Just need hlep with part d. thank you 2. (Kinematic Equations) In your first semester physics class, you'll learn the kinematics equations whichexplain the simple movements of objects. The most important of them is given by.1s(t) = so + va t+=a₂t²Where so, vo, and a, are the initial position, velocity, and acceleration at time t = 0.Suppose a cannonball is shot from the top of a cliff directly upwards. For this problem, we will only belooking at the vertical component of the cannonball's motion (nothing horizontal). The height of thetop of the cliff is 50m, the initial velocity of the cannonball exiting the cannon is 100 m, and theacceleration acting on the cannonball is that of Earth's gravity, g -9,8 m/2a. Construct the kinematic equation that describes the vertical motion of the cannonball.b. Find s' (t).Ac. Use the quadratic equation to find the time when the cannonball will hit the ground. Verify youranswer using a graphing utility. d. Using the equation for Arc Length and the integration calculator, find thetotal distance traveled by the cannonball. Make sure to set up yourintegral appropriately and label all parts.

The arc length of a function is given by the formula, (1)…

Answered: d. Using the equation for Arc Length…

d. Using the equation for Arc Length and the integration calculator, find the total distance traveled by the cannonball. Make sure to set up your integral appropriately and label all parts.

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Question

Just need hlep with part d. thank you

2. (Kinematic Equations) In your first semester physics class, you'll learn the kinematics equations which
explain the simple movements of objects. The most important of them is given by.
1
s(t) = so + va t+=a₂t²
Where so, vo, and a, are the initial position, velocity, and acceleration at time t = 0.
Suppose a cannonball is shot from the top of a cliff directly upwards. For this problem, we will only be
looking at the vertical component of the cannonball's motion (nothing horizontal). The height of the
top of the cliff is 50m, the initial velocity of the cannonball exiting the cannon is 100 m, and the
acceleration acting on the cannonball is that of Earth's gravity, g -9,8 m/2
a. Construct the kinematic equation that describes the vertical motion of the cannonball.
b. Find s' (t).
A
c. Use the quadratic equation to find the time when the cannonball will hit the ground. Verify your
answer using a graphing utility.

d. Using the equation for Arc Length and the integration calculator, find the
total distance traveled by the cannonball. Make sure to set up your
integral appropriately and label all parts.

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Step 1: Know the formula for the arc length:

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Step 2: Find the position function for the object:

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Step 3: Find the time taken by the object to reach the ground:

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Step 4: Find the derivative of the function y with respect to time:

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Step 5: Calculate the total distance traveled by the object:

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