WebDimensional formula for Kinematic viscosity (ν) ∴ ν = L2T-1 The dimensions of the kinematic viscosity show that they involves the magnitudes of length and time only. The name kinematic viscosity has been given to the ratio (μ/ρ) because its unit (m 2 /s) is similar to the unit of kinematic quantities like velocity (m/s) and acceleration (m/s 2 ). WebHence we can write the dimensional formula for force as, F = [ M L T - 2] The dimensional formula for the area can be written as, A = [ L 2] Substituting the dimensional formulae for force and area in the expression of pressure, we get P = F A = [ M L T - 2] [ L 2] = [ M L - 1 T - …
Baymont by Great Southern Homes in Blythewood SC Zillow
WebJun 28, 2009 · Step 3: Calculate the dimension of each term in the equation. Term 1: [s] = [L] Term 2: [u.t] = [LT -1.T] = [L] Term 3: [a.t2] = [LT -2.T2] = [L] Note that, as stated above, we have canceled dimensions from numerator and denominator like [T -2.T2] . Conclusion: The equation is dimensionally consistent since all the terms have the same dimensions. WebDimensional formula for mass : [FL – 1 T 2 ... e.g. : dimension of 1/T and 2π/T are same. 2. Dimensional method cannot be used to derive relations other than those involving products of physical parameters. e.g. : y = a cos(ωt − kx) can not be derived using this method. 3. This method cannot be applied to derive formula if in mechanics a ... do women really care about money
[L1M1T-2]is the dimension formula of - Brainly.in
Web∴ Dimensions of force are [M 1 L 1 T-2] Dimensional formula for some Physical quantities. Mechanical equivalent of heat Physical quantity: Relation with other quantity: Dimensional formula: Area: Length × breadth: L × L = [L 2] Density: Mass/volume: Acceleration: Force: F = ma [MLT −2] Linear momentum: P = mv [MLT −1] Web[L 1 M 1 T -2] is the dimensional formula for Options Velocity Acceleration Force Work Advertisement Remove all ads Solution [L 1 M 1 T -2] is the dimensional formula for … WebMar 18, 2024 · The dimensional formula $\left[ {M{L^{ - 1}}{T^{ - 2}}} \right]$ corresponds to pressure. The correct answer for this problem is option C. Note: The students are advised to understand and remember the formula of torque, the formula of surface tension, the formula of pressure and formula of the viscous force as it is very useful in solving these ... cleaning hp laser printer 200