Answer:
(B) (length)/(time³)
Explanation
The equation x = ½ at² + bt³ has to be dimensionally correct. In other words the term bt³ and ½ at² must have units of change of position = length.
We solve in order to find the dimension of b:
[x]=[b]*[t]³
length=[b]*time³
[b]=length/time³
Answer:
Explanation:
The position of a train is given as a function of time
x(t) = ½at² + bt³
Where a and b are constant
We want to know the dimensional unit of b.
x is length and has a unit of metre
t is time and has a unit of seconds
b is a constant with unknown unit
a is a constant with unknown unit
Given that,
x = ½at² + bt³
x(metre) = ½ a t²(seconds)² + bt³(seconds)³
For x to be dimensionally correct, a and b must have a unit that cancel out the time
So, a•t², so cancel out the time square "a" must have a unit that cancel out the time square. Also a must have "a" unit of distance too. So, "a" will have m/s² unit
Then, at² will give
a (metre/seconds)² × t² (seconds)²
Also, for "b", same procedure but b wants to cancel out seconds cube, so instead of seconds square division, " b" will have secondds cube division I.e m / s³
Then, bt³ will give
b(metre/seconds³) × time (seconds)³
So, the unit of b is metre/seconds³
Since Length = metre
And Time = seconds
Which is Length/ Time³
So, the correct answer is B.
