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Continuity & Differentiability Practice Questions - DPP for JEE
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Page 2
f(0) =0 and f ' (0) = 3
? f(x) = 3x + c, Q f(0) = 0 ? c = 0
? f(x) = 3x
2. (b)
? yy' + x = 0
....(i)
3. (c) Since f(x) is continuous at x = 0 ?
Take any point x = a, then at x = a
? f(x) is continuous at x = a. Since x = a is any arbitrary point,
therefore f(x) is continuous for all x.
4. (a) Let ...... (i)
Page 3
f(0) =0 and f ' (0) = 3
? f(x) = 3x + c, Q f(0) = 0 ? c = 0
? f(x) = 3x
2. (b)
? yy' + x = 0
....(i)
3. (c) Since f(x) is continuous at x = 0 ?
Take any point x = a, then at x = a
? f(x) is continuous at x = a. Since x = a is any arbitrary point,
therefore f(x) is continuous for all x.
4. (a) Let ...... (i)
and ...... (ii)
In equation (i) put, x = tan
= tan
–1
(tan 2 )
u = 2 ...... (a)
In equation (ii), put x = tan
? v = ........ (b)
From equations (a) and (b),
Required differential coefficient will be 1.
5. (c) In the definition of the function, then f(x) will be undefined
in x > 0.
Q f(x) is continuous at x = 0, ? LHL = RHL = f(0)
?
?
?
? a + 2
? a + 2 ?
Page 4
f(0) =0 and f ' (0) = 3
? f(x) = 3x + c, Q f(0) = 0 ? c = 0
? f(x) = 3x
2. (b)
? yy' + x = 0
....(i)
3. (c) Since f(x) is continuous at x = 0 ?
Take any point x = a, then at x = a
? f(x) is continuous at x = a. Since x = a is any arbitrary point,
therefore f(x) is continuous for all x.
4. (a) Let ...... (i)
and ...... (ii)
In equation (i) put, x = tan
= tan
–1
(tan 2 )
u = 2 ...... (a)
In equation (ii), put x = tan
? v = ........ (b)
From equations (a) and (b),
Required differential coefficient will be 1.
5. (c) In the definition of the function, then f(x) will be undefined
in x > 0.
Q f(x) is continuous at x = 0, ? LHL = RHL = f(0)
?
?
?
? a + 2
? a + 2 ?
6. (d) f(x) = [x]
2
– [x
2
] = (–1)
2
– (0)
2
= 0, – 1< x < 0
= 0 – 0 = 0, 0 = x < 1 and = 1 – 1 = 0, 1 = x <
and = 1 – 3 = –2, = x <
? From above it is clear that the function is discontinuous at
except at x = 1.
7. (d) For f (x) to be continuous at x = 0, we should have
f (x) = f (0) = 12(log 4)
3
f (x) =
= (log 4)
3
· 1 · p ·
= 3p (log 4)
3
· Hence p = 4.
8. (c)
?
? ? ?
9. (d) We have,
Page 5
f(0) =0 and f ' (0) = 3
? f(x) = 3x + c, Q f(0) = 0 ? c = 0
? f(x) = 3x
2. (b)
? yy' + x = 0
....(i)
3. (c) Since f(x) is continuous at x = 0 ?
Take any point x = a, then at x = a
? f(x) is continuous at x = a. Since x = a is any arbitrary point,
therefore f(x) is continuous for all x.
4. (a) Let ...... (i)
and ...... (ii)
In equation (i) put, x = tan
= tan
–1
(tan 2 )
u = 2 ...... (a)
In equation (ii), put x = tan
? v = ........ (b)
From equations (a) and (b),
Required differential coefficient will be 1.
5. (c) In the definition of the function, then f(x) will be undefined
in x > 0.
Q f(x) is continuous at x = 0, ? LHL = RHL = f(0)
?
?
?
? a + 2
? a + 2 ?
6. (d) f(x) = [x]
2
– [x
2
] = (–1)
2
– (0)
2
= 0, – 1< x < 0
= 0 – 0 = 0, 0 = x < 1 and = 1 – 1 = 0, 1 = x <
and = 1 – 3 = –2, = x <
? From above it is clear that the function is discontinuous at
except at x = 1.
7. (d) For f (x) to be continuous at x = 0, we should have
f (x) = f (0) = 12(log 4)
3
f (x) =
= (log 4)
3
· 1 · p ·
= 3p (log 4)
3
· Hence p = 4.
8. (c)
?
? ? ?
9. (d) We have,
Since ? f(x) is differentiable at x = 0
Since every differentiable function is continuous, therefore, f(x) is continuous
at x = 0.
10. (a)
Hence exists if .
If g(x) = a ? 0 (constant) then
Thus doesn’t exist in this case.
? exists in case of (b), (c) and (d) each.
11. (d) f (x) = max. {x, x
3
}
=
? f ' (x) =
Clearly f is not differentiable at – 1, 0 and 1.
12. (b) f is continuous at , if .
Now,
?
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Dec 26, 2024 Last updated |
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