QUESTION IMAGE
Question
error analysis in exercises 25 and 26, describe and correct the error in naming opposite rays in the diagram.
- $overrightarrow{ad}$ and $overrightarrow{ac}$ are opposite rays.
- $overrightarrow{yc}$ and $overrightarrow{ye}$ are opposite rays.
Problem 25
Step1: Recall opposite rays definition
Opposite rays have the same endpoint and form a straight line (180° angle), so they must be collinear with the same starting point.
Step2: Analyze \(\overrightarrow{AD}\) and \(\overrightarrow{AC}\)
\(\overrightarrow{AD}\) and \(\overrightarrow{AC}\) share endpoint \(A\), but from the diagram, \(\overrightarrow{AD}\) and \(\overrightarrow{AB}\) (or \(\overrightarrow{AC}\) and \(\overrightarrow{AE}\))? Wait, no—wait, \(\overrightarrow{AD}\) is on one line, \(\overrightarrow{AC}\) is on another intersecting line. Wait, no, looking at the diagram, the two lines intersect at \(A\). Wait, no, opposite rays must be on the same line. So \(\overrightarrow{AD}\) and \(\overrightarrow{AB}\) are opposite rays (since they share \(A\) and are collinear), or \(\overrightarrow{AC}\) and \(\overrightarrow{AE}\) are opposite rays. The error is that \(\overrightarrow{AD}\) and \(\overrightarrow{AC}\) are not on the same line (they are on intersecting lines), so they can't be opposite rays. The correct opposite rays with endpoint \(A\) would be, for example, \(\overrightarrow{AD}\) and \(\overrightarrow{AB}\) (or \(\overrightarrow{AC}\) and \(\overrightarrow{AE}\)).
Step1: Recall opposite rays definition
Opposite rays must share the same endpoint and form a straight line.
Step2: Analyze \(\overrightarrow{YC}\) and \(\overrightarrow{YE}\)
\(\overrightarrow{YC}\) has endpoint \(Y\), but \(\overrightarrow{YE}\) also has endpoint \(Y\)? Wait, no—wait, the diagram: \(Y\) is on the line with \(A\), \(C\), \(E\)? Wait, no, the two lines: one is \(B - A - X - D\), the other is \(E - Y - A - C\). So \(\overrightarrow{YC}\) goes from \(Y\) through \(A\) to \(C\), and \(\overrightarrow{YE}\) goes from \(Y\) through \(E\) (opposite direction of \(C\) from \(Y\))? Wait, no—wait, opposite rays must have the same endpoint and be collinear (form a straight line). Wait, \(\overrightarrow{YC}\) and \(\overrightarrow{YE}\): do they share the same endpoint? Yes, \(Y\). But wait, are they collinear? Wait, \(Y\), \(A\), \(C\) are collinear, and \(Y\), \(E\) are on the same line (since \(E - Y - A - C\) is a straight line). Wait, no—wait, \(E\), \(Y\), \(A\), \(C\) are colinear. So \(\overrightarrow{YC}\) is from \(Y\) to \(C\) (through \(A\)), and \(\overrightarrow{YE}\) is from \(Y\) to \(E\) (opposite direction of \(C\) from \(Y\)). Wait, but the error is: opposite rays must have the same endpoint, but in the diagram, the correct opposite rays with endpoint \(A\) or \(Y\)? Wait, no—wait, the rays \(\overrightarrow{YC}\) and \(\overrightarrow{YE}\): their endpoint is \(Y\), but do they form a straight line? Wait, \(E\), \(Y\), \(A\), \(C\) are colinear, so \(\overrightarrow{YC}\) (from \(Y\) to \(C\)) and \(\overrightarrow{YE}\) (from \(Y\) to \(E\)) are in opposite directions along the same line, so why is it wrong? Wait, no—wait, the original statement says \(\overrightarrow{YC}\) and \(\overrightarrow{YE}\) are opposite rays, but maybe the endpoint is wrong? Wait, no—wait, looking at the diagram, the line is \(E - Y - A - C\), so \(\overrightarrow{YC}\) is \(Y \to C\), \(\overrightarrow{YE}\) is \(Y \to E\). But opposite rays must have the same endpoint and be collinear (which they are), but wait, maybe the endpoint is \(A\), not \(Y\)? Wait, no—the problem says \(\overrightarrow{YC}\) and \(\overrightarrow{YE}\): their endpoint is \(Y\), but maybe the correct opposite rays should have endpoint \(A\)? Wait, no—wait, the error is: Opposite rays must share the same endpoint, but \(\overrightarrow{YC}\) and \(\overrightarrow{YE}\) have endpoint \(Y\), but actually, the opposite rays with endpoint \(A\) would be \(\overrightarrow{AC}\) and \(\overrightarrow{AE}\), but here the rays are named with endpoint \(Y\). Wait, no—wait, \(\overrightarrow{YC}\) and \(\overrightarrow{YE}\): do they form a straight line? Yes, because \(E\), \(Y\), \(A\), \(C\) are colinear. Wait, maybe the error is that the endpoint is \(Y\), but the correct opposite rays should have endpoint \(A\)? No, the definition is about the endpoint of the rays. Wait, no—opposite rays are two rays with a common endpoint that form a straight line. So \(\overrightarrow{YC}\) (endpoint \(Y\), direction \(Y \to C\)) and \(\overrightarrow{YE}\) (endpoint \(Y\), direction \(Y \to E\)): since \(E - Y - A - C\) is a straight line, \(Y \to C\) and \(Y \to E\) are opposite directions, so they should be opposite rays? But the problem marks it as wrong. Wait, maybe I misread the diagram. Wait, the other line is \(B - A - X - D\), and the other is \(E - Y - A - C\). So \(Y\) is between \(E\) and \(A\), \(A\) is between \(Y\) and \(C\). So \(\overrightarrow{YC}\) is from \(Y\) through \(A\) to \(C\), \(\overrightarrow{YE}\) is from \(Y\) through \(E\) (away fr…
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Error: \(\overrightarrow{AD}\) and \(\overrightarrow{AC}\) are not collinear (they lie on intersecting lines, not a straight line), so they can’t be opposite rays.
Correction: Opposite rays with endpoint \(A\) are, e.g., \(\boldsymbol{\overrightarrow{AD}}\) and \(\boldsymbol{\overrightarrow{AB}}\) (or \(\boldsymbol{\overrightarrow{AC}}\) and \(\boldsymbol{\overrightarrow{AE}}\)).