Parabola MCQ Quiz in मराठी - Objective Question with Answer for Parabola - मोफत PDF डाउनलोड करा

Last updated on Mar 17, 2025

पाईये Parabola उत्तरे आणि तपशीलवार उपायांसह एकाधिक निवड प्रश्न (MCQ क्विझ). हे मोफत डाउनलोड करा Parabola एमसीक्यू क्विझ पीडीएफ आणि बँकिंग, एसएससी, रेल्वे, यूपीएससी, स्टेट पीएससी यासारख्या तुमच्या आगामी परीक्षांची तयारी करा.

Latest Parabola MCQ Objective Questions

Parabola Question 1:

प्रत्यक्षरेषा \(lx + my + n = 0\) वरील अन्वस्ताच्या \(y^{2} = 4ax\) संदर्भात ध्रुव असेल:

\(\left (\dfrac {-n}{l}, \dfrac {-2am}{l}\right )\)
\(\left (\dfrac {-n}{l}, \dfrac {2am}{l}\right )\)
\(\left (\dfrac {n}{l}, \dfrac {-2am}{l}\right )\)
\(\left (\dfrac {n}{l}, \dfrac {2am}{l}\right )\)

Answer (Detailed Solution Below)

Option 3 : \(\left (\dfrac {n}{l}, \dfrac {-2am}{l}\right )\)

बिंदू \(P(x_{1}, y_{1})\) वरील अन्वस्त \(y^{2} = 4ax\) ची स्पर्शिका

\(yy_{1} = 2a (x + x_{1})\)

\(\Rightarrow 2ax_{1} - yy_{1} + 2ax = 0\) ...... (i)

जे अन्वस्त \(y^{2} = 4ax\) च्या ध्रुवीय समीकरणासारखे आहे.

तसेच रेषा

\(lx + my + n = 0\) ....... (ii)

दोन्ही रेषांची तुलना केल्यास, आपल्याकडे

\(\dfrac {2a}{l} = \dfrac {-y_{1}}{m} = \dfrac {2ax_{1}}{n}\)

पहिले दोन भाग घेऊन,

\(\left (y_{1} = -\dfrac {2am}{l}\right )\)

पहिला आणि शेवटचा भाग घेऊन,

\(\left (x_{1} = \dfrac {n}{l}\right )\)

\(\therefore\) रेषेचा आवश्यक ध्रुव \(\left \{\dfrac {n}{l}, \dfrac {-2am}{l}\right \}\) आहे.

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Top Parabola MCQ Objective Questions

Parabola Question 2:

प्रत्यक्षरेषा \(lx + my + n = 0\) वरील अन्वस्ताच्या \(y^{2} = 4ax\) संदर्भात ध्रुव असेल:

\(\left (\dfrac {-n}{l}, \dfrac {-2am}{l}\right )\)
\(\left (\dfrac {-n}{l}, \dfrac {2am}{l}\right )\)
\(\left (\dfrac {n}{l}, \dfrac {-2am}{l}\right )\)
\(\left (\dfrac {n}{l}, \dfrac {2am}{l}\right )\)

Answer (Detailed Solution Below)

Option 3 : \(\left (\dfrac {n}{l}, \dfrac {-2am}{l}\right )\)

बिंदू \(P(x_{1}, y_{1})\) वरील अन्वस्त \(y^{2} = 4ax\) ची स्पर्शिका

\(yy_{1} = 2a (x + x_{1})\)

\(\Rightarrow 2ax_{1} - yy_{1} + 2ax = 0\) ...... (i)

जे अन्वस्त \(y^{2} = 4ax\) च्या ध्रुवीय समीकरणासारखे आहे.

तसेच रेषा

\(lx + my + n = 0\) ....... (ii)

दोन्ही रेषांची तुलना केल्यास, आपल्याकडे

\(\dfrac {2a}{l} = \dfrac {-y_{1}}{m} = \dfrac {2ax_{1}}{n}\)

पहिले दोन भाग घेऊन,

\(\left (y_{1} = -\dfrac {2am}{l}\right )\)

पहिला आणि शेवटचा भाग घेऊन,

\(\left (x_{1} = \dfrac {n}{l}\right )\)

\(\therefore\) रेषेचा आवश्यक ध्रुव \(\left \{\dfrac {n}{l}, \dfrac {-2am}{l}\right \}\) आहे.

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Parabola MCQ Quiz in मराठी - Objective Question with Answer for Parabola - मोफत PDF डाउनलोड करा

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Answer (Detailed Solution Below)

Parabola Question 1 Detailed Solution

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Answer (Detailed Solution Below)

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Parabola MCQ Quiz in मराठी - Objective Question with Answer for Parabola - मोफत PDF डाउनलोड करा

Latest Parabola MCQ Objective Questions

Parabola Question 1:

Answer (Detailed Solution Below)

Parabola Question 1 Detailed Solution

Top Parabola MCQ Objective Questions

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Answer (Detailed Solution Below)

Parabola Question 2 Detailed Solution

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