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I am currently studying for a test, and I understand how to solve determinants when given concrete values. However, I have no idea how to solve this practice problem. Can someone lead me in the right direction to the solution?

Given

$det\begin{bmatrix}a & b & ... & c\\d & e & ... & f\\... & ... & ... & ...\\g & h & ... & i\end{bmatrix} = K$

Find the $det\begin{bmatrix}a & b & ... & c\\3d+a & 3e+b & ... & 3f+c\\... & ... & ... & ...\\g-d & h-e & ... & i-f\end{bmatrix}$

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    I'm not sure about the rows in the middle. That's all that is given.2012-10-17

1 Answers 1

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From the question, I'm going to make the assumption that the second and last rows are the only ones altered (as I can see no other obvious pattern).

It looks like the new matrix is obtained from the original by

  1. Subtracting row $2$ from the last row
  2. Multiplying row $2$ by $3$
  3. Adding row $1$ to row $2$

How do these elementary row operations affect the determinant?

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    Well, from what you learned about determinants, how does each elementary row operation alter the determinant? Or perhaps the better question, how were you tau$g$ht to evaluate determinants?2012-10-17