Class 11 RD Sharma Solutions - Chapter 29 Limits - Exercise 29.6 | Set 1

Last Updated : 30 Apr, 2021

Question 1. Lim_x→∞{(3x - 1)(4x - 2)}/{(x + 8)(x - 1)}.

Solution:

We have,

Lim_x→∞{(3x - 1)(4x - 2)}/{(x + 8)(x - 1)}

=

=

When x → ∞, (1/x) → 0.

= (3 × 4)/(1 × 1)

= 12

Question 2. Lim_x→∞{(3x³- 4x²+ 6x - 1)}/{(2x³+ x²- 5x + 7)}.

Solution:

We have,

Lim_x→∞{(3x³- 4x²+ 6x - 1)}/{(2x³+ x²- 5x + 7)}

=

=

When x → ∞, (1/x), (1/x²), (1/x³) → 0.

= 3/2

Question 3. Lim_x→∞{(5x³- 6)}/{√(9 + 4x⁶)}.

Solution:

We have,

Lim_x→∞{(5x³- 6)}/{√(9 + 4x⁶)}

=

=

When x → ∞, (1/x), (1/x³) → 0.

= 5/√4

= 5/2

Question 4. Lim_x→∞{√(x²+ cx) - x}

Solution:

We have,

Lim_x→∞{√(x²+cx)-x}

On rationalizing numerator, we get

= Lim_x→∞{(x²+ cx) - x²}/{√(x²+ cx) + x}

= Lim_x→∞(cx)/{√(x²+ cx) + x}

= Lim_x→∞(cx)/[x{√(x + c/x) + 1}]

= Lim_x→∞(c)/{√(1 + c/x) + 1}

When x → ∞, (1/x) → 0.

= c/(√1 + 1)

= c/2

Question 5. Lim_x→∞{√(x + 1) - √x}

Solution:

We have,

Lim_x→∞{√(x + 1) - √x}

On rationalizing numerator, we get

= Lim_x→∞{(x+1)-x}/{√(x+1)+√x}

= Lim_x→∞(1)/{√(x+1)+√x}

=

When x → ∞, (1/x) → 0.

= 0

Question 6. Lim_x→∞{√(x²+ 7x) - x}

Solution:

We have,

Lim_x→∞{√(x²+ 7x) - x}

On rationalizing numerator, we get

= Lim_x→∞{(x²+7x)-x2}/{√(x²+7x)+x}

= Limx→∞(7x)/{√(x²+7x)+x}

=

=

When x → ∞, (1/x) → 0.

= 7/(√1 + 1)

= 7/2

Question 7. Lim_x→∞(x)/{√(4x²+ 1) - 1}

Solution:

We have,

Lim_x→∞(x)/{√(4x²+ 1) - 1}

Rationalising denominator.

= Lim_x→∞[x{√(4x²+ 1) + 1}]/{(4x²+ 1) - 1}

= Lim_x→∞[x{√(4x²+ 1) + 1}]/(4x²)

= Lim_x→∞[{√(4x²+ 1) + 1}]/(4x)

=

When x → ∞, (1/x²) → 0.

= √4/4

= 2/4

= 1/2

Question 8. Lim_n→∞(n²)/{1 + 2 + 3 + 4 + ................ + n}

Solution:

We have,

Lim_n→∞(n²)/{1 + 2 + 3 + 4 + ................ + n}

=

= Lim_n→∞(2n)/(n+1)

= Lim_n→∞(2)/(1+1/n)

When n → ∞, (1/n) → 0

= 2/(1 + 0)

= 2

Question 9. Lim_x→∞(3x^-1+ 4x^-2)/(5x^-1+ 6x^-2)

Solution:

We have,

Lim_x→∞(3x^-1+ 4x^-2)/(5x^-1+ 6x^-2)

=

=

When x → ∞, (1/x) → 0.

= 3/5

Question 10. Lim_x→∞{√(x²+ a²) - √(x²+ b²)}/{√(x²+ c²) - √(x²+ d²)}

Solution:

We have,

Lim_x→∞{√(x²+ a²) - √(x²+ b²)}/{√(x²+ c²) - √(x²+ d²)}

On rationalizing numerator and denominator, we get

=

=

=

=

When x → ∞, (1/x²) → 0.

=

= (a²- b²)/(c²- d²)

Question 11. Lim_n→∞{(n + 2)! + (n + 1)!}/{(n + 2)! - (n + 1)!}.

Solution:

We have,

Lim_n→∞{(n + 2)! + (n + 1)!}/{(n + 2)! - (n + 1)!}

= Lim_n→∞{(n + 2)(n + 1)! + (n + 1)!}/{(n + 2)(n + 1)! - (n + 1)!}

= Lim_n→∞[(n + 1)!{(n + 2) + 1}]/[(n + 1)!{(n + 2) - 1}]

= Lim_n→∞(n + 3)/(n + 1)

= Lim_n→∞[n(1 + 3/n)]/[n(1 + 1/n)]

When n → ∞, (1/n) → 0.

= 1/1

= 1

Question 12. Lim_x→∞[x{√(x²+ 1) - √(x²- 1)}]

Solution:

We have,

Lim_x→∞[x{√(x²+ 1) - √(x²- 1)}]

On rationalizing numerator, we get

= Lim_x→∞[x{(x²+ 1) - (x²- 1)}]/{√(x²+ 1) + √(x²- 1)}

= Lim_x→∞(2x)/{√(x²+ 1) + √(x²- 1)}

= Lim_x→∞(2x)/[x{√(1 + 1/x²) + √(1 - 1/x²)}]

= Lim_x→∞(2)/[{√(1 + 1/x²) + √(1 - 1/x²)}]

When x → ∞, (1/x²) → 0.

= 2/(√1 + √1)

= 2/2

= 1

Question 13. Lim_x→∞[√(x + 2){√(x + 1) - √x}]

Solution:

We have,

Lim_x→∞[√(x + 2){√(x + 1) - √x}]

On rationalizing numerator, we get

= Lim_x→∞[√(x + 2){(x + 1) - x}]/{√(x + 1) + √x}

= Lim_x→∞[√(x + 2)]/{√(x + 1) + √x}

= Lim_x→∞[x√(1 + 2/x)]/[x{√(1 + 1/x) + √1}]

= Lim_x→∞[√(1 + 2/x)]/{√(1 + 1/x) + √1}

When x → ∞, (1/x) → 0.

= 1/(√1 + √1)

= 1/2

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URL: https://www.geeksforgeeks.org/maths/class-11-rd-sharma-solutions-chapter-29-limits-exercise-29-6-set-1/

⇱ Class 11 RD Sharma Solutions - Chapter 29 Limits - Exercise 29.6 | Set 1 - GeeksforGeeks

Class 11 RD Sharma Solutions - Chapter 29 Limits - Exercise 29.6 | Set 1

Question 1. Lim_x→∞{(3x - 1)(4x - 2)}/{(x + 8)(x - 1)}.

Question 2. Lim_x→∞{(3x³- 4x²+ 6x - 1)}/{(2x³+ x²- 5x + 7)}.

Question 3. Lim_x→∞{(5x³- 6)}/{√(9 + 4x⁶)}.

Question 4. Lim_x→∞{√(x²+ cx) - x}

Question 5. Lim_x→∞{√(x + 1) - √x}

Question 6. Lim_x→∞{√(x²+ 7x) - x}

Question 7. Lim_x→∞(x)/{√(4x²+ 1) - 1}

Question 8. Lim_n→∞(n²)/{1 + 2 + 3 + 4 + ................ + n}

Question 9. Lim_x→∞(3x^-1+ 4x^-2)/(5x^-1+ 6x^-2)

Question 10. Lim_x→∞{√(x²+ a²) - √(x²+ b²)}/{√(x²+ c²) - √(x²+ d²)}

Question 11. Lim_n→∞{(n + 2)! + (n + 1)!}/{(n + 2)! - (n + 1)!}.

Question 12. Lim_x→∞[x{√(x²+ 1) - √(x²- 1)}]

Question 13. Lim_x→∞[√(x + 2){√(x + 1) - √x}]

Explore

URL: https://www.geeksforgeeks.org/maths/class-11-rd-sharma-solutions-chapter-29-limits-exercise-29-6-set-1/

⇱ Class 11 RD Sharma Solutions - Chapter 29 Limits - Exercise 29.6 | Set 1 - GeeksforGeeks

Class 11 RD Sharma Solutions - Chapter 29 Limits - Exercise 29.6 | Set 1

Question 1. Limx→∞{(3x - 1)(4x - 2)}/{(x + 8)(x - 1)}.

Question 2. Limx→∞{(3x3 - 4x2 + 6x - 1)}/{(2x3 + x2 - 5x + 7)}.

Question 3. Limx→∞{(5x3 - 6)}/{√(9 + 4x6)}.

Question 4. Limx→∞{√(x2 + cx) - x}

Question 5. Limx→∞{√(x + 1) - √x}

Question 6. Limx→∞{√(x2 + 7x) - x}

Question 7. Limx→∞(x)/{√(4x2 + 1) - 1}

Question 8. Limn→∞(n2)/{1 + 2 + 3 + 4 + ................ + n}

Question 9. Limx→∞(3x-1 + 4x-2)/(5x-1 + 6x-2)

Question 10. Limx→∞{√(x2 + a2) - √(x2 + b2)}/{√(x2 + c2) - √(x2 + d2)}

Question 11. Limn→∞{(n + 2)! + (n + 1)!}/{(n + 2)! - (n + 1)!}.

Question 12. Limx→∞[x{√(x2 + 1) - √(x2 - 1)}]

Question 13. Limx→∞[√(x + 2){√(x + 1) - √x}]

Explore

Question 1. Lim_x→∞{(3x - 1)(4x - 2)}/{(x + 8)(x - 1)}.

Question 2. Lim_x→∞{(3x³- 4x²+ 6x - 1)}/{(2x³+ x²- 5x + 7)}.

Question 3. Lim_x→∞{(5x³- 6)}/{√(9 + 4x⁶)}.

Question 4. Lim_x→∞{√(x²+ cx) - x}

Question 5. Lim_x→∞{√(x + 1) - √x}

Question 6. Lim_x→∞{√(x²+ 7x) - x}

Question 7. Lim_x→∞(x)/{√(4x²+ 1) - 1}

Question 8. Lim_n→∞(n²)/{1 + 2 + 3 + 4 + ................ + n}

Question 9. Lim_x→∞(3x^-1+ 4x^-2)/(5x^-1+ 6x^-2)

Question 10. Lim_x→∞{√(x²+ a²) - √(x²+ b²)}/{√(x²+ c²) - √(x²+ d²)}

Question 11. Lim_n→∞{(n + 2)! + (n + 1)!}/{(n + 2)! - (n + 1)!}.

Question 12. Lim_x→∞[x{√(x²+ 1) - √(x²- 1)}]

Question 13. Lim_x→∞[√(x + 2){√(x + 1) - √x}]