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HSC Science (Electronics) 12th Standard Board Exam - Maharashtra State Board Question Bank Solutions

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Find the values of x for which the following functions are strictly increasing:

f(x) = 3 + 3x – 3x2 + x3

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Find the values of x for which the following func- tions are strictly increasing : f(x) = x3 – 6x2 – 36x + 7

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

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Find the values of x for which the following functions are strictly decreasing:

f(x) = 2x3 – 3x2 – 12x + 6

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Find the values of x for which the following functions are strictly decreasing : f(x) = `x + (25)/x`

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Find the values of x for which the following functions are strictly decreasing : f(x) = x3 – 9x2 + 24x + 12

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Find the values of x for which the function f(x) = x3 – 12x2 – 144x + 13 (a) increasing (b) decreasing

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Find the values of x for which f(x) = `x/(x^2 + 1)` is (a) strictly increasing (b) decreasing.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

show that f(x) = `3x + (1)/(3x)` is increasing in `(1/3, 1)` and decreasing in `(1/9, 1/3)`.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = x – cos x is increasing for all x.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Show that y = `log (1 + x) – (2x)/(2 + x), x > - 1` is an increasing function on its domain.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Prove that y = `(4sinθ)/(2 + cosθ) - θ` is an increasing function if `θ ∈[0, pi/2]`

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Choose the correct option from the given alternatives :

Let f(x) = x3 – 6x2 + 9x + 18, then f(x) is strictly decreasing in ______.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Solve the following : Find the intervals on which the function y = xx, (x > 0) is increasing and decreasing.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Solve the following:

Find the intervals on which the function f(x) = `x/logx` is increasing and decreasing.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Find the value of x, such that f(x) is decreasing function.

f(x) = 2x3 – 15x2 – 84x – 7 

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Let f(x) = x3 − 6x2 + 9ЁЭСе + 18, then f(x) is strictly decreasing in ______

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Prove that function f(x) = `x - 1/x`, x ∈ R and x ≠ 0 is increasing function

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Show that f(x) = x – cos x is increasing for all x.

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Show that the function f(x) = x3 + 10x + 7 for x ∈ R is strictly increasing

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined

Test whether the function f(x) = x3 + 6x2 + 12x − 5 is increasing or decreasing for all x ∈ R

[9] Applications of Derivatives
Chapter: [9] Applications of Derivatives
Concept: undefined >> undefined
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