Answer:
[tex]\dfrac{d\theta}{dt}=0.038\ rad/s[/tex]
Explanation:
Given that
[tex]\dfrac{dx}{dt}= -1\ m/s[/tex]
From the diagram
[tex]tan\theta=\dfrac{21}{x}[/tex]
By differentiating with time t
[tex]sec^2\theta \dfrac{d\theta}{dt}=-\dfrac{21}{x^2}\dfrac{dx}{dt}[/tex]
When x= 10 m
[tex]tan\theta=\dfrac{21}{10}[/tex]
θ = 64.53°
Now by putting the value in equation
[tex]sec^2\theta \dfrac{d\theta}{dt}=-\dfrac{21}{x^2}\dfrac{dx}{dt}[/tex]
[tex]sec^264.53^{\circ} \dfrac{d\theta}{dt}=-\dfrac{21}{10^2}\times (-1)[/tex]
[tex]\dfrac{d\theta}{dt}=0.038\ rad/s[/tex]
Therefore rate of change in the angle is 0.038\ rad/s
