Consider the following system with the solution (1,3)
Equation 1 of the system : 2x+y=5
Equation 2 of the system: x -2y =-5
Prove that replacing the first equation with the sum of that equation and a multiple of the other produces a system with the same solution
Posible answers : used multiplication property of equality to write a new equation
Used addition property of equality to write a new equation added equations 1 and 3

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manza0139 manza0139 · Answer 1 · 2018-11-26T02:28:10+01:00

Answer 1: ________________

Used multiplication property of equality to write a new equation

Answer 2: ________________

Added equations 1 and 3

Answer 3: ________________

Replaced equation 1 with equation 4

Answer 4: ________________

The point (1,3) is a solution to both equation 2 and equation 4.

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topeadeniran2 topeadeniran2 · Answer 2 · 2022-04-15T14:36:08+02:00

The equation 2x - 4y = -10 is a multiple of equation 2 because of the multiplication property of equality to write a new equation.

An equation simply means a statement of two mathematical expressions that are equal.

In this case, equation 2x - 4y = -10 us a multiple of equation 2 because of the multiplication property of equality to write a new equation.

Learn more about equations on:

https://brainly.com/question/2972832