document.write( "Question 899352: test for consistency and if consistent solve
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\n" ); document.write( "7x-8y+26z=13
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Algebra.Com's Answer #545344 by ewatrrr(24785) $\"\"$ $\"About$

You can put this solution on YOUR website!
x-4y+7z=14
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\n" ); document.write( "ordered triple (93/25, -747/100, -14/5)
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Solved by pluggable solver: Using Cramer's Rule to Solve Systems with 3 variables

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\n" ); document.write( " First let $\"A=%28matrix%283%2C3%2C1%2C-4%2C7%2C3%2C8%2C-22%2C7%2C-8%2C26%29%29\"$ . This is the matrix formed by the coefficients of the given system of equations.
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\n" ); document.write( " Take note that the right hand values of the system are $\"14\"$ , $\"13\"$ , and $\"13\"$ and they are highlighted here:
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\n" ); document.write( " These values are important as they will be used to replace the columns of the matrix A.
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\n" ); document.write( " Now let's calculate the the determinant of the matrix A to get $\"abs%28A%29=400\"$ . To save space, I'm not showing the calculations for the determinant. However, if you need help with calculating the determinant of the matrix A, check out this solver.
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\n" ); document.write( " Notation note: $\"abs%28A%29\"$ denotes the determinant of the matrix A.
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\n" ); document.write( " Now replace the first column of A (that corresponds to the variable 'x') with the values that form the right hand side of the system of equations. We will denote this new matrix $\"A%5Bx%5D\"$ (since we're replacing the 'x' column so to speak).
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\n" ); document.write( " Now compute the determinant of $\"A%5Bx%5D\"$ to get $\"abs%28A%5Bx%5D%29=1488\"$ . Again, as a space saver, I didn't include the calculations of the determinant. Check out this solver to see how to find this determinant.
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\n" ); document.write( " To find the first solution, simply divide the determinant of $\"A%5Bx%5D\"$ by the determinant of $\"A\"$ to get: $\"x=%28abs%28A%5Bx%5D%29%29%2F%28abs%28A%29%29=%281488%29%2F%28400%29=93%2F25\"$
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\n" ); document.write( " So the first solution is $\"x=93%2F25\"$
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\n" ); document.write( " We'll follow the same basic idea to find the other two solutions. Let's reset by letting $\"A=%28matrix%283%2C3%2C1%2C-4%2C7%2C3%2C8%2C-22%2C7%2C-8%2C26%29%29\"$ again (this is the coefficient matrix).
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\n" ); document.write( " Now replace the second column of A (that corresponds to the variable 'y') with the values that form the right hand side of the system of equations. We will denote this new matrix $\"A%5By%5D\"$ (since we're replacing the 'y' column in a way).
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\n" ); document.write( " Now compute the determinant of $\"A%5By%5D\"$ to get $\"abs%28A%5By%5D%29=-2988\"$ .
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\n" ); document.write( " To find the second solution, divide the determinant of $\"A%5By%5D\"$ by the determinant of $\"A\"$ to get: $\"y=%28abs%28A%5By%5D%29%29%2F%28abs%28A%29%29=%28-2988%29%2F%28400%29=-747%2F100\"$
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\n" ); document.write( " So the second solution is $\"y=-747%2F100\"$
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\n" ); document.write( " Let's reset again by letting $\"A=%28matrix%283%2C3%2C1%2C-4%2C7%2C3%2C8%2C-22%2C7%2C-8%2C26%29%29\"$ which is the coefficient matrix.
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\n" ); document.write( " Replace the third column of A (that corresponds to the variable 'z') with the values that form the right hand side of the system of equations. We will denote this new matrix $\"A%5Bz%5D\"$
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\n" ); document.write( " Now compute the determinant of $\"A%5Bz%5D\"$ to get $\"abs%28A%5Bz%5D%29=-1120\"$ .
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\n" ); document.write( " To find the third solution, divide the determinant of $\"A%5Bz%5D\"$ by the determinant of $\"A\"$ to get: $\"z=%28abs%28A%5Bz%5D%29%29%2F%28abs%28A%29%29=%28-1120%29%2F%28400%29=-14%2F5\"$
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\n" ); document.write( " So the third solution is $\"z=-14%2F5\"$
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\n" ); document.write( " Final Answer:
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\n" ); document.write( " So the three solutions are $\"x=93%2F25\"$ , $\"y=-747%2F100\"$ , and $\"z=-14%2F5\"$ giving the ordered triple (93/25, -747/100, -14/5)
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\n" ); document.write( " Note: there is a lot of work that is hidden in finding the determinants. Take a look at this 3x3 Determinant Solver to see how to get each determinant.
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