Question - 3 : -
Show that the function given by f(x)= sin x is
(a) strictly increasing in (b) strictlydecreasing in
(c) neither increasing nor decreasing in (0, π)

Answer - 3 : -

The given function is f(x)= sin x.

(a) Since for each

we have

Hence, f isstrictly increasing in

(b) Since for each

we have

Hence, f isstrictly decreasing in

Question - 4 : -
Find the intervals in which thefunction f given by f(x) = 2x³ −3x² − 36x + 7 is
(a) strictly increasing (b) strictly decreasing

Answer - 4 : -

The given function is f(x)= 2x³ − 3x² − 36x +7.

x =− 2, 3

The points x = −2 and x =3 divide the real line into three disjoint intervals i.e.,

In intervalsis positive while in interval

(−2, 3),

is negative.

Hence, the given function (f) isstrictly increasing in intervals, while function (f) is strictlydecreasing in interval (−2, 3).

Question - 5 : -
Find the intervals in which the following functions arestrictly increasing or decreasing:
(a) x² +2x − 5 (b) 10 − 6x − 2x²
(c) −2x³ −9x² − 12x + 1 (d) 6 − 9x − x²
(e) (x + 1)³ (x −3)³

Answer - 5 : -

(a) We have,

Now,

x = −1

Point x = −1 divides the real lineinto two disjoint intervals i.e.,

In interval

∴f isstrictly decreasing in interval

Thus, f is strictlydecreasing for x < −1.

In interval

∴ f is strictly increasing in interval

Thus, f is strictlyincreasing for x > −1.

(b) We have,

f(x)= 10 − 6x − 2x²

The point divides the real line intotwo disjoint intervals i.e.,

In interval i.e., when

f'(x)=-6-4x>0.

∴ f is strictly increasing for

In interval i.e., when

∴ f is strictly decreasing for

f(x)= −2x³ − 9x² − 12x +1

Points x =−1 and x = −2 divide the real line into three disjoint intervalsi.e.,

In intervals i.e., when x < −2and x > −1,

∴ f is strictly decreasing for x <−2 and x > −1.

Now, in interval (−2, −1) i.e., when −2 < x <−1,

∴ f is strictly increasing for

(d) We have,

The pointdivides the real line intotwo disjoint intervals i.e.,

In interval i.e., for

∴ f is strictly increasing for

In interval i.e., for

∴ f is strictly decreasing for

(e) We have,

f(x)= (x + 1)³ (x − 3)³

The points x =−1, x = 1, and x = 3 divide the real lineinto four disjoint intervals i.e.,

, (−1, 1), (1, 3), and

In intervalsand (−1, 1),

∴ f is strictly decreasing inintervalsand (−1, 1).

In intervals (1, 3) and

∴ f is strictly increasing inintervals (1, 3) and

Question - 6 : - Show that, is an increasing function of x throughoutits domain.

Answer - 6 : -

We have,

Hence, function f isincreasing throughout this domain.

Question - 7 : - Find the values of x forwhichis an increasing function.

Answer - 7 : -

We have,

The points x =0, x = 1, and x = 2 divide the real line intofour disjoint intervals i.e.,

In intervals

∴ y is strictly decreasing inintervals

However, in intervals (0,1) and (2, ∞),

∴ y is strictly increasing in intervals(0, 1) and (2, ∞).

y isstrictly increasing for 0 < x < 1 and x >2.

Question - 8 : - Prove that is an increasingfunction of θ in

Answer - 8 : -

We have,

Since cos θ ≠ 4, cos θ =0.

Now,

In interval

we have cos θ >0. Also, 4 > cos θ ⇒ 4− cos θ >0

Therefore, y isstrictly increasing in interval

Also, the given function iscontinuous at

Hence, y isincreasing in interval

Question - 9 : -
Prove that the logarithmic function is strictly increasingon (0, ∞).

Answer - 9 : -

It is clear that for x >0

Hence, f(x) = log x isstrictly increasing in interval (0, ∞).

Question - 10 : -
Prove that the function f givenby f(x) = x² − x +1 is neither strictly increasing nor strictly decreasing on (−1, 1).

Answer - 10 : -

The given function is f(x)= x² − x + 1.

The pointdivides the interval (−1,1) into two disjoint intervals i.e.,

Now, in interval

Therefore, f isstrictly decreasing in interval

However, in interval

Therefore, f isstrictly increasing in interval

Hence, f is neitherstrictly increasing nor decreasing in interval (−1, 1).

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