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Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - JEE MCQ


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10 Questions MCQ Test - Test: Monotonic-Increasing and Decreasing Functions(14 Sep)

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Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 1

The function  is monotonically decreasing in

Detailed Solution for Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 1

f(x)= {−(x−1)/x2   x<1,   x(x−1)/x2  x≥1}
​f'(x)= {(x−2)/x3   x<1,      −(x−2)/x3   x≥1}
​x<1, if f′(x)<0 (for f(x) to be monotonically decreasing
⇒ (x−2)/x3<0
⇒x∈(0,2)
But x<1 ⇒ x∈(0,1)
For x≥1, if f′(x)<0
⇒ −(x−2)]/x3<0
⇒(x−2)/x3 > 0
⇒x∈(−∞,0)∪(2,∞)
But, x≥1   ⇒x∈(2,∞)
Hence, x∈(0,1)∪(2,∞)

Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 2

The true set of real values of x for which the function, f(x) = x ln x – x + 1 is positive is

Detailed Solution for Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 2

f(x)=xlnx−x+1
f(1)=0
On differentiating w.r.t x, we get
f′(x)=x*1/x+lnx−1
=lnx
Therefore,f′(x)>0 for allx∈(1,∞)
f′(x)<0 for allx∈(0,1)
lim x→0 f(x)=1
f(x)>0
for allx∈(0,1)∪(1,∞)

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Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 3

 The set of all x for which ln (1 + x) ≤ x is equal to

Detailed Solution for Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 3

f(x) = ln(1+x) - x ≤ 0
f(x) = ln(1+x) - x
f’(x) = 1/(1+x) - 1
= (1 - 1 - x)/(1+x) 
= -x/(1+x)
f’(x) ≤ 0
-x/(1+x) ≤ 0
0 ≤ x /(1+x)
for(x = 2) (-2)/(1-2)
= 2 > 0, therefore x > - 1

Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 4

 The curve y = f(x) which satisfies the condition f'(x) > 0 and f"(x) < 0 for all real x, is

Detailed Solution for Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 4

f’(x) > 0 
=> f(x) is increasing
f’’(x) < 0  => f(x) is convex

Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 5

The function f(x) = x(x + 3) e–x/2 satisfies all the conditions of Rolle’s theorem in [–3, 0]. The value of c which verifies Rolle’s theorem, is

Detailed Solution for Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 5

f(x) = x (x + 3)e–x/2 is continuous in [–3, 0] 
and f′(x)=(x2 + 3x) (– 1/2)e-x/2 + (2x + 3)e–x/2 
= – 1/2(x2 – x – 6)e–x/2 
Therefore f′(x) exists (i.e., finite) for all x 
Also f(–3) = 0, f (0) = 0 
So that f(–3) = f(0) 
Hence all the three conditions of the theorem are satisfied. 
Now consider f′(c)=0 
i.e., –1/2(c2 – c – 6)e–c/2 = 0 
c2 – c – 6 = 0 
(c + 2) (c – 3) = 0 c = 3 or –2 
Hence there exists – 2 ∈ (–3, 0) such that 
f′(–2) = 0

Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 6


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Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 7


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Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 8


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Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 9


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Test: Monotonic-Increasing and Decreasing Functions(14 Sep) - Question 10


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