NCERT Solutions for Class 11 Maths Chapter 6 Linear Inequalities

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Topics and Sub Topics in Class 11 Maths Chapter 6 Linear Inequalities:

Section Name	Topic Name
6	Linear Inequalities
6.1	Introduction
6.2	Inequalities
6.3	Algebraic Solutions of Linear Inequalities in One Variable and their Graphical Representation
6.4	Graphical Solution of Linear Inequalities in Two Variables
6.5	Solution of System of Linear Inequalities in Two Variables

NCERT Solutions for Class 11 Maths Chapter 6 Exercise 6.1

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NCERT Solutions for Class 11 Maths Chapter 6 Exercise 6.2

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NCERT Solutions for Class 11 Maths Chapter 6 Exercise 6.3

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NCERT Solutions for Class 11 Maths Chapter 6 Miscellaneous Solutions

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NCERT Solutions for Class 11 Maths Chapter 6 .1 Linear Inequalities Ex 6 in Hindi

प्रश्न 1.
हल कीजिए : 24x < 100, जब
(i) x एक प्राकृत संख्या है।
(ii) x एक पूर्णांक है। 24x < 100
हल:
24x < 100
24 से दोनों पक्षों में भाग करने पर
x < Image may be NSFW.
Clik here to view. $\frac { 100 }{ 24 }$ अर्थात x < Image may be NSFW.
Clik here to view. $\frac { 25 }{ 6 }$
(i) यदि x एक प्राकृत संख्या है तो हल {1, 2, 3, 4} है।
(ii) यदि x एक पूर्णांक संख्या है तो हल {…. -3, -2, -1, 0, 1, 2, 3, 4}.

प्रश्न 2.
हल कीजिए: 12x > 30, जब
(i) x एक प्राकृत संख्या है।
(ii) x एक पूर्णाक है।
हल:
– 12x > 30
-12 से दोनों पक्षों में भाग करने पर,
x < Image may be NSFW.
Clik here to view. $\frac { 30 }{ -12 }$ अर्थात x < Image may be NSFW.
Clik here to view. $\frac { -5 }{ 2 }$
(i) यदि x प्राकृत संख्या है तो कोई हल नहीं है।
(ii) यदि x पूर्णाक संख्या है तो हल {….. -5, -4, -3} है।

प्रश्न 3.
हल कीजिए : 5x – 3 < 7, जब
(i) x एक पूर्णाक है।
(ii) x एक वास्तविक संख्या है।
हल:
5x – 3 < 7
दोनों पक्षों में 3 जोड़ने पर,
5x < 10
5 से भाग देने पर
x < Image may be NSFW.
Clik here to view. $\frac { 10 }{ 5 }$
अर्थात x < 2
(i) यदि x एक पूर्णांक संख्या है तो हल {…. -2, -1, 0, 1}.
(ii) यदि x एक वास्तविक संख्या है तो हल x ∈ (-∞, 2).

प्रश्न 4.
हल कीजिए : 3x + 8 > 2, जब
(i) x एक पूर्णाक है।
(ii) एक वास्तविक संख्या है।
हल:
3x + 8 > 2
3x > 2 – 8 या 3x > -6 .
3 से भाग करने पर
x > Image may be NSFW.
Clik here to view. $\frac { -6 }{ 3 }$ या x > -2
(i) यदि x एक पूर्णांक संख्या है तो हल {-1, 0, 1, 2,….}.
(ii) यदि x एक वास्तविक संख्या है तो हल x ∈ (-2, ∞).

प्रश्न 5.
हल कीजिए : 4x + 3 < 6x + 7.
हल:
4x + 3 < 6x + 7
6x को बाएँ पक्ष में तथा 3 को दाएँ पक्ष में रखने पर,
4x – 6x < 7 – 3,
-2x < 4 -2 से भाग देने पर, x > Image may be NSFW.
Clik here to view. $\frac { 4 }{ -2 }$ या x > -2
दी हुई असमिका का हल है: x = (-2, ∞).

प्रश्न 6.
हल कीजिए : 3x – 7 > 5x – 1
हल:
3x -7 > 5x – 1
5x को बाएँ पक्ष में और 7 को दाएँ पक्ष में रखने पर,
3x – 5x > -1 + 7
या
-2x > 6
-2x से भाग देने पर।
x < -3
दी हुई असमिका का हल है x ∈ (-∞, – 3).

प्रश्न 7.
हल कीजिए : 3(x – 1) ≤ 2 (x – 3).
हल:
असमिका
3(x – 1) ≤ 2 (x – 3)
3x – 3 ≤ 2x – 6
2x को बाएँ पक्ष में और 3 को दाएँ पक्ष में रखने पर,
3x – 2 ≤ 3 – 6
x < – 3
हल है : x ∈ (-∞, – 3].

प्रश्न 8.
हल कीजिए : 3 (2 – x) ≥ 2 (1 – x).
हल:
दी हुई असमिका 3(2 – x) ≥ 2 (1 – x)
6 – 3x ≥ 2 – 2x
2x को बायीं ओर तथा 6 को दायीं ओर रखने पर,
2x – 3x ≥ 2 – 6
या
-x ≥ -4 या x ≤ 4
हल है : x ∈ (-∞, 4]

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प्रश्न 13.
हल कीजिए : 2 (2x + 3) – 10 < 6 (x – 2)
हल:
दी हुई असमिका 2 (2x + 3) – 10 < 6 (x – 2)
4x + 6 – 10 < 6x – 12
6x को बायीं ओर तथा -4 को दार्थी ओर रखने पर,
4 – 6x < -12 + 4
-2x < -8 (-1) से गुणा करने पर, x > 4
हल है :
x ∈ (4, ∞)

प्रश्न 14.
हल कीजिए : 37 – (3x + 5) ≥ 9x – 8(x – 3).
हल:
दी हुई असमिका 37 – (3x + 5) ≥ 9x – 8(x – 3)
37 – 3x – 5 ≥ 9x – 8x + 24
– 3x + 32 ≥ x + 24
x को बायीं ओर तथा 32 को दायीं ओर रखने पर
-3x – x ≥ 24 – 32
– 4x ≥ – 8
(-1) से गुणा करने पर तथा 4 से भाग देने पर।
x ≤ Image may be NSFW.
Clik here to view. $\frac { 8 }{ 4 }$ या x ≤ 2
हल है: x ∈ (-∞, 2].

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प्रश्न 17 से 20 तक की असमिकाओं को हल ज्ञात कीजिए तथा उन्हें संख्या रेखा पर आलेञ्चित कीजिए।

प्रश्न 17.
3x – 2 < 2x + 1
हल:
दी हुई असमिका . 3x – 2 < 2x + 1
2x को बायीं ओर तथा 2 को दायीं ओर रखने पर,
3x – 2x < 1 + 2
x < 3
हल है : x ∈ (-∞, 3).
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प्रश्न 18.
5x – 3 ≥ 3x – 5.
हल:
दी हुई असमिका
5x -3 ≥ 3x – 5
3x को बायीं ओर तथा 3 को दायीं ओर रखने पर,
5x – 3x ≥ -5 + 3
2x ≥ -2
2 से भाग देने पर
x ≥ -1
हल है x ∈ [-1, ∞).
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प्रश्न 19.
3 (1 – x) < 2 (x + 4).
हल:
दी हुई असमिका
3(1 – x) < 2(x + 4)
3 – 3x < 2x + 8
2x को बायीं ओर तथा 3 को दार्थी ओर रखने पर,
-3x – 2x < 8 – 3
– 5x < 5 -5 से भाग देने पर x > -1
हल है: x ∈ (-1, ∞)
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प्रश्न 21.
रवि ने पहली दो एकक परीक्षा में 70 और 75 अंक प्राप्त किए हैं। वह न्यूनतम अंक ज्ञात कीजिए, जिसे वह तीसरी एकक परीक्षा में पाकर 60 अंक का न्यूनतम औसत प्राप्त कर सके।
हल:
मान लीजिए तीसरे एकक परीक्षा में x अंक प्राप्त किए।
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प्रश्न 22.
किसी पाठ्यक्रम में ग्रेड A पाने के लिए एक व्यक्ति को सभी पाँच परीक्षाओं (प्रत्येक 100 अंकों में से) में 90 अंक या अधिक अंक का औसत प्राप्त करना चाहिए यदि सुनीता के प्रथम चार परीक्षाओं के प्राप्तांक 87, 92, 94 और 95 हों तो वह न्यूनतम अंक ज्ञात कीजिए जिसे पांचवीं परीक्षा में प्राप्त करके सुनीता उस पाठ्यक्रम में ग्रेड A पाएगी।
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प्रश्न 23.
10 से कम क्रमागत विषम संख्याओं के ऐसे युग्म ज्ञात कीजिए जिनके योगफल 11 से अधिक हों।
हल:
मान लीजिए x और x + 2 दो विषम परिमेय संख्याएँ हैं।
x तथा x + 2 दोनों ही 10 से कम हैं।
⇒ x < 10 और x + 2 < 10 या x < 8 दोनों का योगं 11 से अधिक है। x + (x + 2) > 11
2x + 2 > 11 या 2x > 11 – 2
2x > 9 या x > Image may be NSFW.
Clik here to view. $\frac { 9 }{ 2 }$ या x > 4Image may be NSFW.
Clik here to view. $\frac { 1 }{ 2 }$
अर्थात् यदि x = 5 हो, तब दूसरी संख्या = x + 2 = 7
इसी प्रकार यदि x = 7, तो x + 2 = 9
दूसरा युग्म (7, 9)
x = 9 नहीं हो सकता क्योंकि x + 2 = 11 > 10
अत: वांछित युग्म है (5, 7), 7, 9).

प्रश्न 24.
क्रमागत सर्म संख्याओं के ऐसे युग्म ज्ञात कीजिए जिनमें से प्रत्येक 5 से बड़े हों, तथा उनका योगफल 23 से कम हो।
हल:
मान लीजिए x और x + 2 दो सम संख्याएँ हैं।
x और x + 2 दोनों ही 5 से बड़ी है।
⇒ x > 5
x + (x + 2) < 23
2x + 2 < 23
2x < 23 – 2 = 21
2x < 21 या x < Image may be NSFW.
Clik here to view. $\frac { 21 }{ 2 }$
यदि x = 10, x + 2 = 12 ⇒ x + (x + 2) < 23
इसी प्रकार (6, 8), (8, 10) युग्म भी दी हुई शर्त पूरी करते हैं। वांछित युग्म (6, 8), (8, 10), (10, 12).

प्रश्न 25.
एक त्रिभुज की सबसे बड़ी भुजा सबसे छोटी भुजा की तीन गुनी है तथा त्रिभुज की तीसरी भुजा सबसे बड़ी भुजा से 2 सेमी कम है। तीसरी भुजा की न्यूनतम लंबाई ज्ञात कीजिए जबकि त्रिभुज का परिमाप न्यूनतम 61 सेमी है।
हल:
मान लीजिए त्रिभुज की सबसे छोटी भुजा = x सेमी
सबसे बड़ी भुजा = 3x सेमी
तीसरी भुजा = 3x – 2 सेमी
प्रश्नानुसार
x + 3x + (3x – 2) ≥ 61
7x – 2 ≥ 61
7x ≥ 61 + 2 = 63
x ≥ 9
सबसे छोटी भुजा 9 सेमी है।

प्रश्न 26.
एक व्यक्ति 91 सेमी लंबे बोर्ड में से तीन लंबाईयाँ काटना चाहता है। दूसरी लंबाई सबसे छोटी लंबाई से 3 सेमी अधिक और तीसरी लंबाई सबसे छोटी लंबाई की दूनी है। सबसे छोटे बोर्ड की संभावित लंबाई क्या है, यदि तीसरा टुकड़ा दूसरे टुकड़े से कम से कम 5 सेमी अधिक लंबा हो ?
हल:
मान लीजिए कटे हुए सबसे छोटे बोर्ड की लंबाई = x सेमी
दूसरे कटे हुए बोर्ड की लम्बाई = x + 3
तीसरे कटे हुए बोर्ड की लम्बाई = 2x सेमी
दिया है कि
x + (x + 3) + 2x ≤ 91
4x + 3 ≤ 91
4x ≤ 91 – 3 = 88
4x ≤ 88
x ≤ 22 ……(1)
यह भी दिया गया है कि 2x ≥ (x + 3) + 5
2x ≥ x + 8
x ≥ 8 ……(2)
सबसे छोटे बोर्ड की लम्बाई कम से कम 8 सेमी हो और अधिक से अधिक 22 सेमी हो।

NCERT Solutions for Class 11 Maths All Chapters

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NCERT Solutions for Class 11 Maths Chapter 6 Linear Inequalities