Biology
General
Easy
Question
Match Column - I with Column - II and select the correct option from the codes given below.
![](data:image/png;base64,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)
- (a)
(i), (b)
(ii), (c)
(iii)
- (a)
(iii), (b)
(i), (c)
(ii)
- (a)
(iii), (b)
(ii), (c)
(i)
- (a)
(ii), (b)
(iii), (c)
(i)
The correct answer is: (a)
(i), (b)
(ii), (c)
(iii)
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Which graph represents auto catalysis?
Which graph represents auto catalysis?
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A) The frequency band of VHF is greater than UHF of TV transmission
B) Optical fiber transmission has frequency band of 1 THz to 1000 THz
A) The frequency band of VHF is greater than UHF of TV transmission
B) Optical fiber transmission has frequency band of 1 THz to 1000 THz
physics-General
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A) Satellite communication uses different frequency bands for uplink and downlink
B) Bandwidth of video signals is 4.2 MHz
A) Satellite communication uses different frequency bands for uplink and downlink
B) Bandwidth of video signals is 4.2 MHz
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The TV broad casting bands are
The TV broad casting bands are
physics-General
physics-
The FM Radio broad casting band is
The FM Radio broad casting band is
physics-General
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The short wave Radio broadcasting band is
The short wave Radio broadcasting band is
physics-General
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Band width of an optical fiber is
Band width of an optical fiber is
physics-General
physics-
The band width required for transmitting video signal is
The band width required for transmitting video signal is
physics-General
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A digital signal
A digital signal
physics-General
physics-
Digital signals
i) do not provide a continuous set of values.
ii) represents values as descrete steps.
iii) can utilize binary system
iv) can utilize decimal as well as binary system.
The true option is.
Digital signals
i) do not provide a continuous set of values.
ii) represents values as descrete steps.
iii) can utilize binary system
iv) can utilize decimal as well as binary system.
The true option is.
physics-General
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Digital signals
Digital signals
physics-General
biology
Listed below are four respiratory capacities (i - iv) and four jumbled respiratory volumes of a normal human adult.
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)
Which one of the following is the correct matching of two capacities and volumes?
Listed below are four respiratory capacities (i - iv) and four jumbled respiratory volumes of a normal human adult.
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)
Which one of the following is the correct matching of two capacities and volumes?
biologyGeneral
physics-
A particle is moving on a circular path of radius
with uniform velocity
. The change in velocity when the particle moves from
to
is![blank left parenthesis angle P O Q equals 40 degree right parenthesis](data:image/png;base64,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)
![](data:image/png;base64,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)
A particle is moving on a circular path of radius
with uniform velocity
. The change in velocity when the particle moves from
to
is![blank left parenthesis angle P O Q equals 40 degree right parenthesis](data:image/png;base64,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)
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==)
physics-General
Maths-
Maths-General
physics-
A small mass
is attached to a massless string whose other end is fixed at
as shown in the figure. The mass is undergoing circular motion in the
plane with centre at
and constant angular speed
. If the angular momentum of the system, calculated about
and
are denoted by
and
respectively, then
![](data:image/png;base64,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)
A small mass
is attached to a massless string whose other end is fixed at
as shown in the figure. The mass is undergoing circular motion in the
plane with centre at
and constant angular speed
. If the angular momentum of the system, calculated about
and
are denoted by
and
respectively, then
![](data:image/png;base64,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)
physics-General