Discover a wealth of knowledge and get your questions answered at IDNLearn.com. Our platform offers comprehensive and accurate responses to help you make informed decisions on any topic.
Sagot :
If the vectors \(\overrightarrow{P Q}\) and \(\overrightarrow{R S}\) intersect to form four right angles, we need to determine the correct relationship between these vectors. Here is a thorough step-by-step explanation:
1. Understanding Four Right Angles Intersecting:
- When two lines or vectors intersect to form four right angles (90 degrees each), it implies that each pair of angles formed around the intersection point is orthogonal.
- In simpler terms, if \(\overrightarrow{P Q}\) intersects \(\overrightarrow{R S}\) and creates right angles, then \(\overrightarrow{P Q}\) must be perpendicular to \(\overrightarrow{R S}\).
2. Analyzing the Given Statements:
- Option A: \(\overrightarrow{Q Q}\) and \(\overrightarrow{R S}\) are skew.
- This is incorrect terminology and doesn't make sense in this context. "\(\overrightarrow{Q Q}\)" seems to be a typographical error or not relevant for our vectors.
- Option B: \(\overrightarrow{P Q} \perp \overleftrightarrow{R S}\)
- This means that \(\overrightarrow{P Q}\) is perpendicular to \(\overrightarrow{R S}\). Given our understanding that the vectors intersect to form right angles, this statement is correct.
- Option C: \(\overrightarrow{P Q} = \overrightarrow{R S}\)
- This states that the vectors are equal, which cannot be concluded just from the intersection forming right angles. They only need to be perpendicular, not equal.
- Option D: \(\overrightarrow{P Q}\) and \(\overrightarrow{R S}\) are parallel.
- This statement is incorrect because if they were parallel, they could not intersect to form four right angles.
3. Conclusion:
- The correct statement derived from the given situation is that \(\overrightarrow{P Q}\) is perpendicular to \(\overrightarrow{R S}\).
Thus, the correct choice is:
B. [tex]\(\overrightarrow{P Q} \perp \overleftrightarrow{R S}\)[/tex]
1. Understanding Four Right Angles Intersecting:
- When two lines or vectors intersect to form four right angles (90 degrees each), it implies that each pair of angles formed around the intersection point is orthogonal.
- In simpler terms, if \(\overrightarrow{P Q}\) intersects \(\overrightarrow{R S}\) and creates right angles, then \(\overrightarrow{P Q}\) must be perpendicular to \(\overrightarrow{R S}\).
2. Analyzing the Given Statements:
- Option A: \(\overrightarrow{Q Q}\) and \(\overrightarrow{R S}\) are skew.
- This is incorrect terminology and doesn't make sense in this context. "\(\overrightarrow{Q Q}\)" seems to be a typographical error or not relevant for our vectors.
- Option B: \(\overrightarrow{P Q} \perp \overleftrightarrow{R S}\)
- This means that \(\overrightarrow{P Q}\) is perpendicular to \(\overrightarrow{R S}\). Given our understanding that the vectors intersect to form right angles, this statement is correct.
- Option C: \(\overrightarrow{P Q} = \overrightarrow{R S}\)
- This states that the vectors are equal, which cannot be concluded just from the intersection forming right angles. They only need to be perpendicular, not equal.
- Option D: \(\overrightarrow{P Q}\) and \(\overrightarrow{R S}\) are parallel.
- This statement is incorrect because if they were parallel, they could not intersect to form four right angles.
3. Conclusion:
- The correct statement derived from the given situation is that \(\overrightarrow{P Q}\) is perpendicular to \(\overrightarrow{R S}\).
Thus, the correct choice is:
B. [tex]\(\overrightarrow{P Q} \perp \overleftrightarrow{R S}\)[/tex]
We greatly appreciate every question and answer you provide. Keep engaging and finding the best solutions. This community is the perfect place to learn and grow together. IDNLearn.com is committed to providing accurate answers. Thanks for stopping by, and see you next time for more solutions.