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27 votes
Calculate the determinant of this matrix:

What is the first step?

Step 1: Augment the matrix by copying columns 1 and 2 to the right of the matrix

Step 2: Find the products along the main diagonals
d1= 4
d2= 0
d3= 3

Step 3: Find the products of the minor diagonals
e1= 0
e2= 16
e3= 2

Step 4; Perform the final calculation

d1+d2+d3-e1-e2-e3= -11

(Got them all right on edge 2022)

Calculate the determinant of this matrix: What is the first step? Step 1: Augment-example-1
User Seaux
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2 Answers

15 votes
15 votes

Final answer:

To calculate the determinant of a matrix, you need to augment the matrix, find the products along the main diagonals and the products of the minor diagonals, and perform the final calculation by subtracting the products of the minor diagonals from the sum of the products along the main diagonals.

Step-by-step explanation:

The first step to calculate the determinant of a matrix is to augment the matrix by copying columns 1 and 2 to the right of the matrix. Then, you find the products along the main diagonals and the products of the minor diagonals. After that, you perform the final calculation by subtracting the products of the minor diagonals from the sum of the products along the main diagonals.

For example, if the main diagonals have products d1, d2, and d3, and the minor diagonals have products e1, e2, and e3, the determinant of the matrix is given by d1 + d2 + d3 - e1 - e2 - e3.

Let's say d1 = 4, d2 = 0, d3 = 3, e1 = 0, e2 = 16, and e3 = 2. The determinant would be calculated as -11: d1 + d2 + d3 - e1 - e2 - e3 = 4 + 0 + 3 - 0 - 16 - 2 = -11.

User Andrew Wonnacott
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2.7k points
17 votes
17 votes

Answer:

thank you they are all correct!

Step-by-step explanation:

User Dr Phil
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