5) which standard form equation is formed from the two equations? $x + 2 = 5$ and $y - 3 = 2$ $x - y = -2$ $x + y = 2$ $x + y = -2$ $x - y = 2$ 6) which standard form equation is formed from the two equations? $2x - 3 4$ and $y + 2 8$ $2x - y 7$ $2x - y 8$

Question

5) which standard form equation is formed from the two equations? $x + 2 = 5$ and $y - 3 = 2$ $x - y = -2$ $x + y = 2$ $x + y = -2$ $x - y = 2$ 6) which standard form equation is formed from the two equations? $2x - 3 > 4$ and $y + 2 < 1$ $2x + y > 8$ $2x - y < 7$ $2x + y > 7$ $2x - y > 8$

Accepted Answer

### Question 5 # Explanation: ## Step1: Solve for $ x $ and $ y $ For $ x + 2 = 5 $, subtract 2 from both sides: $ x = 5 - 2 = 3 $. For $ y - 3 = 2 $, add 3 to both sides: $ y = 2 + 3 = 5 $. ## Step2: Substitute $ x $ and $ y $ into options Check each option: - $ x - y = 3 - 5 = -2 $, which matches $ x - y = -2 $. - $ x + y = 3 + 5 = 8 eq 2 $. - $ x + y = 8 eq -2 $. - $ x - y = -2 eq 2 $. # Answer: $ x - y = -2 $ (the first option) ### Question 6 # Explanation: ## Step1: Solve each inequality for standard form For $ 2x - 3 > 4 $, add 3 to both sides: $ 2x > 7 $. For $ y + 2 < 1 $, subtract 2 from both sides: $ y < -1 $, or $ -y > 1 $ (multiply by -1, reverse inequality). ## Step2: Combine inequalities Add $ 2x > 7 $ and $ -y > 1 $: $ 2x - y > 7 + 1 $, so $ 2x - y > 8 $. # Answer: $ 2x - y > 8 $ (the fourth option)

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Question

Explanation:

Question 5

Step1: Solve for \( x \) and \( y \)

Step2: Substitute \( x \) and \( y \) into options

Step1: Solve each inequality for standard form

Step2: Combine inequalities

Answer:

Question 6