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Determine the dimensions of the derivative dx/dt = 3At^2 + B. (Use the following as necessary: L and T, where L is the unit of length and T is the unit of time.)[dx/dt] = ___?

Respuesta :

Answer:

LT⁻¹

Explanation:

Assuming the given expression is

    x = A t³ + B t.........(1)

x is the distance

we have to calculate dimension of dx/dt

from expression (1)

 x = A t³

 [tex]A = \dfrac{L}{T^3}[/tex]

  A = LT⁻³

 x = B t

 B = LT⁻¹

now,

dx/dt = 3At^2 + B

from rule of dimension

dimension of dx/dt is equal to dimension of At^2

  dx/dt = A t²

  dx/dt = LT⁻³ x T²

  dx/dt = LT⁻¹

hence, dimension of dx/dt is equal to LT⁻¹

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