Unit and Dimension MCQ for jelet JEE NEET CUET

MCQ on Unit and Dimension chapter for different exams like JELET, NEET, JEE, CUET, board exams and first year engineering physics

1. The dimensional formula of pressure is
a. [MLT-2]
b. [ML-1T2]
c. [ML-1T-2]
d. [MLT2]

option c
Pressure=\frac{Force}{Area} \\
Pressure=\frac{Mass\times Acceleration}{Area} \\
[Pressure]=\frac{[Mass]\times [Acceleration]}{[Area]} \\
[Pressure]=\frac{[M]\times [LT^{-2}]}{[L^{2}]}\\
The dimension of pressure is [Pressure]=[ML^{-1}T^{-2}]

2. The dimensional formula for angular momentum is
a. [M0L-2T-2]
b. [ML2T-1]
c. [MLT-1]
d. [ML2T-2]

option b

Angular momentum,L = mvr
[L] = [m][v][r]
[L] = [M][LT-1][L]
[L] = [ML2T-1]

3. The dimensional formula of torque is
a. [ML2T-2]
b. [MLT-2]
c. [ML-1T-2]
d. [ML-2T-2]

option a


Torque = Force \times {Distance}
[Torque] = [Force] \times [{Distance}]
[Torque] = [MLT^{-2}] \times [{L}]
[Torque] = [ML^{2}T^{-2}]

4. The dimension of universal gravitation constant is
a. [M-2L2T-1]
b. [M-1L3T-2]
c. [ML2T-1]
d. [M-2L3T-2]

option b

The gravitational force, F is given by
F=G\frac{m_{1}m_{2}}{r^{2}}
G=F\frac{r^{2}}{m_{1}m_{2}}
The dimension of gravitational constant is
[G]=[F]\frac{[r^{2}]}{[m_{1}][m_{2}]}
[G]=[MLT^{-2}]\frac{[L^{2}]}{[M][M]}
[G]=[M^{-1}L^{3}T^{-2}]
So, option (b) is the correct dimension of gravitational constant.

5. According to Newton, the viscous force acting between liquid layers of area A and velocity gradient \frac{\Delta V}{\Delta Z} is given by F=-\eta A\frac{\Delta V}{\Delta Z} where \eta  is constant called coefficient of viscosity, the dimensional formula of coefficient of viscosity \eta   is
a. [ML-2T-2]
b. [M0L0T0]
c. [ML2T-2]
d. [ML-1T-1]

option d

To find the dimension of coefficient of viscosity, write the equation
F=-\eta A\frac{\Delta V}{\Delta Z} where \eta is the coefficient of viscosity

The dimension of coefficient of viscosity can be found from the above equation
[\eta ] = \frac{[F]}{[A]} \frac{[\Delta Z]}{[\Delta V]}

[\eta ] = \frac{[MLT^{-2}]}{[L^{2}]} \frac{[L]}{[LT^{-1}]}
So, the dimension of coefficient of viscosity is
[\eta ] = [ML^{-1}T^{-1}]
The right answer is option d

6. The frequency of vibration f of a mass m suspended from a spring of spring constant k is given by a relation of the type f=cm^{x}k^{y} where c is a dimensionless constant. The values of x and y are
a. x=\frac{1}{2}, y=\frac{1}{2}
b. x=-\frac{1}{2}, y=-\frac{1}{2}
c. x=\frac{1}{2}, y=-\frac{1}{2}
d. x=-\frac{1}{2}, y=\frac{1}{2}

option d

7. Turpentine oil is flowing through a tube of length l and radius r. The pressure difference between the two ends of the tube is P. The viscosity of oil is given by \eta =P \frac{(r^{2}-x^{2})}{4vl} , where v is the velocity of oil at a distance x from the axis of the tube. The dimension of coefficient of viscosity \eta is
a. [M0L0T0]
b. [MLT-1]
c. [ML2T-2]
d. [ML-1T-1]

option d

The given equation is
\eta =P \frac{(r^{2}-x^{2})}{4vl}

[\eta] =[P] \frac{[(r^{2}-x^{2})]}{4[v][l]}
The dimension of pressure is [P] = [ML-1T-2]
The dimension of [(r^{2}-x^{2})] = [L^{2}]
Dimension of velocity is [v]=[LT^{-1}]
The dimension of length is, [l]=[L]
So, the dimension of coefficient of viscosity is
[\eta] =[ML^{-1}T^{-2}] \frac{[L^{2}])}{[LT^{-1}][L]}

[\eta] =[ML^{-1}T^{-1}]

8. The velocity v of a particle at time t is given by v =at+\frac{b}{t+c} , where a, b and c are constant. The dimensions of a, b and c are respectively
a. L^{2},T and LT^{2}
b. LT^{2},LT and L
c. L,LT and T^{2}
d. LT^{-2},L and T

option d

9. The dimension of (\mu_{0}\epsilon _{0})^{-\frac{1}{2}} is
a. L^{\frac{1}{2}}T^{-\frac{1}{2}}
b. L^{-1}T
c. LT^{-1}
d. L^{\frac{1}{2}}T^{\frac{1}{2}}

option c

The velocity of light in free space or vacuum is c = (\mu_{0}\epsilon _{0})^{-\frac{1}{2}}
So, the dimension of velocity = the dimension of (\mu_{0}\epsilon _{0})^{-\frac{1}{2}} = LT^{-1}

10. If x = at+bt^{2} , where x is the distance travelled by the body in kilometers while t is the time in seconds, then the unit of b is
a. Km/s
b. kms
c. km/s2
d.kms2

option d

x = at+bt^{2}
Now the dimension of [x]= [at] = [bt^{2}]
[x] = [bt^{2}]
[x] = [b][t^{2}]
[b]=[\frac{x}{t^{2}}]
So, the unit of b is = [\frac{unit of x}{(unit of time)^{2}}]
The unit of b is = [\frac{km}{(s)^{2}}]
So, option C is the right answer.

11. A force is given by F = at+bt^{2} , where t is the time. The dimension of a and b are
a. MLT^{-4} and MLT
b. MLT^{-1} and MLT^{0}
c. MLT^{-3} and MLT^{-4}
d. MLT^{-3} and MLT^{-0}

option c

The dimension of [F]= [at] = [bt^{2}]
[F]=[at]
[a]=\frac{[F]}{[t]}
[a]=\frac{[MLT^{-2}]}{[T]}
[a]=MLT^{-3}
Again, [F]= [bt^{2}]
[b]=[\frac{F}{t^{2}}]
[b]=[\frac{MLT^{-2}}{T^{2}}]
[b]=MLT^{-4}

12. In the relation p=\frac{\alpha }{\beta }e^{-\frac{\alpha z}{k\theta }} , p is pressure, z is distance, k is Boltzmann constant and θ is the temperature. The dimensional formula of β will be
a. M^{0}L^{2}T^{0}
b. ML^{3}T
c. ML^{0}T^{-1}
d. M^{0}L^{2}T^{-1}

option a

13. \frac{\alpha }{t^{2} } =Fv+\frac{\beta }{v^{2}} , Find dimension formula for \alpha and \beta
a. ML^{3}T^{-1} and ML^{4}T^{-2}
b. ML^{2}T^{-2} and ML^{4}T^{-3}
c. ML^{2}T^{-1} and ML^{4}T^{-3}
d. ML^{3}T^{-2} and ML^{4}T^{-2}

option c

14. For one mole of gas, Van der waals’ equation is (P+\frac{a}{v^{2}})(V-b)=RT , Find the dimensions of a and b.
a. ML^{5}T^{-2} and M^{0}L^{2}T^{0}
b. ML^{4}T^{-2} and M^{0}L^{3}T^{0}
c. ML^{4}T^{-2} and ML^{2}T^{-2}
d. ML^{5}T^{-2} and M^{0}L^{3}T^{0}

option d

(P+\frac{a}{v^{2}})(V-b)=RT

So, [P]=[\frac{a}{v^{2}}] and [V]=[b]
[a]=[PV^{2}]
[a]=[ML^{-1}T^{-2}][(L^{3})^{2}]
[a]=[ML^{5}T^{-2}]

Again, [b]=[V]
[b]=[M^{0}L^{3}T^{0}]

15. The equation of a wave is given by y=aSin\omega (\frac{x}{v}-k) where \omega  is angular velocity and v is the linear velocity. The dimensions of k will be
a. T^{2}
b. T^{-1}
c. T
d. LT

option c
[k]=[\frac{x}{v}]
[k]=[\frac{L}{LT^{-1}}]
[k]=[T]

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