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Chapter 4: Problem 43

Describe a problem that might arise when solving a system of equations using graphing. Assume that both equations in the system have been graphed correctly and the system has exactly one solution.

Short Answer

Expert verified
The main problem that might arise when solving a system of equations using graphing is related to accuracy, particularly when the intersection point doesn't fall exactly on an easy to read grid point. This error in precision can lead to potential mistakes when reading or interpreting the graph, even if the mathematics behind the graphing process is entirely correct and the system has exactly one solution.

Step by step solution

01

Identify the Problem

One potential issue that may come up when solving a system of equations through graphing could be the issue of accuracy. This can happen even when both equations have been graphed correctly. It transpires when the solution to the system of equations (the intersection point) doesn't fall exactly on an easy to identify grid point.
02

Examining the Problem

If the graphical representations of the equations intersect at a point that is not a grid point, it can be difficult to accurately determine the exact coordinates for the solution from the graph alone. This might lead to rounding errors. Therefore, graphing is often used for getting an approximate solution, or to verify the result obtained by some other (more precise) method.
03

Illustration

For example, if the two equations are \(y = 2x+1\) and \(y = -3x+5\) and they intersect at a point like (0.8, 2.6). This point doesn't lie exactly on a grid line, hence it would be particularly challenging to find the precise solution graphically. An approximate solution could be accepted but for exact values, another solving method would be advisable.

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