Consider the system of equation: and 2x+3y=z=8 2-4y+2z = -1 5x + 2y = 15 2x+3y-z = 8 The second system is obtained from the first by adding twice the first equation to the second equation, and then swapping the two equations. What is true about the solutions of the two systems? A solution to the second system can be obtained from a solution to the first system, by multiplying each value by 2 and swapping consecutive values The solutions of the two systems have no relation The two systems have exactly the same solutions A solution to the second system can be obtained from a solution to the first system, by multiplying each value by -2

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Consider the system of equation: and 2x+3y-z = 8 x-4y+2z = -1 5x + 2y = 15 2x+3y-z = 8 The second system is obtained from the first by adding twice the first equation to the second equation, and then swapping the two equations. What is true about the solutions of the two systems? A solution to the second system can be obtained from a solution to the first system, by multiplying each value by 2 and swapping consecutive values The solutions of the two systems have no relation The two systems have exactly the same solutions A solution to the second system can be obtained from a solution to the first system, by multiplying each value by -2