Answer:
Explanation:
(a) To find the average velocity between t = 1 and t = 1 + h, we can use the formula:
average velocity = (change in distance) / (change in time)
We are given that the distance traveled by the particle is s = 4t^2 + 3, so the change in distance between t = 1 and t = 1 + h is:
s(1+h) - s(1) = [4(1+h)^2 + 3] - [4(1)^2 + 3] = 8h + 4h^2
The change in time is simply h. Therefore, the average velocity is:
(i) When h = 0.1:
average velocity = (8(0.1) + 4(0.1)^2) / 0.1 = 8.4 m/sec
(ii) When h = 0.01:
average velocity = (8(0.01) + 4(0.01)^2) / 0.01 = 8.04 m/sec
(iii) When h = 0.001:
average velocity = (8(0.001) + 4(0.001)^2) / 0.001 = 8.004 m/sec
(b) To estimate the instantaneous velocity of the particle at time t = 1, we can take the limit of the average velocity as h approaches 0. That is:
instantaneous velocity = lim(h -> 0) [(8h + 4h^2) / h]
Using L'Hopital's rule, we can take the derivative of the numerator and denominator with respect to h:
instantaneous velocity = lim(h -> 0) [8 + 8h / 1]
instantaneous velocity = 8 m/sec
Therefore, the estimated instantaneous velocity of the particle at time t = 1 is 8 m/sec (rounded to the nearest integer).