Find a determinant of a matrix $M_{(n)x(n)}$ depending on the $x,y,n in mathbb R$












1












$begingroup$


I had a matrix which I I transformed to zero as many matrix elements as possible and in this time I have: $$y^{n} cdot det begin{vmatrix}
frac{x}{y}+1 & 1 & ... & & & 1\
frac{-x}{y} & frac{x}{y} & & & & 0 \
. & 0 & frac{x}{y} & 0 & ... & . \
. & . & ... & & & . \
. & . & & & & . \
frac{-x}{y} & 0 & ... & & &frac{x}{y} \
end{vmatrix}
$$
Unfortunately I don't know what can I do to find a sollution at this moment. Can you help me with some tips?










share|cite|improve this question









$endgroup$

















    1












    $begingroup$


    I had a matrix which I I transformed to zero as many matrix elements as possible and in this time I have: $$y^{n} cdot det begin{vmatrix}
    frac{x}{y}+1 & 1 & ... & & & 1\
    frac{-x}{y} & frac{x}{y} & & & & 0 \
    . & 0 & frac{x}{y} & 0 & ... & . \
    . & . & ... & & & . \
    . & . & & & & . \
    frac{-x}{y} & 0 & ... & & &frac{x}{y} \
    end{vmatrix}
    $$
    Unfortunately I don't know what can I do to find a sollution at this moment. Can you help me with some tips?










    share|cite|improve this question









    $endgroup$















      1












      1








      1





      $begingroup$


      I had a matrix which I I transformed to zero as many matrix elements as possible and in this time I have: $$y^{n} cdot det begin{vmatrix}
      frac{x}{y}+1 & 1 & ... & & & 1\
      frac{-x}{y} & frac{x}{y} & & & & 0 \
      . & 0 & frac{x}{y} & 0 & ... & . \
      . & . & ... & & & . \
      . & . & & & & . \
      frac{-x}{y} & 0 & ... & & &frac{x}{y} \
      end{vmatrix}
      $$
      Unfortunately I don't know what can I do to find a sollution at this moment. Can you help me with some tips?










      share|cite|improve this question









      $endgroup$




      I had a matrix which I I transformed to zero as many matrix elements as possible and in this time I have: $$y^{n} cdot det begin{vmatrix}
      frac{x}{y}+1 & 1 & ... & & & 1\
      frac{-x}{y} & frac{x}{y} & & & & 0 \
      . & 0 & frac{x}{y} & 0 & ... & . \
      . & . & ... & & & . \
      . & . & & & & . \
      frac{-x}{y} & 0 & ... & & &frac{x}{y} \
      end{vmatrix}
      $$
      Unfortunately I don't know what can I do to find a sollution at this moment. Can you help me with some tips?







      linear-algebra






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      asked Jan 18 at 1:40









      MP3129MP3129

      33610




      33610






















          1 Answer
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          active

          oldest

          votes


















          1












          $begingroup$

          (Assumed that your calculations so far are correct,) you're almost there.



          Just add the second, third, ... $n$th columns to the first column, so that your matrix will become an upper triangle matrix and its determinant is the product of the diagonal elements.






          share|cite|improve this answer









          $endgroup$













          • $begingroup$
            In my previous transformations, I used row operations. Can I now transform columns?
            $endgroup$
            – MP3129
            Jan 18 at 2:12






          • 2




            $begingroup$
            Row transformations retain the set of roots of system corresponding to the matrix, column transformations don't. However iff your aim is just calculating the determinant you can mix row and column transformations.
            $endgroup$
            – P Vanchinathan
            Jan 18 at 2:54










          • $begingroup$
            Using $det(A^T) =det A$, we see that the column operations change the determinant the same way as the row operations.
            $endgroup$
            – Berci
            Jan 18 at 11:02











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          1 Answer
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          1 Answer
          1






          active

          oldest

          votes









          active

          oldest

          votes






          active

          oldest

          votes









          1












          $begingroup$

          (Assumed that your calculations so far are correct,) you're almost there.



          Just add the second, third, ... $n$th columns to the first column, so that your matrix will become an upper triangle matrix and its determinant is the product of the diagonal elements.






          share|cite|improve this answer









          $endgroup$













          • $begingroup$
            In my previous transformations, I used row operations. Can I now transform columns?
            $endgroup$
            – MP3129
            Jan 18 at 2:12






          • 2




            $begingroup$
            Row transformations retain the set of roots of system corresponding to the matrix, column transformations don't. However iff your aim is just calculating the determinant you can mix row and column transformations.
            $endgroup$
            – P Vanchinathan
            Jan 18 at 2:54










          • $begingroup$
            Using $det(A^T) =det A$, we see that the column operations change the determinant the same way as the row operations.
            $endgroup$
            – Berci
            Jan 18 at 11:02
















          1












          $begingroup$

          (Assumed that your calculations so far are correct,) you're almost there.



          Just add the second, third, ... $n$th columns to the first column, so that your matrix will become an upper triangle matrix and its determinant is the product of the diagonal elements.






          share|cite|improve this answer









          $endgroup$













          • $begingroup$
            In my previous transformations, I used row operations. Can I now transform columns?
            $endgroup$
            – MP3129
            Jan 18 at 2:12






          • 2




            $begingroup$
            Row transformations retain the set of roots of system corresponding to the matrix, column transformations don't. However iff your aim is just calculating the determinant you can mix row and column transformations.
            $endgroup$
            – P Vanchinathan
            Jan 18 at 2:54










          • $begingroup$
            Using $det(A^T) =det A$, we see that the column operations change the determinant the same way as the row operations.
            $endgroup$
            – Berci
            Jan 18 at 11:02














          1












          1








          1





          $begingroup$

          (Assumed that your calculations so far are correct,) you're almost there.



          Just add the second, third, ... $n$th columns to the first column, so that your matrix will become an upper triangle matrix and its determinant is the product of the diagonal elements.






          share|cite|improve this answer









          $endgroup$



          (Assumed that your calculations so far are correct,) you're almost there.



          Just add the second, third, ... $n$th columns to the first column, so that your matrix will become an upper triangle matrix and its determinant is the product of the diagonal elements.







          share|cite|improve this answer












          share|cite|improve this answer



          share|cite|improve this answer










          answered Jan 18 at 1:54









          BerciBerci

          60.8k23673




          60.8k23673












          • $begingroup$
            In my previous transformations, I used row operations. Can I now transform columns?
            $endgroup$
            – MP3129
            Jan 18 at 2:12






          • 2




            $begingroup$
            Row transformations retain the set of roots of system corresponding to the matrix, column transformations don't. However iff your aim is just calculating the determinant you can mix row and column transformations.
            $endgroup$
            – P Vanchinathan
            Jan 18 at 2:54










          • $begingroup$
            Using $det(A^T) =det A$, we see that the column operations change the determinant the same way as the row operations.
            $endgroup$
            – Berci
            Jan 18 at 11:02


















          • $begingroup$
            In my previous transformations, I used row operations. Can I now transform columns?
            $endgroup$
            – MP3129
            Jan 18 at 2:12






          • 2




            $begingroup$
            Row transformations retain the set of roots of system corresponding to the matrix, column transformations don't. However iff your aim is just calculating the determinant you can mix row and column transformations.
            $endgroup$
            – P Vanchinathan
            Jan 18 at 2:54










          • $begingroup$
            Using $det(A^T) =det A$, we see that the column operations change the determinant the same way as the row operations.
            $endgroup$
            – Berci
            Jan 18 at 11:02
















          $begingroup$
          In my previous transformations, I used row operations. Can I now transform columns?
          $endgroup$
          – MP3129
          Jan 18 at 2:12




          $begingroup$
          In my previous transformations, I used row operations. Can I now transform columns?
          $endgroup$
          – MP3129
          Jan 18 at 2:12




          2




          2




          $begingroup$
          Row transformations retain the set of roots of system corresponding to the matrix, column transformations don't. However iff your aim is just calculating the determinant you can mix row and column transformations.
          $endgroup$
          – P Vanchinathan
          Jan 18 at 2:54




          $begingroup$
          Row transformations retain the set of roots of system corresponding to the matrix, column transformations don't. However iff your aim is just calculating the determinant you can mix row and column transformations.
          $endgroup$
          – P Vanchinathan
          Jan 18 at 2:54












          $begingroup$
          Using $det(A^T) =det A$, we see that the column operations change the determinant the same way as the row operations.
          $endgroup$
          – Berci
          Jan 18 at 11:02




          $begingroup$
          Using $det(A^T) =det A$, we see that the column operations change the determinant the same way as the row operations.
          $endgroup$
          – Berci
          Jan 18 at 11:02


















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