Answer:
8 seconds
Explanation:
Given:
The velocity of the sky diver 't' seconds after jumping is given as:
[tex]v(t)=80(1-e^{-0.2t})[/tex]
The velocity is given as, [tex]v=65\ ft/s[/tex]
So, in order to find the time required to reach the above given velocity, we plug in 65 for 'v' in the above equation and solve for time 't'. This gives,
[tex]65=80(1-e^{-0.2t})\\\\\frac{65}{80}=1-e^{-0.2t}\\\\0.8125=1-e^{-0.2t}\\\\e^{-0.2t}=1-0.8125\\\\\textrm{Taking natural log on both sides, we get:}\\\\-0.2t=\ln(0.1875)\\\\t=\frac{\ln(0.1875)}{-0.2}\\\\t=8.4\ s\approx 8\ s(Nearest\ whole\ number)[/tex]
Therefore, the time taken to reach a velocity of 65 ft/s is nearly 8 seconds.
