Given:
A particle moves along the x-axis so that its position at time t > 0 is given by x(t).
[tex]\dfrac{dx}{dt}=-10t^4+9t^2+8t[/tex]
To find:
The value of t at which acceleration of the particle is zero.
Solution:
We have, x(t) as position function. So, its derivative with respect to t is velocity.
[tex]v=\dfrac{dx}{dt}=-10t^4+9t^2+8t[/tex]
Derivative of velocity with respect to t is acceleration.
[tex]a=\dfrac{dv}{dt}=\dfrac{d}{dt}(-10t^4+9t^2+8t)[/tex]
[tex]a=-10(4t^3)+9(2t)+8(1)[/tex]
[tex]a=-40t^3+18t+8[/tex]
Putting a=0, to find the time t at which acceleration of the particle is zero.
[tex]0=-40t^3+18t+8[/tex]
[tex]0=-40t^3+18t+8[/tex]
Using the graphing calculator, we get t=0.831 is the only real solution of this equation.
[tex]t=0.831[/tex]
Therefore, the correct option is b.
