Question: Dimensional formula of torque is A. \[ML{T^{ - 2}}\] B. \[M{L^2}{T^{ - 2}}\] C. \(M{L^2}{T^{ -...

Question

Dimensional formula of torque is
A. $ML{T^{ - 2}}$
B. $M{L^2}{T^{ - 2}}$
C. $M{L^2}{T^{ - 3}}$
D. $ML{T^{ - 3}}$

Answer 1

Solution

We know that the dimension formula of any quantity gives an idea about the fundamental quantities that are present in the given physical quantity. For example length is denoted by L and mass is denoted by M etc. along with these there are total seven fundamental dimensions.

Complete step by step answer:
We can define torque in simple terms as the twisting force that causes rotation. It is given by the expression; $\tau = F.r\sin \Theta$ where $\tau$ is torque vector, $F$ is force which causes it and $r$ is length of the momentum arm and $\Theta$ is the angle between force vector and momentum arm. Torque can be of two types: static and dynamic. If the angle between force vector and momentum arm is ${90^o}$ then the sine term will be one and the expression becomes ; $\tau = F.r$ . The direction of torque can be determined by right hand grip rule.
The SI unit for torque is Newton- meter as we know that the unit of force is newton which is equal to $Force = mass \times acceleration$ . The SI unit of mass is Kilogram and acceleration is $meter/{\sec ^2}$ .
Dimension formula of torque = dimension formula of force X dimension formula of length $\Rightarrow [ML{T^{ - 2}}][L] = [M{L^2}{T^{ - 2}}]$
Hence the dimensional formula of torque is $M{L^2}{T^{ - 2}}$ .

Thus option B is the correct answer to this problem.

Note:
We can calculate the dimension formula of any quantity by calculating the fundamental dimension of that quantity. Any dimension formula is expressed in the terms of power of $M,L$ and $T$ where $M$ denotes mass, $L$ denotes length and $T$ denotes time. There are seven fundamental dimensions according to seven fundamental quantities.