Motion in a Plane - Result Question 3

3. If vectors $\vec{A}=\cos \omega t \hat{i}+\sin \omega t \hat{j}$ and $\vec{B}=\cos \frac{\omega t}{2} \hat{i}+\sin \frac{\omega t}{2} \hat{j}$ are functions of time, then the value of $t$ at which they are orthogonal to each other is :

[2015 RS]

(a) $t=\frac{\pi}{2 \omega}$

(b) $t=\frac{\pi}{\omega}$

(c) $t=0$

(d) $t=\frac{\pi}{4 \omega}$

Show Answer

Answer:

Correct Answer: 3. (b)

Solution:

  1. (b) Two vectors are

$\overrightarrow{{}A}=\cos \omega t \hat{i}+\sin \omega t \hat{j}$

$\overrightarrow{{}B}=\cos \frac{\omega t}{2} \hat{i}+\sin \frac{\omega t}{2} \hat{j}$

For two vectors $\vec{A}$ and $\vec{B}$ to be orthogonal $\vec{A} \cdot \vec{B}=0$

$\overrightarrow{{}A} \cdot \overrightarrow{{}B}=0=\cos \omega t \cdot \cos \frac{\omega t}{2}+\sin \omega t \cdot \sin \frac{\omega t}{2}$

$ =\cos (\omega t-\frac{\omega t}{2})=\cos (\frac{\omega t}{2}) $

So, $\frac{\omega t}{2}=\frac{\pi}{2} \therefore t=\frac{\pi}{\omega}$



NCERT Chapter Video Solution

Dual Pane