A linear system where m, b, n, and c are nonzero constants is shown below y = mx + b y = nx + c Discuss the relationships among the four constants if the system has a unique solution. Choose the correct answer below. O A. If b = c, then the lines do not overlap and must intersect at a point on the y-axis. B. If m =n and b= c, then the lines overlap and the solution is unique. C. If b c, then the lines do not overlap and must intersect at a point. O D. If m n, then the lines are not parallel and do not overlap and must intersect at a point.

Algebra and Trigonometry (6th Edition)
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ChapterP: Prerequisites: Fundamental Concepts Of Algebra
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A linear system where m, b, n, and c are nonzero constants is shown below
y = mx + b
y = nx + c
Discuss the relationships among the four constants if the system has a unique solution.
Choose the correct answer below.
A. If b = c, then the lines do not overlap and must intersect at a point on the y-axis.
B. If m =n and b = c, then the lines overlap and the solution is unique.
C. If b c, then the lines do not overlap and must intersect at a point.
D. If m + n, then the lines are not parallel and do not overlap and must intersect at a point.
Transcribed Image Text:A linear system where m, b, n, and c are nonzero constants is shown below y = mx + b y = nx + c Discuss the relationships among the four constants if the system has a unique solution. Choose the correct answer below. A. If b = c, then the lines do not overlap and must intersect at a point on the y-axis. B. If m =n and b = c, then the lines overlap and the solution is unique. C. If b c, then the lines do not overlap and must intersect at a point. D. If m + n, then the lines are not parallel and do not overlap and must intersect at a point.
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