Use elementary row or column operations to find the determinant.
Image transcription text. - N W H Use either elementary row or column operations, or cofactor. expansion, to find the determinant by hand. Then use a software program or. a graphing utility to verify your answer.... Show more. Image transcription text. Use elementary row or column operations to find the determinant. 2.
Question: Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. 1 -1 7 6 4 0 1 1 2 2 -1 1 3 0 0 0 Use elementary row or column operations to find the determinant. 2 -6 8 10 9 3 6 0 5 9 -5 51 0 6 2 -11 ON
the rows of a matrix also hold for the columns of a matrix. In particular, the properties P1–P3 regarding the effects that elementary row operations have on the determinant can be translated to corresponding statements on the effects that “elementary column operations” have on the determinant. We will use the notations CPij, CMi(k), and ...For large matrices, the determinant can be calculated using a method called expansion by minors. This involves expanding the determinant along one of the rows or columns and using the determinants of smaller matrices to find the determinant of the original matrix. Math; Algebra; Algebra questions and answers; Use elementary row or column operations to find the determinant. \[ \left|\begin{array}{rrr} 1 & -1 & -2 \\ 2 & 1 & 3 ...Properties of Determinants. Properties of determinants are needed to find the value of the determinant with the least calculations. The properties of determinants are based on the elements, the row, and column operations, and it helps to easily find the value of the determinant.. In this article, we will learn more about the properties of determinants and go …Multiply each element in any row or column of the matrix by its cofactor. The sum of these products gives the value of the determinant.The process of forming ...If B is obtained by adding a multiple of one row (column) of A to another row (column), then det(B) = det(A). Evaluate the given determinant using elementary row and/or column operations and the theorem above to reduce the matrix to row echelon form.By Theorem \(\PageIndex{4}\), we can add the first row to the second row, and the determinant will be unchanged. However, this row operation will result in a row of zeros. Using Laplace Expansion along the row of zeros, we find that the determinant is \(0\). Consider the following example.Finding a Determinant In Exercises 25-36, use elementary row or column operations to find the determinant. 25. ∣ ∣ 1 1 4 7 3 8 − 3 1 1 ∣ ∣ 26.
Can both(row and column) operations be used simultaneously in finding the value of same determinant means in solving same question at a single time? Stack Exchange Network Stack Exchange network consists of 183 Q&A communities including Stack Overflow , the largest, most trusted online community for developers to learn, share their knowledge ...MY NOTI Use either elementary row or column operations, or cofactor expansion to find the determinant by hand, Then use a software program or a graphing utility to verify your answer. 13 4 21 -1 0 30 3 1 -2 0 10 21 Need Help? Read It Submit Answer 7. [-/2 Points] DETAILS LARLINALG8 3.2.035. MY NOTES Use elementary row or columnWe can perform elementary column operations: if you multiply a matrix on the right by an elementary matrix, you perform an "elementary column operation".. However, elementary row operations are more useful when dealing with things like systems of linear equations, or finding inverses of matricces.Let K be the elementary row operation required to change the elementary matrix back into the identity. If we preform K on the identity, we get the inverse. ... FALSE We can expand down any row or column and get same determinant. The determinant of a triangular matrix is the sum of the entries of the main diagonal.Question: Use elementary row or column operations to evaluate the determinant. \[ \left|\begin{array}{lll} 5 & 2 & 3 \\ 3 & 1 & 4 \\ 0 & 6 & 2 \end{array}\right| \] Show transcribed image text. Expert Answer. ... Use elementary row …
To calculate inverse matrix you need to do the following steps. Set the matrix (must be square) and append the identity matrix of the same dimension to it. Reduce the left matrix to row echelon form using elementary row operations for the whole matrix (including the right one). As a result you will get the inverse calculated on the right. Let K be the elementary row operation required to change the elementary matrix back into the identity. If we preform K on the identity, we get the inverse. ... FALSE We can expand down any row or column and get same determinant. The determinant of a triangular matrix is the sum of the entries of the main diagonal.Theorem. Let A =[a]n A = [ a] n be a square matrix of order n n . Let det(A) det ( A) denote the determinant of A A . Applying ECO1 ECO 1 has the effect of multiplying det(A) det ( A) by λ λ . Applying ECO2 ECO 2 has no effect on det(A) det ( A) . Applying ECO3 ECO 3 has the effect of multiplying det(A) det ( A) by −1 − 1 .In particular, a similar computation of the determinant of a matrix can be done while reducing the matrix to its column reduced echelon form by using a succession of elementary column operations. One could also mix the row and column operations. Example. Consider the following reduction of a matrix to an identity matrix by the …
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Finding a Determinant In Exercises 25-36, use elementary row or column operations to find the determinant. This problem has been solved! You'll get a detailed solution from a subject matter expert that helps you learn core concepts.Question: Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. 4 1 4 0 5 0 3 92 STEP 1: Expand by cofactors along the second row. 4 10 0 -15 + Om 1 4 5 0 9 2 = 5 34 -4 -33 3 -20 0 20 x STEP 2: Find the determinant of the 2x2 matrix found in StepJun 28, 2014 · 1 Answer. The determinant of a matrix can be evaluated by expanding along a row or a column of the matrix. You will get the same answer irregardless of which row or column you choose, but you may get less work by choosing a row or column with more zero entries. You may also simplify the computation by performing row or column operations on the ... Find step-by-step Linear algebra solutions and your answer to the following textbook question: Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. $$ \begin {vmatrix} 3&2&1&1\\-1&0&2&0\\4&1&-1&0\\3&1&1&0\end {vmatrix} $$. In Exercises 25-38, use elementary row or column operations to evaluate the determinant. 1 7-3 173 25. 31 1-2 79 3 -4 55 3 6 35. 3 6 -1 This problem has been solved! You'll get a detailed solution from a subject matter expert that helps you learn core concepts.In order to start relating determinants to inverses we need to find out what elementary row operations do to the determinant of a matrix. The Effects of Elementary Row Operations …
Finding a Determinant In Exercises 25-36, use elementary row or column operations to find the determinant. 25. ∣ ∣ 1 1 4 7 3 8 − 3 1 1 ∣ ∣ 26. This problem has been solved! You'll get a detailed solution from a subject matter expert that helps you learn core concepts. Question: Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. 14 2 1 -1 0 3 0 4 1 -1 0 3 1 2 0 ...Question: Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. 1 -1 7 6 4 0 1 1 2 2 -1 1 3 0 0 0 Use elementary row or column operations to find the determinant. 2 -6 8 10 9 3 6 0 5 9 -5 51 0 6 2 -11 ONIn order to start relating determinants to inverses we need to find out what elementary row operations do to the determinant of a matrix. The Effects of Elementary Row Operations …See Answer. Question: Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. 1 0 8 4 7 2 0 4 4 STEP 1: Expand by cofactors along the second row. 1 8 2 0 = 4 0 4 4 7 4. STEP 2: Find the determinant of the 2x2 matrix found in ...This is a 3 by 3 matrix. And now let's evaluate its determinant. So what we have to remember is a checkerboard pattern when we think of 3 by 3 matrices: positive, negative, positive. So first we're going to take positive 1 times 4. So we could just write plus 4 …Use elementary row or column operations to find the determinant. 2 -6 7 1 8 4 6 0 15 8 5 5 To 6 2 -1 Need Help? Talk to a Tutor 10. -/1.53 points v LARLINALG7 3.2.041. Find the determinant of the elementary matrix. Technically, yes. On paper you can perform column operations. However, it nullifies the validity of the equations represented in the matrix. In other words, it breaks the equality. Say we have …Advanced Math questions and answers. Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. ∣∣204355502∣∣ STEP 1: Expand by cofactors along the second row. ∣∣204355502∣∣=5∣ STEP 2: Find the determinant of ...Question: Use elementary row or column operations to find the determinant. |1 1 4 5 4 9 -2 1 1| ____ Use elementary row or column operations to evaluate the determinant.3.3: Finding Determinants using Row Operations In this section, we look at two examples where row operations are used to find the determinant of a large matrix. 3.4: Applications of the Determinant The determinant of a matrix also provides a way to find the inverse of a matrix. 3.E: Exercises
linear algebra - How to find the determinant using elementary row or column operations - Mathematics Stack Exchange How to find the determinant using elementary row or column operations Ask Question Asked 4 years, 11 months ago Modified 4 years, 11 months ago Viewed 902 times 0 I have the matrix:
Important properties of the determinant include the following, which include invariance under elementary row and column operations. 1. Switching two rows or columns changes the sign. 2. Scalars can be factored out from rows and columns. 3. Multiples of rows and columns can be added together without changing the …Oct 15, 2022 · I tried to calculate this $5\times5$ matrix with type III operation, but I found the determinant answer of the $4\times4$ matrix obtained by deleting row one and column three of this matrix is not same. If you interchange columns 1 and 2, x ′ 1 = x2, x ′ 2 = x1. If you add column 1 to column 2, x ′ 1 = x1 − x2. (Check this, I only tried this on a 2 × 2 example.) These problems aside, yes, you can use both column operations and row operations in a Gaussian elimination procedure. There is fairly little practical use for doing so, however.Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. ∣ ∣ 1 − 1 4 0 1 0 4 5 4 ∣ ∣ [-/1 Points] LARLINALG8 3.2.024. Use either elementary row or column operations, or cofactor expansion, to find the determinant by ... I'm having a problem finding the determinant of the following matrix using elementary row operations. I know the determinant is -15 but confused on how to do it using the elementary row operations. Here is the matrix $$\begin{bmatrix} 2 & 3 & 10 \\ 1 & 2 & -2 \\ 1 & 1 & -3 \end{bmatrix}$$ Thank you Step-by-step solution. 100% (9 ratings) for this solution. Step 1 of 5. Using elementary row operations, we will try to get the matrix into a form whose determinant is more easily found, i.e. the identity matrix or a triangular matrix. ? -2 times the third row was added to the second row.The intersection of a vertical column and horizontal row is called a cell. The location, or address, of a specific cell is identified by using the headers of the column and row involved. For example, cell “F2” is located at the spot where c...I tried to calculate this $5\times5$ matrix with type III operation, but I found the determinant answer of the $4\times4$ matrix obtained by deleting row one and column three of this matrix is not ...Use elementary row or column operations to evaluate the determinant. 4 4 3. 4 2. 3. BUY. College Algebra (MindTap Course List) 12th Edition. ... Use elementary row or column operations to find the determinant. 2. -2 -1 3 1. -8 8. 4. A: I have used elementary row operations. Q: 2. Find the determinant and invers a) -3 7 9 1 3 4 b) 1 …
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-/1 points LARLINALG8 3.2.031. Use elementary row or column operations to find the determinant. 1 4 7 13 0 -9 5 7 9 8 9 -3 4 3 - 1 x Your answer cannot be understood or graded. More Information Enter an exact number. Submit …In order to start relating determinants to inverses we need to find out what elementary row operations do to the determinant of a matrix. The Effects of Elementary Row Operations …The elementary column operations are obtained by applying the three-row operations to the columns in the same way. We will now briefly cover the column transformations. ... If the determinant’s rows become columns and the columns become rows, the determinant remains unchanged. This is referred to as the reflection property.tions leave the determinant unchanged. Elementary operation property Given a square matrixA, if the entries of one row (column) are multiplied by a constant and added to the corresponding entries of another row (column), then the determinant of the resulting matrix is still equal to_A_. Applying the Elementary Operation Property (EOP) may give ...If you interchange columns 1 and 2, x ′ 1 = x2, x ′ 2 = x1. If you add column 1 to column 2, x ′ 1 = x1 − x2. (Check this, I only tried this on a 2 × 2 example.) These problems aside, yes, you can use both column operations and row operations in a Gaussian elimination procedure. There is fairly little practical use for doing so, however.See Answer. Question: Finding a Determinant In Exercises 25–36, use elementary row or column operations to find determinant. 1 7 -31 11 1 25. 1 3 1 14 8 1 2 -1 -1 27. 1 3 2 28. /2 – 3 1-6 3 31 NME 0 6 Finding the Determinant of an Elementary Matrix In Exercises 39-42, find the determinant of the elementary matrix.Use elementary row or column operations to find the determinant. 2 -6 7 1 8 4 6 0 15 8 5 5 To 6 2 -1 Need Help? Talk to a Tutor 10. -/1.53 points v LARLINALG7 3.2.041. Find the determinant of the elementary matrix. Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. 2 8 5 0 3 0 5 2 1 STEP 1: Expand by cofactors along the second row. 0 3 3 5 2 1 STEP 2: Find the determinant of the 2x2 matrix found in Step 10 STEP 3: Find the …A row operation corresponds to multiplying a matrix A A on the left by one of several elementary matrices whose determinants are easy to compute to get a matrix B = EA B = E A. For instance, swapping the rows of a 2x2 matrix is done with (0 1 1 0)(a c b d) ( 0 1 1 0) ( a b c d)These are the base behind all determinant row and column operations on the matrixes. Elementary row operations. Effects on the determinant. Ri Rj. opposites the sign of the determinant. Ri Ri, c is not equal to 0. multiplies the determinant by constant c. Ri + kRj j is not equal to i. No effects on the determinants. Image transcription text. - N W H Use either elementary row or column operations, or cofactor. expansion, to find the determinant by hand. Then use a software program or. a graphing utility to verify your answer.... Show more. Image transcription text. Use elementary row or column operations to find the determinant. 2. ….
Use elementary row or column operations to find the determinant. Step-by-step solution 100% (9 ratings) for this solution Step 1 of 5 Using elementary row operations, we will try to get the matrix into a form whose determinant is more easily found, i.e. the identity matrix or a triangular matrix. ? -2 times the third row was added to the second row1 Answer. The determinant of a matrix can be evaluated by expanding along a row or a column of the matrix. You will get the same answer irregardless of which row or column you choose, but you may get less work by choosing a row or column with more zero entries. You may also simplify the computation by performing row or column operations on …Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. ∣∣1−43010352∣∣ x [-/4 Points] LARLINALG8 3.2.027. Use elementary row or column operations to find the determinant. ∣∣22−8−218−134∣∣If you interchange columns 1 and 2, x ′ 1 = x2, x ′ 2 = x1. If you add column 1 to column 2, x ′ 1 = x1 − x2. (Check this, I only tried this on a 2 × 2 example.) These problems aside, yes, you can use both column operations and row operations in a Gaussian elimination procedure. There is fairly little practical use for doing so, however.Use either elementary row or column operations, or cofactor expansion, to find the determinant by hand. Then use a software program or a graphing utility to verify your answer. ∣∣1−43010352∣∣ x [-/4 Points] LARLINALG8 3.2.027. Use elementary row or column operations to find the determinant. ∣∣22−8−218−134∣∣ If all elements of a row (or column) are zero, determinant is 0. Property 4 If any two rows (or columns) of a determinant are identical, the value of determinant is zero. Check Example 8 for proof Property 5 If each element of a row (or a column) of a determinant is multiplied by a constant k, then determinant’s value gets multiplied by kNow we show that cofactor expansion along the \(j\)th column also computes the determinant. By performing \(j-1\) column swaps, one can move the \(j\)th column of a matrix to the first column, keeping the other columns in order. For example, here we move the third column to the first, using two column swaps: Figure \(\PageIndex{3}\)See Answer See Answer See Answer done loading Question: Use elementary row or column operations to find the determinant. |2 9 5 0 -8 4 9 8 7 8 -5 2 1 0 5 -1| ____ Evaluate each determinant when a = 2, b = 5, and c =-1. Use elementary row or column operations to find the determinant., Calculating the determinant using row operations: v. 1.25 PROBLEM TEMPLATE: Calculate the determinant of the given n x n matrix A. SPECIFY MATRIX DIMENSIONS: Please select the size of the square matrix from the popup menu, click on the "Submit" button. ... Number of rows (equal to number of columns): ..., As we have seen, the determinant of a triangular matrix is given by the product of the diagonal entries. Hence, the determinant of such an elementary matrix is ..., det(D) = 1(−3)∣∣∣11 14 22 −17∣∣∣ = 1485 det ( D) = 1 ( − 3) | 11 22 14 − 17 | = 1485. and so det(A) = (13)(1485) = 495. det ( A) = ( 1 3) ( 1485) = 495. You can see that by using row …, Again, you could use Laplace Expansion here to find \(\det \left(C\right)\). However, we will continue with row operations. Now replace the add \(2\) times the third row to the fourth row. This does not change the value of the determinant by Theorem 3.2.4. Finally switch the third and second rows. This causes the determinant to be multiplied by ..., 2. Multiply a row by a constant c Determinant is multiplied by c 3. Interchange two rows Determinant changes sign We can use these facts to nd the determinant of any n n matrix A as follows : 1. Use elementary row operations (ERO’s) to obtain an upper triangular matrix A0 from A. 2. Find detA0 (product of entries on main diagonal). 41, By Theorem \(\PageIndex{4}\), we can add the first row to the second row, and the determinant will be unchanged. However, this row operation will result in a row of zeros. Using Laplace Expansion along the row of zeros, we find that the determinant is \(0\). Consider the following example., This problem has been solved! You'll get a detailed solution from a subject matter expert that helps you learn core concepts. Question: Use elementary row or column operations to find the determinant. ∣∣3840−758797−43104−1∣∣ [-11 Points] LARLINALG8 3.2.027. Use elementary row or column operations to find the determinant. ∣∣23 ..., Technically, yes. On paper you can perform column operations. However, it nullifies the validity of the equations represented in the matrix. In other words, it breaks the equality. Say we have a matrix to represent: 3x + 3y = 15 2x + 2y = 10, where x = 2 and y = 3 Performing the operation 2R1 --> R1 (replace row 1 with 2 times row 1) gives us, Row Addition; Determinant of Products. Contributor; In chapter 2 we found the elementary matrices that perform the Gaussian row operations. In other words, for any matrix \(M\), and a matrix \(M'\) equal to \(M\) after a row operation, multiplying by an elementary matrix \(E\) gave \(M'=EM\). We now examine what the elementary matrices to do ..., Use elementary row or column operations to find the determinant. 2 -6 7 1 8 4 6 0 15 8 5 5 To 6 2 -1 Need Help? Talk to a Tutor 10. -/1.53 points v LARLINALG7 3.2.041. Find the determinant of the elementary matrix., Also remember that there are three elementary row (column) operations: multiply a row (column) by a non-zero constant; add a multiple of a row (column) to another row (column); interchange two rows (columns). Each of these three operations will be analyzed separately in the next sections. We will focus on elementary row operations. The results ..., Use elementary row or column operations to find the determinant. 1 6 −3 1 5 1 3 7 1 This problem has been solved! You'll get a detailed solution from a subject matter expert that helps you learn core concepts., 3.3: Finding Determinants using Row Operations In this section, we look at two examples where row operations are used to find the determinant of a large matrix. 3.4: Applications of the Determinant The determinant of a matrix also provides a way to find the inverse of a matrix. 3.E: Exercises , If you interchange columns 1 and 2, x ′ 1 = x2, x ′ 2 = x1. If you add column 1 to column 2, x ′ 1 = x1 − x2. (Check this, I only tried this on a 2 × 2 example.) These problems aside, yes, you can use both column operations and row operations in a Gaussian elimination procedure. There is fairly little practical use for doing so, however., Math Other Math Other Math questions and answers Finding a Determinant In Exercises 25–36, use elementary row or column operations to find determinant. 1 7 -31 11 1 25. 1 3 1 14 8 1 …, Theorem. Let A =[a]n A = [ a] n be a square matrix of order n n . Let det(A) det ( A) denote the determinant of A A . Applying ECO1 ECO 1 has the effect of multiplying det(A) det ( A) by λ λ . Applying ECO2 ECO 2 has no effect on det(A) det ( A) . Applying ECO3 ECO 3 has the effect of multiplying det(A) det ( A) by −1 − 1 ., About Press Copyright Contact us Creators Advertise Developers Terms Privacy Policy & Safety How YouTube works Test new features NFL Sunday Ticket Press Copyright ..., Multiply each element in any row or column of the matrix by its cofactor. The sum of these products gives the value of the determinant.The process of forming ..., And Patrick explained how you can save computations by judiciously choosing the rows/ columns you expand along. Just for fun, I'll explain a different way of evaluating the determinant. I'm just going to use the relationship between the elementary row/ column operations and the determinant. Here are those relationships:, $\begingroup$ that's the laplace method to find the determinant. I was looking for the row operation method. You kinda started of the way i was looking for by saying when you interchanged you will get a (-1) in front of the determinant. Also yea, the multiplication of the triangular elements should give you the determinant., This is a 3 by 3 matrix. And now let's evaluate its determinant. So what we have to remember is a checkerboard pattern when we think of 3 by 3 matrices: positive, negative, positive. So first we're going to take positive 1 times 4. So we could just write plus 4 …, Bundle: Elementary Linear Algebra, Enhanced Edition (with Enhanced WebAssign 1-Semester Printed Access Card), 6th + Enhanced WebAssign - Start Smart Guide for Students (6th Edition) Edit edition Solutions for Chapter 3.2 Problem 23E: Finding a Determinant In use either elementary row or column operations, or cofactor …, The answer: yes, if you're careful. Row operations change the value of the determinant, but in predictable ways. If you keep track of those changes, you can use row operations to …, The following facts about determinants allow the computation using elementary row operations. If two rows are added, with all other rows remaining the same, the determinants are added, and det (tA) = t det (A) where t is a constant. If two rows of a matrix are equal, the determinant is zero., A conventional school bus has 13 rows of seats on each side. However, the number of rows of seats is determined by the type of vehicle being used. School bus manufacturers determine the maximum seating capacity of each school bus., Q: Evaluate the determinant, using row or column operations whenever possible to simplify your work. A: Q: Use elementary row or column operations to find the determinant. 1 -5 5 -10 -3 2 -22 13 -27 -7 2 -30…. A: Explanation of the answer is as follows. Q: Compute the determinant by cofactor expansion., Image transcription text. - N W H Use either elementary row or column operations, or cofactor. expansion, to find the determinant by hand. Then use a software program or. a graphing utility to verify your answer.... Show more. Image transcription text. Use elementary row or column operations to find the determinant. 2., Answer. We apply the first row operation 𝑟 → 1 2 𝑟 to obtain the row-equivalent matrix 𝐴 = 1 3 3 − 1 . Given that we have used an elementary row operation, we must keep track of the effect on the determinant. We implemented 𝑟 → 1 2 𝑟 , which means that the determinant must be scale by the same number. , 1) Switching two rows or columns causes the determinant to switch sign 2) Adding a multiple of one row to another causes the determinant to remain the same 3) Multiplying a row as a constant results in the determinant scaling by that constant., 1 Answer. The determinant of a matrix can be evaluated by expanding along a row or a column of the matrix. You will get the same answer irregardless of which row or column you choose, but you may get less work by choosing a row or column with more zero entries. You may also simplify the computation by performing row or column operations on …, $\begingroup$ that's the laplace method to find the determinant. I was looking for the row operation method. You kinda started of the way i was looking for by saying when you interchanged you will get a (-1) in front of the determinant. Also yea, the multiplication of the triangular elements should give you the determinant. , By Theorem \(\PageIndex{4}\), we can add the first row to the second row, and the determinant will be unchanged. However, this row operation will result in a row of zeros. Using Laplace Expansion along the row of zeros, we find that the determinant is \(0\). Consider the following example., Question: Finding a Determinant In Exercises 25–36, use elementary row or column operations to find determinant. 1 7 -31 11 1 25. 1 3 1 14 8 1 2 -1 -1 27. 1 3 2 28. /2 – 3 1-6 3 31 NME 0 6 Finding the Determinant of an Elementary Matrix In Exercises 39-42, find the determinant of the elementary matrix. (Assume k * 0.) [ 10 ol To 0 11 39. /0 ...