Solve the system: x + y = 7 and 2x - y = 3.

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Study for the 8th Grade FAST Mathematics Pre-Algebra Test. Enhance your skills with interactive flashcards and multiple choice questions, each containing hints and explanations to boost your comprehension and readiness for the exam. Get ready to ace your test!

Multiple Choice

Solve the system: x + y = 7 and 2x - y = 3.

Explanation:
Solving a system of linear equations by eliminating a variable. When two equations hold at the same time, you can add or subtract them to cancel one variable and solve for the other. For x plus y equals 7 and 2x minus y equals 3, add the two equations to cancel y: (x + y) + (2x − y) = 7 + 3, which gives 3x = 10, so x = 10/3. Then substitute this value into x + y = 7 to find y: y = 7 − 10/3 = 21/3 − 10/3 = 11/3. So the solution is (10/3, 11/3). The other pairs don’t satisfy both equations. For example, (3, 4) makes x + y = 7 but 2x − y = 2, not 3; (7, 0) makes 2x − y = 14; (2, 5) makes 2x − y = −1.

Solving a system of linear equations by eliminating a variable. When two equations hold at the same time, you can add or subtract them to cancel one variable and solve for the other.

For x plus y equals 7 and 2x minus y equals 3, add the two equations to cancel y: (x + y) + (2x − y) = 7 + 3, which gives 3x = 10, so x = 10/3. Then substitute this value into x + y = 7 to find y: y = 7 − 10/3 = 21/3 − 10/3 = 11/3. So the solution is (10/3, 11/3).

The other pairs don’t satisfy both equations. For example, (3, 4) makes x + y = 7 but 2x − y = 2, not 3; (7, 0) makes 2x − y = 14; (2, 5) makes 2x − y = −1.

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