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Application of Derivatives

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Short Answer Type

181.

Find the intervals in which the following functions are strictly increasing or strictly decreasing:
2x³ – 8x² + 10x + 5

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182.

Find the intervals in which the following functions are strictly increasing or strictly decreasing:
2x³ – 6x² – 48x + 17

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183.

Find the intervals in which the following functions are strictly increasing or strictly decreasing:
f (x) = 2x³– 9x² + 12x + 30

95 Views

184.

Find the intervals in which the following functions are strictly increasing or strictly decreasing:
f (x) = 2x³ – 3x² – 36x + 7

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185.

Find the intervals in which the following functions are strictly increasing or strictly decreasing:
f(x) = 2x³ – 21x² + 36x – 40

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186.

Find the intervals in which the following functions are strictly increasing or strictly decreasing:
4x³ – 6x² – 72x + 30

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187.

Find the intervals in which the following functions are strictly increasing or strictly decreasing:
– 2x³ – 9x² – 12x + 1

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188.

Find the intervals in which the function
$straight f left parenthesis straight x right parenthesis space equals space fraction numerator 4 straight x squared plus 1 over denominator straight x end fraction comma space space straight x not equal to 0$ , is
(a) increasing (b) decreasing.

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Long Answer Type

189.

Find the intervals in which the function f is given by
$straight f left parenthesis straight x right parenthesis space equals space straight x cubed plus 1 over straight x cubed comma space space space straight x not equal to 0 space space is space$
(i) increasing (ii) decreasing

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190.
Determine for which values of x, the function f (x) = x⁴ – 2x² is increasing or decreasing.

f (x) = x⁴ – 2x²∴ f '(x) = 4 x³– 4x = 4x (x²– 1 )
(i) For f (x) to be increasing , f ' (x) > 0
Case I. Let x > 0 .
∴ f ' (x) > 0 when x² – 1 > 0 i.e.. (x – 1) (x + 1) > 0
∴ x does not lie in (– 1, 1)
Also x > 0
∴ we have x > 1
Including end point, f (x) is increasing in x ≥ 1.
Case II. Let x < 0
∴ (x) > 0 when x² – 1 < 0
i.e., when (x – 1) (x + 1) < 0
i.e., when x lies in (– 1, 1)
But x < 0
∴ we have – 1 < x < 0
∴ f (x) is increasing in – 1 < x < 0 or (– 1, 0)

(ii) For f (x) to be decreasing, f '(x) < 0
Case I. Let x > 0
∴ f ' (x) < 0 when x² – 1 < 0
ie., (x – 1) (x + 1) < 0 i.e., x lies in (– 1, 1)
But x > 0
∴ we have 0 < x < 1
∴ f (x) is decreasing in ( 0, 1)
Case II. Let x < 0
∴ f ' (x) < 0 when x² – 1 > 0
i.e. (x – 1) (x + 1) > 0
i.e., x does not lie in (– 1, 1)
Also x < 0
∴ we have x < – 1
∴ f (x) is decreasing in x < – 1.