On the basis of dimensions, decide which of the following relations for the displacement of a particle undergoing simple harmonic motion is/are not correct.

(a)  \(y = a\sin \left(2\pi t / T\right)\)
(b)  \(y = a\sin(vt)\)
(c)  \(y = \left({\dfrac a T}\right) \sin \left({\dfrac t a}\right)\)
(d)  \(y = a \sqrt 2 \left(\sin \left({\dfrac {2 \pi t} T}\right) - \cos \left({\dfrac {2 \pi t} T}\right)\right)\)

(Symbols have their usual meanings.)
Choose the correct option:

1. (a), (c)
2. (a), (b)
3. (b), (c)
4. (a), (d)

Hint: Use the principle of homogeneity of dimensions.
 

Step: Analyse each option one by one.
Now, by using the principle of homogeneity of dimensions \(\text{LHS}\) and \(\text{RHS}\). of (\(\text{a}\)) and (\(\text{b}\)) will be the same, and is \(L\)
For the option (c), \(\text{[LHS]}=L\)
\(\begin{aligned} & [\text{RHS}]=\frac{L}{T}=[LT]^{-1} \\ & {[\text{LHS}] \neq[\text{RHS}]} \end{aligned}\)

Hence, (c) is not the correct option.
In option (b) the dimension of the angle is \(vt\) i.e., \(L\)
\(\begin{array}{cc} \Rightarrow & \text { RHS }=L \cdot L=L^2 \text { and } \text{LHS}=L \\ \Rightarrow & \text { LHS } \neq \text { RHS } \end{array}\)
So, option (b) is also not correct.
Therefore, options b and c are not correct.
Hence, option (3) is the correct answer.