HSC Arts Class 11 - Tamil Nadu Board of Secondary Education Question Bank Solutions for Mathematics

Mathematics

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Evaluate the following limits:

`lim_(x - 0) (sqrt(1 + x^2) - 1)/x`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> 0) (sqrt(1 - x) - 1)/x^2`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> 5) (sqrt(x - 1) - 2)/(x - 5)`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> "a") (sqrt(x - "b") - sqrt("a" - "b"))/(x^2 - "a"^2) ("a" > "b")`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Find the left and right limits of f(x) = `(x^2 - 4)/((x^2 + 4x+ 4)(x + 3))` at x = – 2

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Find the left and right limits of f(x) = tan x at x = `pi/2`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> 3) (x^2 - 9)/(x^2(x^2 - 6x + 9))`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> oo) 3/(x - 2) - (2x + 11)/(x^2 + x - 6)`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> oo) (x^3 + x)/(x^4 - 3x^2 + 1)`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> oo) (x^4 - 5x)/(x^2 - 3x + 1)`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> oo) (1 + x - 3x^3)/(1 + x^2 +3x^3)`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x ->oo) (x^3/(2x^2 - 1) - x^2/(2x + 1))`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Show that `lim_("n" -> oo) (1 + 2 + 3 + ... + "n")/(3"n"^2 + 7n" + 2) = 1/6`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Show that `lim_("n" -> oo) (1^2 + 2^2 + ... + (3"n")^2)/((1 + 2 + ... + 5"n")(2"n" + 3)) = 9/25`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Show that `lim_("n" -> oo) 1/1.2 + 1/2.3 + 1/3.4 + ... + 1/("n"("n" + 1))` = 1

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

An important problem in fishery science is to estimate the number of fish presently spawning in streams and use this information to predict the number of mature fish or “recruits” that will return to the rivers during the reproductive period. If S is the number of spawners and R the number of recruits, “Beverton-Holt spawner recruit function” is R(S) = `"S"/((alpha"S" + beta)` where `alpha` and `beta` are positive constants. Show that this function predicts approximately constant recruitment when the number of spawners is sufficiently large

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

A tank contains 5000 litres of pure water. Brine (very salty water) that contains 30 grams of salt per litre of water is pumped into the tank at a rate of 25 litres per minute. The concentration of salt water after t minutes (in grams per litre) is C(t) = `(30"t")/(200 + "t")`. What happens to the concentration as t → ∞?

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> oo)(1 + 1/x)^(7x)`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> 0)(1 + x)^(1/(3x))`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

Evaluate the following limits:

`lim_(x -> oo)(1 + "k"/x)^("m"/x)`

[9] Differential Calculus - Limits and Continuity

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Chapter: [9] Differential Calculus - Limits and Continuity
Concept: undefined >> undefined

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HSC Arts Class 11 - Tamil Nadu Board of Secondary Education Question Bank Solutions for Mathematics

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