Determine the dimensions of the constants A and B from the following derivative where y has the dimension of length and t has the dimension of time. (Use the following as necessary: L and T, where L is the unit of length and T is the unit of time.) dy/dt

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Mathematics

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26 December, 05:01

Determine the dimensions of the constants A and B from the following derivative where y has the dimension of length and t has the dimension of time. (Use the following as necessary: L and T, where L is the unit of length and T is the unit of time.) dy/dt

+3

Answers (1)

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Gloria Sanchez · Answer 1

1. A=L/T^3

2. B=L/T

Step-by-step explanation:

Assume the equation y = At^3 + Bt describes the motion of a particular object,

with y having the dimension of length and t having the dimension of time. Determine the dimensions of the constants A and B. (Use the following as necessary:

L and T, where L is the unit of length and T is the unit of time.)

could be the possible concluding part of this question

let us give equate the right hand side with dimension L

y=At^3 + Bt

y = (At^3)

y=has the dimension of length and t has the dimension of time, recall

L=AT^3

A=L/T^3

for B

L=BT

B=L/T