MCQ Questions for Class 11 Engineering Physics Units And Measurement Quiz 13

The dimension of $$ \cfrac {1}{2}\epsilon_o E^2$$ permittivity of free space and E:
Intensity of electric field) is

0%
$$[MLT^{-1}]$$
0%
$$[ML^2T^{-1}]$$
0%
$$[ML^{-1}T^{-2}]$$
0%
$$[ML^2T^{-2}]$$

The radius of a sphere is measured as $$(10 \pm 0.02\ \% )$$ cm. The error in the measurement of its volume is

0%
$$25.1$$ cc
0%
$$25.12$$ cc
0%
$$2.51$$ cc
0%
$$251.2$$ cc

A particle is moving with a velocity $$35\ m/s$$ along positive x-axis.It's acceleration is towards negative X-axis with the magnitude $$4m/s^ {2}$$ then the distance covered by the particle in the $$9th$$ second:-

0%
$$1m$$
0%
$$\dfrac {9}{8}m$$
0%
$$\dfrac {5}{4}m$$
0%
$$153m$$

0%
$$ 53^0 $$
0%
$$ 143^0 $$
0%
$$ 37^0 $$
0%
$$ 127^0 $$

Two constant force $$ \overrightarrow F_1 and \overrightarrow F_2 $$ acts on a body.these forces displaces the body from point P(1, -2, 3) to Q (2, 3, 7 ) in 2s starting from rest.force $$\overrightarrow F_1 $$ is of magnitude 9 N and acting along vector $$ ( 2 \hat i - 2 \hat j + \hat k ) $$ . the positions are in meter. find work done by $$ \overrightarrow F_1 $$.

0%
$$-12J$$
0%
$$+12J$$
0%
$$36J$$
0%
$$-36J$$

A force is given by $$F = at + b{t^2}$$, where $$t$$ is time, the dimensions of $$a$$ and $$b$$ are respectively :

0%
$$\left[ {ML{T^{ - 4}}} \right]$$ and $$\left[ {ML{T^{ - 1}}} \right]$$
0%
$$\left[ {ML{T^{ - 1}}} \right]$$ and $$\left[ {ML{T^0}} \right]$$
0%
$$\left[ {ML{T^{ - 3}}} \right]$$ and $$\left[ {ML{T^{ - 4}}} \right]$$
0%
$$\left[ {ML{T^{ - 3}}} \right]$$ and $$\left[ {ML{T^0}} \right]$$

The radius of a sphere is measured to be $$(4.0 +2.0)$$ cm the maximum percentage error in the measurement of the volume of the sphere is

0%
$$10$$ %
0%
$$15$$ %
0%
$$20 $$%
0%
$$25$$ %

If the constant of gravitation $$(G)$$, Planck's constant $$(h)$$ and the velocity of light $$(c)$$ be chosen as fundamental units. The dimension of the radius of gyration is

0%
$$h^{-1/2} c^{1/2} G^{1/2}$$
0%
$$h^{1/2} c^{-3/2} G^{1/2}$$
0%
$$h^{1/2} c^{-3/2} G^{-1/2}$$
0%
$$h^{-1/2} c^{-3/2} G^{1/2}$$

In the equation $${ S }_{ nth }=u+\dfrac { a }{ 2 } \left( 2n-1 \right) $$, the letters have their usual meanings. The dimensional formula of $$S_{nth}$$ is

0%
$$\left[ { ML }^{ 0 }T \right] $$
0%
$$\left[ { ML }^{ -1 }T^{ -1 } \right] $$
0%
$$\left[ { M^{ 0 }L }T^{ -1 } \right] $$
0%
$$\left[ { M^{ 0 }L }T^{ 0 } \right] $$

A physical quantity x depends on quantities y and Z as follows : x= Ay+B tan (Cz), where A, B and C are constants . Which of the following do not have same dimensions ?

0%
x and B
0%
C and $$z^{ -1 }$$
0%
y and B/A
0%
x and A

The term $$(1/2)pv^{ 2 }$$ occurs in Bernoulli's equation , with $$\beta $$ being the density of fluid and V its speed . The dimensions of this term are

0%
$$\left[ { M }^{ -1 }{ L }^{ 5 }{ T }^{ 2 } \right] $$
0%
$$\left[ { M }{ L }{ T }^{ 2 } \right] $$
0%
$$\left[ { M }{ L }^{ -1 }{ T }^{ -2 } \right] $$
0%
$$\left[ { M }^{ -1 }{ L }^{ 9 }{ T }^{ -2 } \right] $$

Two resistance are measured in ohm and is given as:-
$${ R }_{ 1 }=3\Omega \neq 1%$$
$${ R }_{ 2 }=6\Omega \neq 2%$$
When they are connectrd in parallel, the percentage error in equivalent resistance is

0%
$$3.33\%$$
0%
$$4.5\%$$
0%
$$0.67\%$$
0%
$$1.33\%$$

The pair of physical quantities, that have difference dimensions is

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Planck's constant and angular momentum
0%
Energy density and pressure
0%
Relative density and plane angle
0%
Specific heat capacity and latent heat

The dimension of the ratio of magnetic flux and the resistance is equal to that of:

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induced emf
0%
charge
0%
inductance
0%
current

If pressure is (P), velocity (V), and time (T) are taken as the fundamental quantities, then the dimensional formula of force is

0%
$$\left[ P ^ { 1 } V ^ { 1 } T ^ { 1 } \right]$$
0%
$$\left[ P ^ { 1 } V ^ { 2 } T ^ { 1 } \right]$$
0%
$$\left\lceil P ^ { 1 } V ^ { 1 } T ^ { 2 } \right\rceil$$
0%
$$\left[ P ^ { 1 } V ^ { 2 } T ^ { 2 } \right]$$

In a system of units if force (F), acceleration (A) and time, (T) are taken as fundamental units then the dimensional formula of energy is -

0%
$$FA^{2}T$$
0%
$$FAT^{2}$$
0%
$$F^{2}AT$$
0%
FAT

If the radius of the earth were to shrink by 1% its mass remaining the same, the acceleration due to gravity on the earth's surface would

0%
Decreased by 2%
0%
Increased by 2%
0%
Remain unchanged
0%
Increased by 1%

Dimensional formula $$[{ M }^{ 1 }{ L }^{ 0 }{ T }^{ -2 }]$$ is equal to dimensional formula of

0%
Surface tension
0%
surface energy
0%
Both A and B
0%
None of these

Dimensional formula of momentum is :

0%
$$MLT$$
0%
$$M^{-1} L^{-1} T^{-1}$$
0%
$$ML^{-1} T^{-1}$$
0%
$$MLT^{-1}$$

Dimensions of rate of change of flux are equivalent to those of

0%
voltage
0%
current
0%
1/charge
0%
charge

If $$S = \dfrac { d } { t } + \dfrac { e } { ( f - t ) ^ { 2 } } ,$$ where $$S$$ is the displacement of the body in time $$t .$$ Find the dimensions of $$e$$ and $$f$$

0%
$$\mathrm { LT } , \mathrm { T }$$
0%
$$\mathrm { LT } ^ { 2 } , \mathrm { T }$$
0%
$$\mathrm { L } ^ { 2 } \mathrm { T } , \mathrm { T } ^ { - 3 }$$
0%
$$LT, T ^ { 2 }$$

The dimensional formula for the acceleration, velocity and length are $$\alpha { \beta }^{ -2 }, \alpha { \beta }^{ -1 }$$ and $$\alpha y$$. What is the dimensional formula for the coefficient of friction ?

0%
$$\alpha \beta y$$
0%
$${ \alpha }^{ -1 }{ \beta }^{ 10 }{ y }^{ 0 }$$
0%
$${ \alpha }^{ 0 }{ \beta }^{ -1 }{ y }^{ 0 }$$
0%
$${ \alpha }^{ 0 }{ \beta }^{ 0 }{ y }^{ 0 }$$

The dimensions of the ratio of angular momentum to linear momentum:

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$$\left[ { M }^{ 1 }{ L }^{ -3 }{ T }^{ 0 } \right] $$
0%
$$\left[ { M }^{ 0 }{ L }^{ 1 }{ T }^{ -2 } \right] $$
0%
$$\left[ { M }^{ 0 }{ L }^{ 0 }{ T }^{ -1 } \right] $$
0%
$$\left[ { M }^{ 0 }{ L }^{ 1 }{ T }^{ 0 } \right] $$

The dimensions of universal gas constant is

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$$\left[ { M }^{ }{ L }^{ 2 }{ T }^{ -2 }{ \theta }^{ -1 } \right] $$
0%
$$\left[ { M }^{ 2 }{ L }^{ }{ T }^{ -2 }{ \theta }^{ } \right] $$
0%
$$\left[ { M }^{ }{ L }^{ 3}{ T }^{ -1 }{ \theta }^{ -1 } \right] $$
0%
None of these

Velocity gradient has same dimensional formula as

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Frequency
0%
angular momentum
0%
velocity
0%
none of these

The dimension of electric permittivity is

0%
$$M{L}^{3}{T}^{4}{A}^{-2}$$
0%
$$M{L}^{-3}{T}^{4}{A}^{2}$$
0%
$${M}^{-1}{L}^{3}{T}^{4}{A}^{2}$$
0%
$${M}^{-1}{L}^{-3}{T}^{4}{A}^{2}$$

Find dimension formula of polarisation?

0%
$$\left[ { L }^{ -2 }T^{ 1 }{ A }^{ 1 } \right] $$
0%
$$\left[ { L }^{ 2 }T^{ 1 }{ A }^{ -1 } \right] $$
0%
$$\left[ { L }^{ 2}T^{ 1 }{ A }^{ 1} \right] $$
0%
$$\left[ { L }^{ -3}T^{ -1 }{ A }^{ 1} \right] $$

If $$\eta$$ represents the coefficient of viscosity and $$T$$ the surface tension, then the dimension of $$\cfrac{T}{\eta}$$ is same as that of:

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length
0%
mass
0%
time
0%
speed

Dimensional formula of modulus of elasticity is

0%
$$\left[ M ^ { 0 } L ^ { - 1 } T ^ { - 2 } \right]$$
0%
$$\left[ M ^ { 1 } L ^ { - 1 } T ^ { - 2 } \right]$$
0%
$$\left[ M ^ { 1 } L ^ { 1 } T ^ { - 2 } \right]$$
0%
$$\left[ M ^ { -1 } L ^ { - 1 } T ^ { - 2 } \right]$$

Given $$x = a + b t + c t ^ { 2 }$$ where $$x$$ in metre and $$t$$ in second. Find the dimensional formula of $$b$$

0%
$$L$$
0%
$$L T ^ { - 1 }$$
0%
$$L T ^ { - 2 }$$
0%
$$L ^ { 2 }$$

The radius of nucleus is $$r = r_0 A^{{1}/{3}}$$, where $$A$$ is mass number. The dimensions of $$r_0$$ is

0%
$$[MLT^{-2}]$$
0%
$$[M^0 L^0 T^{-1}$$
0%
$$[M^0 L T^0]$$
0%
None of these

If L be the inductance, R resistance and C be the capacitance of a capacitor, then dimensional formula of $$ \cfrac {L}{R} $$ and RC are

0%
$$ M^oLT^{-1}ML ^oT^{-1} $$
0%
$$ M^oL^oT,MLT^o $$
0%
$$ M^oL^oT, 1 $$
0%
$$ M^oL^oT, M^oL^oT $$

The dimensions of $$(\mu_{0}\epsilon_{0})^{-\dfrac {1}{2}}$$ are

0%
$$[L^{-\dfrac {1}{2}} T^{\dfrac {1}{2}}]$$
0%
$$[L^{\dfrac {1}{2}} T^-{\dfrac {1}{2}}]$$
0%
$$[L^{-1} T]$$
0%
$$[L T^{-1}]$$

If C be the capacitance and V be the electric potential,then the dimensional formula of $$ CV^2 $$ is

0%
$$ [ML ^{-3} TA] $$
0%
$$ [M^oLT^{-2} A^o] $$
0%
$$ [ML ^1 A^{-1 }] $$
0%
$$ [ML^2T^{-2} A^o] $$

Given $$x = a + b t + c t ^ { 2 }$$ where $$x$$ in metre and $$t$$ in second. Find the dimensional formula of $$C$$

0%
$$L$$
0%
$$L T ^ { - 1 }$$
0%
$$L T ^ { - 2 }$$
0%
$$L ^ { 2 } T ^ { 2 }$$

Given that m is the mass suspended from a spring force constant k. The dimension of the formula for $$\sqrt{m/k}$$ is same as that for

0%
frequency
0%
time period
0%
velocity
0%
wavelength

Velocity gradient has dimension of

0%
Force
0%
Frequency
0%
Surface tension
0%
momentum

The Earth's radius is $$6371\ km$$. The order of magnitude of the Earth's radius is

0%
$$10^3$$
0%
$$10^2$$
0%
$$10^7$$
0%
$$10^5$$

The diagram shows a cuboid block made from a metal of density $$2.5g/{cm}^{3}$$
What is the mass of the block?

0%
$$8.0kg$$
0%
$$16kg$$
0%
$$50g$$
0%
$$100g$$

The dimensional formula of pressure is

0%
$$ [MLT^{-2} ] $$
0%
$$ [ML^2T^{-2} ] $$
0%
$$ [ML^{-1}T^{-2} ] $$
0%
$$ [M^0L^{-1}T^{-2} ] $$

The dimension of $$ \frac {1}{2} \varepsilon _ o E^2 ( \varepsilon _ o $$ is the permitivity of free space and E is electric field) is

0%
$$ [ML^2T^{-1} ] $$
0%
$$ [ML^{-1} T^{2} ] $$
0%
$$ [ML^2 T^{-2} ] $$
0%
$$ [MLT^{-1} ]$$

In the density measurement of a cube, the mass an edge length are measured as $$\left( 10.00\pm 0.10 \right) kg$$ and $$\left( 0.10\pm 0.01 \right) m$$, respectively. The error in the measurement of density:

0%
$$0.10kg/{m}^{3}$$
0%
$$0.31kg/{m}^{3}$$
0%
$$0.07kg/{m}^{3}$$
0%
$$0.01kg/{m}^{3}$$
0%
No answer

The dimensional formula for the magnetic fields is

0%
$$ [MT^{-2} A^{-1} ] $$
0%
$$ [ML^2T^{-1}A^{-2} ] $$
0%
$$ [MT^{-2}A^{-2}] $$
0%
$$ [MT^{-1} A^{-2}] $$

The dimension of Magnetic flux.

0%
$$ML^{2}I^{-1}T^{-3}$$
0%
$$ML^{2}I^{-4}T^{-2}$$
0%
$$ML^{2}I^{-1}T^{-2}$$
0%
None of these

Which of the following does not have the dimension of force?

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Potential gradient
0%
Energy gradient
0%
Weight
0%
Rate of change of momentum

If $$P$$ and $$Q$$ have different non-zero dimensions, which of the following operations is possible?

0%
$$P+Q$$
0%
$$PQ$$
0%
$$P-Q$$
0%
$$ 1-\dfrac{P}{Q} $$

The pairs of physical quantities that have the same dimensions in (are):

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Reynolds number and coefficient of friction
0%
Curie and frequency of a light wave
0%
Latent heat and gravitational potential
0%
Planck's constant and torque

Taking frequency $$f$$, velocity $$v$$ and density $$\rho$$ to be the fundamental quantities then the dimensional formula for momentum will be?

0%
$$\rho v^4f^{-3}$$
0%
$$\rho v^3f^{-1}$$
0%
$$\rho v f^2$$
0%
$$\rho^2v^2f^2$$

If x,v and a denote the displacement, the velocity and the acceleration of a particle
executing simple harmonic motion of time period T, then which of the following do not
change with time?

0%
$$\dfrac{aT}{v}$$
0%
$$aT+2\pi v$$
0%
$$a^2T^2+4\pi^2 v^2$$
0%
$$aT$$
0%
$$vT$$

The dimensions of time constant are:

0%
$$[M^0L^0T^0]$$
0%
$$[M^0L^0T]$$
0%
$$[MLT]$$
0%
None of these

CBSE Questions for Class 11 Engineering Physics Units And Measurement Quiz 13 - MCQExams.com

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Practice Class 11 Engineering Physics Quiz Questions and Answers

CBSE Questions for Class 11 Engineering Physics Units And Measurement Quiz 13 - MCQExams.com

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Practice Class 11 Engineering Physics Quiz Questions and Answers

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