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State the dimensional formula of work.
The dimensional formula of work is [ML²T⁻²], where M represents mass, L represents length, and T represents time. It indicates that work has dimensions of mass times length squared divided by time squared.
The dimensional formula of work is [ML²T⁻²], where M represents mass, L represents length, and T represents time. It indicates that work has dimensions of mass times length squared divided by time squared.
See lessFind the dimensions of force.
The dimensions of force are given by [MLT⁻²], where M represents mass, L represents length, and T represents time. This implies that force has dimensions of mass times length divided by time squared.
The dimensions of force are given by [MLT⁻²], where M represents mass, L represents length, and T represents time. This implies that force has dimensions of mass times length divided by time squared.
See lessDetermine the dimensional formula of acceleration.
The dimensional formula of acceleration is [LT⁻²], where L represents length and T represents time. It signifies that acceleration has dimensions of length per time squared.
The dimensional formula of acceleration is [LT⁻²], where L represents length and T represents time. It signifies that acceleration has dimensions of length per time squared.
See lessWhat is the dimensional formula of velocity?
The dimensional formula of velocity is [LT⁻¹], where L represents length and T represents time. It indicates that velocity has dimensions of length divided by time.
The dimensional formula of velocity is [LT⁻¹], where L represents length and T represents time. It indicates that velocity has dimensions of length divided by time.
See lessDefine dimensions of a physical quantity.
Dimensions of a physical quantity refer to the fundamental quantities that are involved in its measurement. These dimensions are represented by the powers to which the fundamental quantities are raised in the formula representing the physical quantity.
Dimensions of a physical quantity refer to the fundamental quantities that are involved in its measurement. These dimensions are represented by the powers to which the fundamental quantities are raised in the formula representing the physical quantity.
See lessWhy is it necessary to include units when expressing physical quantities?
Including units when expressing physical quantities is crucial because it provides essential context and ensures clarity. Units specify the type of quantity being measured and allow for proper interpretation of numerical values. Without units, it would be impossible to distinguish between quantitiesRead more
Including units when expressing physical quantities is crucial because it provides essential context and ensures clarity. Units specify the type of quantity being measured and allow for proper interpretation of numerical values. Without units, it would be impossible to distinguish between quantities like distance, time, mass, or temperature, leading to confusion and misrepresentation of data.
See lessDiscuss the advantages of using the SI system over other systems of units.
The SI system offers several advantages over other systems of units. It provides a coherent and globally standardized framework for measuring physical quantities, facilitating effective communication and collaboration among scientists and engineers worldwide. The SI system is also based on decimal mRead more
The SI system offers several advantages over other systems of units. It provides a coherent and globally standardized framework for measuring physical quantities, facilitating effective communication and collaboration among scientists and engineers worldwide. The SI system is also based on decimal multiples, making conversions between units more straightforward and reducing the potential for errors.
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