Yes, except that in the gravitational case it acts as a divisor, so becomes L-2.Mathivanan said:Is L^2 is the dimensional formula for both the distances in the above two cases?
Thanks. However, I have one more doubt. The dimensional formula for area is also L^2. By definitions, in the above two formulas, they represent distances rather than area. The dimensional formulas mislead me.haruspex said:Yes, except that in the gravitational case it acts as a divisor, so becomes L-2.
The dimensional formulas only capture that aspect of an expression. They don't care whether the two distances represent an actual area or have some other relationship. E.g. surface tension can be thought of as energy per unit area or force per unit length. In some cases, quite different physical entities can have the same dimension: torque and energy are both force x distance; action and angular momentum are both ML2T-1. It doesn't catch all the distinctions you'd like to make.Mathivanan said:Thanks. However, I have one more doubt. The dimensional formula for area is also L^2. By definitions, in the above two formulas, they represent distances rather than area. The dimensional formulas mislead me.
Thanks for your answer. I thought that distance should have dimensional formula of L, be it square of the distance or distance from the axis squared. The core concept in the definition is distance in both the formulas.haruspex said:The dimensional formulas only capture that aspect of an expression. They don't care whether the two distances represent an actual area or have some other relationship. E.g. surface tension can be thought of as energy per unit area or force per unit length. In some cases, quite different physical entities can have the same dimension: torque and energy are both force x distance; action and angular momentum are both ML2T-1. It doesn't catch all the distinctions you'd like to make.
A dimensional formula is a mathematical representation of the physical dimensions involved in a physical quantity. It helps to describe the units of measurement and their relationship in a formula.
The dimensional formula of distances is important because it helps to ensure consistency and accuracy in scientific calculations. It also allows for easy conversion between different units of measurement.
The dimensional formula of distances is determined by analyzing the units of measurement used in a particular formula and assigning them to their corresponding physical dimensions such as length or time.
The dimensional formula of distances in certain formulas is significant because it helps to identify the physical quantities involved in the formula and their respective units. This allows for better understanding and application of the formula in different contexts.
Yes, dimensional formulas can be used to check the accuracy of a formula. If the dimensional formula of a formula is incorrect, it means that there is an error in the units used or the relationship between the physical quantities is incorrect.