[हिन्दी] त्रिकोणमिति MCQ [Free Hindi PDF] - Objective Question Answer for Trigonometry Quiz - Download Now!

Latest Trigonometry MCQ Objective Questions

त्रिकोणमिति Question 1:

Answer (Detailed Solution Below)

Option 3 :

दिया गया है:

sin A = 3/4

प्रयुक्त सूत्र:

cos²A = 1 - sin²A

cos A = √(1 - sin²A)

गणना:

cos²A = 1 - sin²A

⇒ cos²A = 1 - (3/4)²

⇒ cos²A = 1 - 9/16

⇒ cos²A = (16/16) - (9/16)

⇒ cos²A = 7/16

⇒ cos A = √(7/16)

⇒ cos A = √7 / 4

(2 × cos A) / √7:

⇒ (2 × (√7 / 4)) / √7

⇒ (2√7 / 4) / √7

⇒ (2√7) / (4√7)

⇒ 2 / 4

⇒ 1 / 2

∴ सही उत्तर विकल्प (3) है।

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त्रिकोणमिति Question 2:

3 + tan²θ + cot²θ − sec²θ cosec²θ का मान है:

0
-1
2
1

Answer (Detailed Solution Below)

Option 4 : 1

दिया गया है:

व्यंजक: 3 + tan²θ + cot²θ − sec²θ × cosec²θ

प्रयुक्त सूत्र:

tan²θ = sec²θ − 1

cot²θ = cosec²θ − 1

गणना:

⇒ 3 + (sec²θ − 1) + (cosec²θ − 1) − sec²θ × cosec²θ

⇒ 3 + sec²θ + cosec²θ − 2 − sec²θ × cosec²θ

⇒ (1 + sec²θ + cosec²θ − sec²θ × cosec²θ)

अब θ = 45° मानकर सरल करते हैं (एक मान्य सर्वसमिका कोण जहाँ सभी मान परिभाषित हैं)

⇒ sec 45° = √2, इसलिए sec²θ = 2

⇒ cosec 45° = √2, इसलिए cosec²θ = 2

⇒ व्यंजक = 1 + 2 + 2 − (2 × 2)

⇒ 1 + 4 − 4 = 1

इसलिए, व्यंजक का मान 1 है।

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त्रिकोणमिति Question 3:

यदि cot θ = 3/4 है, तो sin 3θ का मान ज्ञात कीजिए।

Answer (Detailed Solution Below)

Option 1 :

दिया गया है:

cot θ = 3/4

प्रयुक्त सूत्र:

sin 3θ = 3sin θ - 4sin³ θ

गणना:

cot θ = 3/4

⇒ tan θ = 4/3

⇒ sin θ = 4/5

⇒ sin3 θ = (4/5)3 = 64/125

⇒ sin 3θ = 3 × (4/5) - 4 × (64/125)

⇒ sin 3θ = 12/5 - 256/125

⇒ sin 3θ = 300/125 - 256/125

⇒ sin 3θ = 44/125

∴ सही उत्तर विकल्प (1) है।

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त्रिकोणमिति Question 4:

250√3 मीटर ऊँचे एक टॉवर के शीर्ष का उन्नयन कोण ज्ञात कीजिए, जो इसके पाद से 250 मीटर की दूरी पर स्थित एक बिंदु से देखा जाता है।

75°
30°
45°
60°

Answer (Detailed Solution Below)

Option 4 : 60°

दिया गया है:

टॉवर की ऊँचाई (h) = 250 मीटर

टॉवर के पाद से बिंदु की दूरी (b) = 250 मीटर

प्रयुक्त सूत्र:

एक समकोण त्रिभुज में, tan = लंब / आधार

यहाँ, लम्ब = टॉवर की ऊँचाई

आधार = टॉवर के पाद से दूरी

परिकलन:

माना, उन्नयन कोण है।

tan = टॉवर की ऊँचाई / टॉवर के पाद से दूरी

tan =

⇒ tan =

हम जानते हैं कि tan(60°) =

⇒ = 60°

इसलिए, उन्नयन कोण 60° है।

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त्रिकोणमिति Question 5:

यदि है, तो का मान ज्ञात कीजिए।

Answer (Detailed Solution Below)

Option 1 :

दिया गया है:<amp-mathml inline data-formula="\(\tan\theta = \frac{7}{8}\)"></amp-mathml>ज्ञात करने के लिए व्यंजक: <amp-mathml inline data-formula="\(\dfrac{(1 + \sin\theta)(1 - \sin\theta)}{(1 + \cos\theta)(1 - \cos\theta)(\cot\theta)}\)"></amp-mathml>प्रयुक्त सूत्र:1. (a + b)(a - b) = a2 - b22. <amp-mathml inline data-formula="\(\sin^2\theta + \cos^2\theta = 1\)"></amp-mathml>⇒ <amp-mathml inline data-formula="\(1 - \sin^2\theta = \cos^2\theta\)"></amp-mathml>⇒ <amp-mathml inline data-formula="\(1 - \cos^2\theta = \sin^2\theta\)"></amp-mathml>3. <amp-mathml inline data-formula="\(\cot\theta = \dfrac{\cos\theta}{\sin\theta}\)"></amp-mathml>4. <amp-mathml inline data-formula="\(\cot\theta = \dfrac{1}{\tan\theta}\)"></amp-mathml>गणना:अंश को सरल कीजिए:अंश = <amp-mathml inline data-formula="\((1 + \sin\theta)(1 - \sin\theta)\)"></amp-mathml>⇒ अंश = <amp-mathml inline data-formula="\(1^2 - \sin^2\theta\)"></amp-mathml>⇒ अंश = <amp-mathml inline data-formula="\(1 - \sin^2\theta\)"></amp-mathml>⇒ अंश = <amp-mathml inline data-formula="\(\cos^2\theta\)"></amp-mathml>हर को सरल कीजिए:हर = <amp-mathml inline data-formula="\((1 + \cos\theta)(1 - \cos\theta)(\cot\theta)\)"></amp-mathml>⇒ हर = <amp-mathml inline data-formula="\((1^2 - \cos^2\theta)(\cot\theta)\)"></amp-mathml>⇒ हर = <amp-mathml inline data-formula="\((1 - \cos^2\theta)(\cot\theta)\)"></amp-mathml>⇒ हर = <amp-mathml inline data-formula="\(\sin^2\theta \times \cot\theta\)"></amp-mathml><amp-mathml inline data-formula="\(\cot\theta = \dfrac{\cos\theta}{\sin\theta}\)"></amp-mathml> प्रतिस्थापित कीजिए:⇒ हर = <amp-mathml inline data-formula="\(\sin^2\theta \times \dfrac{\cos\theta}{\sin\theta}\)"></amp-mathml>⇒ हर = <amp-mathml inline data-formula="\(\sin\theta \cos\theta\)"></amp-mathml>अब, सरलीकृत अंश और हर को व्यंजक में प्रतिस्थापित कीजिए:व्यंजक = <amp-mathml inline data-formula="\(\dfrac{\cos^2\theta}{\sin\theta \cos\theta}\)"></amp-mathml>अंश और हर से <amp-mathml inline data-formula="\(\cos\theta\)"></amp-mathml> को काट दीजिए:⇒ व्यंजक = <amp-mathml inline data-formula="\(\dfrac{\cos\theta}{\sin\theta}\)"></amp-mathml>⇒ व्यंजक = <amp-mathml inline data-formula="\(\cot\theta\)"></amp-mathml>दिया गया है <amp-mathml inline data-formula="\(\tan\theta = \dfrac{7}{8}\)"></amp-mathml>.चूँकि <amp-mathml inline data-formula="\(\cot\theta = \dfrac{1}{\tan\theta}\)"></amp-mathml>:⇒ व्यंजक = <amp-mathml inline data-formula="\(\dfrac{1}{\frac{7}{8}}\)"></amp-mathml>⇒ व्यंजक = <amp-mathml inline data-formula="\(\dfrac{8}{7}\)"></amp-mathml>इसलिए, व्यंजक का मान <amp-mathml inline data-formula="\(\dfrac{8}{7}\)"></amp-mathml> है। - pehlivanlokantalari.com

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त्रिकोणमिति MCQ Quiz in हिन्दी - Objective Question with Answer for Trigonometry - मुफ्त [PDF] डाउनलोड करें

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