(i) Show that the value of **k** is 0.1. (ii) Find an expression for the displacement of the particle from the origin in terms of t?
A particle starts from a fixed origin with a velocity #0.4ms^-1# and moves in a straight line. The acceleration a #ms^-1# of the particle t s after it leaves the origin is given by #a = k(3t^2 - 12t + 2)# , where k is a constant. when t =1, the velocity of P is #0.1ms^-1.#
(i) Show that the value of k is 0.1.
(ii) Find an expression for the displacement of the particle from the origin in terms of t.
A particle starts from a fixed origin with a velocity
(i) Show that the value of k is 0.1.
(ii) Find an expression for the displacement of the particle from the origin in terms of t.
1 Answer
Recall that the velocity of a particle is the integral of the accerlation function.
#v = k(t^3 - 6t^2 + 2t )+ C#
Since
#v = k(t^3 - 6t^2 + 2t) + 0.4#
The question states that
#0.1 = k(1^3 - 6(1)^2 + 2(1)) + 0.4#
#0.1 = k(-3) + 0.4#
#-0.3 = -3k#
#k = 0.1#
As required.
b) We must take the anti-derivative of the velocity function to get the position function.
#d = 0.1(1/4t^4 - 2t^3 + t^2) + C#
We know that
#d = 1/10(1/4t^4 - 2t^3 + t^2)#
#d = 1/40t^4 - 1/5t^3 + 1/10t^2#
Hopefully this helps!
