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Latest Pythagorean Identities MCQ Objective Questions

Pythagorean Identities Question 1:

यदि p sin A - cos A = 1 है, तो p² - (1 + p²) cos A का मान कितना है?

1
-1
2
उपर्युक्त में से एक से अधिक
उपर्युक्त में से कोई नहीं

Answer (Detailed Solution Below)

Option 1 : 1

दिया गया:

यदि p sin A - cos A = 1

प्रयुक्त सूत्र:

sin 90 ^∘ = 1

cos 90 ∘ = 0

गणना:

p sin A - cos A = 1

p का मान प्राप्त करने के लिए A = 90 ^∘ रखें

$(p \sin 90^{\circ} - \cos 90^{\circ}) = 1$

p × 1 - 0 = 1

p = 1

p 2 - (1 + p 2 ) cos A में A = 90° और p = 1 रखने पर:

p2 - (1 + p2) cos A = 12 - (1 - 12)cos 90°

⇒ 1 - (1 + 1) × 0

⇒ 1 - 2 × 0 = 1 - 0 = 1

∴ p 2 - (1 + p 2 ) cos A = 1

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Pythagorean Identities Question 2:

यदि secθ + tanθ = x है, तो sinθ ज्ञात कीजिए।

$\frac{x^{2} + 1}{1 - x^{2}}$
$\frac{x^{2} - 1}{1 + 2 x^{2}}$
$\frac{x^{2} - 1}{1 + x^{2}}$
$\frac{1 - x^{2}}{1 + x^{2}}$

Answer (Detailed Solution Below)

Option 3 :

\frac{x^{2} - 1}{1 + x^{2}}

दिया गया:

यदि secθ + tanθ = x, तो sinθ ज्ञात कीजिए।

प्रयुक्त सूत्र:

(secθ + tanθ) (secθ - tanθ) = 1

समाधान:

sec θ + tan θ = x ---(1)

तो, sec θ - tan θ = 1/x ---(2)

समीकरण (1) से समीकरण (2) घटाने पर:

sec θ + tan θ - (sec θ - tan θ) = x - 1/x

⇒ sec θ + tan θ - sec θ + tan θ = (x2 - 1)/x

⇒ 2 tan θ = (x2 - 1)/x

⇒ tan θ = (x2 - 1)/2x

हम जानते हैं कि tan θ = p/b

अतः, p = (x2 - 1), b = 2x

h2 = p2 + b2 = (x2 - 1)2 + (2x)2

⇒ h2 = (x2)2 + 1 - 2x2 + 4x2

⇒ h2 = (x2)2 + 1 + 2x2

⇒ h2 = (x2 + 1)2

⇒ h = (x2 + 1)

तो, sin θ = p/h = (x2 - 1) / (x2 + 1)

∴ सही उत्तर विकल्प (3) है।

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Pythagorean Identities Question 3:

यदि cot² θ - 2 cos² θ = 0, (0° < θ < 90°) है, तो θ का मान क्या है?

45°
60°
90°
30°

Answer (Detailed Solution Below)

Option 1 : 45°

दिया गया है:

cot² θ - 2 cos² θ = 0, (0° < θ < 90°)

प्रयुक्त सूत्र:

cot² θ = cos² θ / sin² θ

गणना:

cot² θ = cos² θ / sin² θ का उपयोग करते हुए,

⇒ (cos² θ / sin² θ) - 2 cos² θ = 0

⇒ cos² θ (1 / sin² θ - 2) = 0

⇒ 1 / sin² θ - 2 = 0

⇒ 1 / sin² θ = 2

⇒ sin² θ = 1 / 2

⇒ sin θ = 1 / √2

⇒ θ = 45°

सही उत्तर विकल्प 1 है।

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Pythagorean Identities Question 4:

यदि 10sin²θ + 6cos²θ = 7 है, जहाँ 0 < θ < 90° है, तो tan θ का मान ज्ञात कीजिए।

√(3)
1
$\frac{1}{\sqrt 3}$
$\frac{1}{2}$

Answer (Detailed Solution Below)

Option 3 :

\frac{1}{\sqrt 3}

दिया गया है:

10sin²θ + 6cos²θ = 7

0 < θ < 90°

प्रयुक्त सूत्र:

sin²θ + cos²θ = 1

tanθ = sinθ / cosθ

गणना:

माना, sin²θ = x, तब cos²θ = 1 - x

⇒ 10x + 6(1 - x) = 7

⇒ 10x + 6 - 6x = 7

⇒ 4x = 1

⇒ x = 1/4

⇒ sin²θ = 1/4

⇒ sinθ = 1/2

चूँकि 0 < θ < 90°

⇒ sinθ = 1/2

⇒ cos²θ = 1 - (1/4)

⇒ cos²θ = 3/4

⇒ cosθ = √(3)/2

चूँकि 0 < θ < 90°

⇒ cosθ = √(3)/2

⇒ tanθ = sinθ / cosθ

⇒ tanθ = $\frac{(1 / 2)}{(\sqrt (3) / 2)}$

⇒ tanθ = 1/√(3)

सही उत्तर विकल्प 3 है।

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Pythagorean Identities Question 5:

यदि 3 tan A = 4 है और A एक न्यून कोण है, तो 4sinA + 3cosA का मान क्या है?

Answer (Detailed Solution Below)

Option 4 : 5

दिया गया है:

यदि 3 tan A = 4 है और A एक न्यून कोण है।

प्रयुक्त सूत्र:

हम जानते हैं कि tan A = sin A / cos A

साथ ही, sin²A + cos²A = 1

गणना:

3 tan A = 4

⇒ tan A = 4/3

⇒ sin A / cos A = 4/3

मान लीजिए sin A = 4k और cos A = 3k

sin²A + cos²A = 1

⇒ (4k)² + (3k)² = 1

⇒ 16k² + 9k² = 1

⇒ 25k² = 1

⇒ k² = 1/25

⇒ k = 1/5

इसलिए, sin A = 4k = 4/5

और cos A = 3k = 3/5

अब, 4 sin A + 3 cos A = 4(4/5) + 3(3/5)

⇒ 16/5 + 9/5

⇒ 25/5

⇒ 5

4sinA + 3cosA का मान 5 है।

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Pythagorean Identities Question 6

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यदि sec θ + tan θ = 5 है, तो tan θ का मान ज्ञात कीजिए।

$\frac{5}{12}$
$\frac{13}{5}$
$\frac{13}{3}$
$\frac{12}{5}$

Answer (Detailed Solution Below)

Option 4 :

\frac{12}{5}

दिया गया है:

sec θ + tan θ = 5

प्रयुक्त अवधारणा:

यदि sec θ + tan θ = y

तब sec θ - tan θ = 1/y

गणना:

sec θ + tan θ = 5 ----- (1)

तब,

sec θ - tan θ = 1/5 ------- (2)

समीकरण (1) में से (2) को घटाने पर,

⇒ (sec θ + tan θ) - (sec θ - tan θ) = (5 - 1/5)

⇒ sec θ + tan θ - sec θ + tan θ = 24/5

⇒ 2 × tan θ = 24/5

⇒ tan θ = 12/5

∴ सही उत्तर 12/5 है।

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Pythagorean Identities Question 7

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यदि {(3 sin θ – cos θ) / (cos θ + sin θ)} = 1 है, तो cot θ का मान क्या है?

Answer (Detailed Solution Below)

Option 3 : 1

दिया गया है:

{(3Sinθ - Cosθ)/(Cosθ + Synθ)} = 1

गणना:

हमारे पास एक त्रिकोणमितीय समीकरण है

{(3Sinθ - Cosθ)/(Cosθ + Synθ)} = 1

अंश और हर को Sinθ से विभाजित करने पर, हमें प्राप्त होता है

⇒ [{(3sinθ – cosθ)/Sinθ}/{(cosθ + sinθ)/sinθ}] = 1

⇒ {(3 – cotθ)/(cotθ + 1)} = 1

⇒ 3 – cotθ = 1 + cotθ

⇒ 2cotθ = 2

cotθ = 1

मान 1 है।

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Pythagorean Identities Question 8

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यदि sec² θ + tan² θ = $\frac{25}{18}$ है, तो sec⁴θ - tan⁴θ का मान क्या है?

$\frac{18}{25}$
$\frac{25}{12}$
$\frac{25}{9}$
$\frac{25}{18}$

Answer (Detailed Solution Below)

Option 4 :

\frac{25}{18}

दिया गया है:

sec2 θ + tan2 θ = 25/18

प्रयुक्त सूत्र:

sec2 θ - tan2 θ = 1

(sec2 θ + tan2 θ)(sec2 θ - tan2 θ) = sec4 θ - tan4 θ

गणना

⇒ (sec2 θ + tan2 θ)(sec2 θ - tan2 θ) = sec4 θ - tan4 θ

⇒ 25/18 × 1 = sec4 θ - tan4 θ

⇒ sec4 θ - tan4 θ = 25/18

मान 25/18 है।

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Pythagorean Identities Question 9

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यदि sec A + tan A = 5 है, तब sin A बराबर है:

$\frac{5}{13}$
$\frac{5}{12}$
$\frac{13}{12}$
$\frac{12}{13}$

Answer (Detailed Solution Below)

Option 4 :

\frac{12}{13}

दिया गया है:

sec A + tan A = 5

प्रयुक्त संकल्पना:

यदि sec A + tan A = x तब,

⇒ sec A - tan A = 1/x

प्रयुक्त सूत्र:

Sin θ = P/H ; sec θ = H/B ; tan θ = P/B

पाइथागोरस प्रमेय:

H2 = P2 + B2

जहाँ, H = कर्ण ; P = लंब ; B = आधार

गणना:

⇒ sec A + tan A = 5 ------- (1)

तब,

⇒ sec A - tan A = 1/5 -------- (2)

समीकरण (1) और (2) जोड़ने पर

⇒ Sec A + tan A + sec A - tan A = 5 + (1/5)

⇒ 2 × sec A = 26/5

⇒ sec A = 13/5 = H/B

पाइथागोरस प्रमेय द्वारा:

⇒ H² = P² + B²

⇒ (13)² = P² + 5²

⇒ P² = 169 - 25 = 144

⇒ P = √144 = 12

Sin A = P/H = 12/13

∴ सही उत्तर 12/13 है।

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Pythagorean Identities Question 10

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यदि sin t + cos t = $\frac{4}{5}$ है, तो sin t. cos t का मान ज्ञात कीजिए।

$\frac{9}{50}$
$\frac{- 9}{50}$
$\frac{9}{25}$
$\frac{- 9}{25}$

Answer (Detailed Solution Below)

Option 2 :

\frac{- 9}{50}

गणना

sin t + cos t = $\frac{4}{5}$

दोनों पक्षों का वर्ग करने पर,

(sin t + cos t)² = (4/5)²

⇒ (sin²t + cos²t + 2 × sin t × cos t = 16/25

⇒ 1 + 2 × sin t × cos t = 16/25 ......(sin2t + cos2t = 1)

⇒ 2 × sin t × cos t = 16/25 - 1

⇒ 2 × sin t × cos t = -9/25

⇒ sin t × cos t = -9/50

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Pythagorean Identities Question 11

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निम्नलिखित समीकरण को हल कीजिए।

$\frac{\sin^{3} α + \cos^{3} α}{\sin α + \cos α}$

1 + sin α cos α
tan α
1 - sin α cos α
sec α

Answer (Detailed Solution Below)

Option 3 : 1 - sin α cos α

दिया गया है

$\frac{\sin^{3} α + \cos^{3} α}{\sin α + \cos α}$

प्रयुक्त सूत्र:

a³ + b³ = (a + b) (a² + b² - ab)

sin²θ + cos²θ = 1

गणना:

$\frac{\sin^{3} α + \cos^{3} α}{\sin α + \cos α}$ = [(sin α + cos α) (sin²α + cos²α - sinα cosα)]/(sin α + cos α)

⇒ 1 - sin α cos α

समीकरण का मान 1 - sin α cos α है।

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Pythagorean Identities Question 12

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tan2α = $\frac{2 t a n α}{1 - t a n^{2} α}$ सर्वसमिका का प्रयोग करके, tan15° का मान दशमलव के तीन स्थानों तक ज्ञात कीजिए।

[√3 = 1.732 प्रयोग करें]

0.268
0.27
0.267
0.269

Answer (Detailed Solution Below)

Option 1 : 0.268

दिया गया है:

tan2α = $\frac{2 t a n α}{1 - t a n^{2} α}$

प्रयुक्त सूत्र:

Tan15° = Tan(45 – 30)°

त्रिकोणमिति सूत्र से, हम जानते हैं,

Tan (A – B) = (Tan A – Tan B) /(1 + Tan A Tan B)

गणना:

इसलिए, हम लिख सकते हैं,

tan(45 – 30)° = tan 45° – tan 30°/1+ tan 45° tan 30°

अब tan 45° और tan 30° का मान तालिका से रखने पर, हमें प्राप्त होता है;

tan(45 – 30)° = (1 – 1/√3)/ (1 + 1.1/√3)

tan (15°) = √3 – 1/ √3 + 1

= (√3 – 1)2/ [(√3)2 - 12]

= (3 + 1 - 2√3)/2 = 2 - √3

= 0.268

अत:, tan (15°) का मान 0.268 है।

Alternate Method
|

tan 30° = tan 2(15°)

त्रिकोणमिति सूत्र से हम जानते हैं,

tan2α = $\frac{2 t a n α}{1 - t a n^{2} α}$ ,

गणना

इसलिए, हम लिख सकते हैं,

tan 30° = 2 × tan 15° /(1 - tan 2 15°)

अब tan 30° का मान रखने पर हमें प्राप्त होता है;

⇒ 1/ √3 = 2 tan 15° / (1 - tan 2 15°)

माना tan (15°) = x

⇒ 1/ √3 = 2x / (1 - x 2 )

⇒ x 2 - 1 + 2√3 x = 0

⇒ x2 + 2√3 x - 1 = 0

द्विघात सूत्र से,

x = $\frac{- 2 \sqrt 3 \pm \sqrt{(2 \sqrt 3)^{2} - 4 (1) (- 1)}}{2 \times 1}$

⇒ x = $\frac{- 2 \sqrt 3 \pm \sqrt{12 + 4}}{2 \times 1}$

⇒ x = $\frac{- 2 \sqrt 3 \pm \sqrt{16}}{2 \times 1}$

⇒ (4 - 2√3)/2 = 2 - √3

= 0.268

अत:, tan (15°) का मान 0.268 है।

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Pythagorean Identities Question 13

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यदि cos x + sin x = √2 cos x है, तो (cos x - sin x)² + (cos x + sin x)²का मान कितना है?

2
1
0
$\frac{1}{\sqrt{2}}$

Answer (Detailed Solution Below)

Option 1 : 2

प्रयुक्त सूत्र:

Sin²x + Cos²x = 1

गणना :

(cos x - sin x)2 + (cos x + sin x)2

⇒ cos²x + sin²x - 2cosx.sinx + cos²x + sin²x + 2sinx.cosx

⇒ 2cos²x + 2sin²x

⇒ 2(cos²x + sin²x)

⇒ 2

∴ सही उत्तर 2 है।

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Pythagorean Identities Question 14

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$(\frac{1}{\sin θ} + \frac{1}{\tan θ}) (\frac{1}{\sin θ} - \frac{1}{\tan θ})$ का मान कितना है?

Answer (Detailed Solution Below)

Option 4 : 1

दिया गया है:

$(\frac{1}{\sin θ} + \frac{1}{\tan θ}) (\frac{1}{\sin θ} - \frac{1}{\tan θ})$

प्रयुक्त सूत्र:

(A2 - B2) = (A + B) × (A - B)

Cosec2 θ - cot2 θ = 1

गणना:

$(\frac{1}{\sin θ} + \frac{1}{\tan θ}) (\frac{1}{\sin θ} - \frac{1}{\tan θ})$

⇒ (cosec θ + cot θ) × (cosec θ - cot θ)

⇒ Cosec2 θ - cot2 θ

⇒ 1

∴ सही उत्तर 1 है।

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Pythagorean Identities Question 15

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यदि $\frac{21 c o s A + 3 s i n A}{3 c o s A + 4 s i n A}$ = 2 है, तो cot A का मान ज्ञात कीजिए।

$\frac{9}{11}$
$\frac{11}{9}$
$\frac{1}{3}$
$\frac{11}{10}$

Answer (Detailed Solution Below)

Option 3 :

\frac{1}{3}

प्रयुक्त अवधारणा:

Cosθ/ Sinθ = Cotθ

गणना:

$\frac{21 c o s A + 3 s i n A}{3 c o s A + 4 s i n A}$ = 2

Sin A से भाग देने पर हमें प्राप्त होता है,

⇒ (21 cot A + 3) / (3 cot A + 4) = 2

⇒ 15 cot A = 5

cot A = 1/3

∴ सही विकल्प 3 है।

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

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