Q2: When solving the system of equations below, choose which steps could be correct. 3x+2y=172x+5y=26 To cancel the x's, multiply the top equation by 2 and the bottom equation by -3. To cancel the x's, multiply the top equation by 4 and the bottom equation by -6. To cancel the y's, multiply the top equation by 5 and the bottom equation by 2. To cancel the y's, multiply the top equation by -2.5.

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ChiKesselman ChiKesselman · Answer 1 · 2020-03-30T03:28:12+02:00

Answer:

Option A) multiply the top equation by 2 and the bottom equation by -3

Option D) To cancel the y's, multiply the top equation by -2.5.

Step-by-step explanation:

We are given the following equations in the question:

[tex]3x+2y=17\\2x+5y=26[/tex]

We have to eliminate x from the equation in order to solve the equation.

Option A) multiply the top equation by 2 and the bottom equation by -3

[tex](3x+2y=17)\times 2\\ (2x+5y=26)\times -3\\\Rightarrow 6x + 4y = 34\\-6x-15y=-78\\\text{Adding equations we get}\\-11y = -44\\y = 4[/tex]

We have to eliminate y from the equation in order to solve the equation.

Option D) To cancel the y's, multiply the top equation by -2.5.

[tex](3x+2y=17)\times -2.5\\ (2x+5y=26)\times 1\\\Rightarrow -7.5x -5y = -42.5\\2x+5y=26\\\text{Adding equations we get}\\-5.5x = -16.5\\x = 3[/tex]