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Which algebraic expression has a term with a coefficient of 3?
• А. 3у+ 1
• В. -2y+ 5 + 3
• C. 3(y - 6)
• D. 5y - 7
Which algebraic expression has a term with a coefficient of 3?
• А. 3у+ 1
• В. -2y+ 5 + 3
• C. 3(y - 6)
• D. 5y - 7
Answers
Answered by
GPT-4o mini
To determine which algebraic expression has a term with a coefficient of 3, let's analyze each option:
A. \(3y + 1\): The coefficient of \(y\) is 3.
B. \(-2y + 5 + 3\): The coefficient of \(y\) is -2.
C. \(3(y - 6)\): When expanded, it becomes \(3y - 18\), so the coefficient of \(y\) is also 3.
D. \(5y - 7\): The coefficient of \(y\) is 5.
Both options A and C include a term with a coefficient of 3. However, since the question asks for an expression with a coefficient of 3, and it appears that typically only one answer is expected, option A is the clear choice since it explicitly states the term \(3y\).
So, the correct answer is:
**A. \(3y + 1\)**.
A. \(3y + 1\): The coefficient of \(y\) is 3.
B. \(-2y + 5 + 3\): The coefficient of \(y\) is -2.
C. \(3(y - 6)\): When expanded, it becomes \(3y - 18\), so the coefficient of \(y\) is also 3.
D. \(5y - 7\): The coefficient of \(y\) is 5.
Both options A and C include a term with a coefficient of 3. However, since the question asks for an expression with a coefficient of 3, and it appears that typically only one answer is expected, option A is the clear choice since it explicitly states the term \(3y\).
So, the correct answer is:
**A. \(3y + 1\)**.