suppose that a ball is rolling down a ramp. the distance traveled by the ball is given by the function…

suppose that a ball is rolling down a ramp. the distance traveled by the ball is given by the function s(t)=9t², where t is the time, in seconds, after the ball is released, and s(t) is measured in feet. find the balls average velocity in each of the following time intervals.\na. t₁ = 4 to t₂ = 5\nδs/δt = 81 ft/sec\nb. t₁ = 4 to t₂ = 4.5\nδs/δt = 76.5 ft/sec\nc. t₁ = 4 to t₂ = 4.01\nδs/δt = 72.09 ft/sec (type an exact answer, using integers or decimals.)\nd. t₁ = 4 to t₂ = 4.001\nδs/δt = ft/sec (type an exact answer, using integers or decimals.)

suppose that a ball is rolling down a ramp. the distance traveled by the ball is given by the function s(t)=9t², where t is the time, in seconds, after the ball is released, and s(t) is measured in feet. find the balls average velocity in each of the following time intervals.\na. t₁ = 4 to t₂ = 5\nδs/δt = 81 ft/sec\nb. t₁ = 4 to t₂ = 4.5\nδs/δt = 76.5 ft/sec\nc. t₁ = 4 to t₂ = 4.01\nδs/δt = 72.09 ft/sec (type an exact answer, using integers or decimals.)\nd. t₁ = 4 to t₂ = 4.001\nδs/δt = ft/sec (type an exact answer, using integers or decimals.)

Answer

Explanation:

Step1: Recall average - velocity formula

The average velocity $\frac{\Delta s}{\Delta t}=\frac{s(t_2)-s(t_1)}{t_2 - t_1}$, where $s(t)=9t^{2}$.

Step2: Calculate $s(t_1)$ and $s(t_2)$ for $t_1 = 4$ and $t_2=4.001$

First, find $s(t_1)$: $s(4)=9\times4^{2}=9\times16 = 144$. Then, find $s(t_2)$: $s(4.001)=9\times(4.001)^{2}=9\times16.008001 = 144.072009$.

Step3: Calculate average velocity

$\frac{\Delta s}{\Delta t}=\frac{s(4.001)-s(4)}{4.001 - 4}=\frac{144.072009 - 144}{0.001}=\frac{0.072009}{0.001}=72.009$

Answer:

$72.009$