><td>90</td><td>89</td><td>88</td><td>57</td><td>95</td><td>70</td><td>89</td><td>32</td></tr><tr><td>56</td><td>93</td><td>43</td><td>90</td><td>26</td><td>51</td><td>11</td><td>10</td><td>31</td><td>86</td></tr><tr><td>57</td><td>40</td><td>45</td><td>80</td><td>54</td><td>11</td><td>77</td><td>43</td><td>9</td><td>28</td></tr><tr><td>69</td><td>64</td><td>42</td><td>77</td><td>31</td><td>85</td><td>73</td><td>43</td><td>52</td><td>64</td></tr><tr><td>51</td><td>2</td><td>28</td><td>28</td><td>53</td><td>3</td><td>54</td><td>43</td><td>35</td><td>50</td></tr></table>
preferences:
30.98 ms | 404 KiB | 19 Q