All Calculus 1 Resources
Example Questions
Example Question #1 : How To Find Acceleration
The position vector of an object moving in a plane is given by r(t)=3t4i + 6t2j. Find its acceleration when t=1.
To find acceleration at time t, we have to differentiate the position vector twice.
Differentiating the first time gives the velocity:
v(t) = r'(t) = 12t3i + 12tj
Differentiating a second time gives the accelaration:
a(t) = r''(t) = 36t2i + 12j
Plug in t=1 to solve for the final answer:
a(1) = r''(1) = 36i + 12j
Example Question #1 : How To Find Acceleration
The relative displacement (in meters) of a particle at time t is defined by the function f(t) = 4t2 * ln(t)
What is the instantaneous acceleration of the particle at t = 3.5?
49.08 m2
61.39 m2
22.02 m2
None of the other answers
55.37 m2
22.02 m2
The instantaneous acceleration is found by taking the 2nd derivative of the function and applying thereto the desired variable parameter. First let us calculate the 1st derivative:
f(t) = 4t2 * ln(t) will require us to apply the product rule; therefore:
f'(t) = 8t * ln(t) + 4t2 * (1/t), which reduces to: 8t*ln(t) + 4t
Taking the second derivative (applying the product rule to the first value), we get:
f''(t) = 8 * ln(t) + 8t * (1/t) + 4, which simplifies to: 8 * ln(t) + 8 + 4 = 8 * ln(t) + 12
The instantaneous acceleration at t = 3.5 is found by solving:
f''(3.5) = 8 * ln(3.5) + 12 = 22.02210374796294 (approx.) or 22.02
Example Question #2 : Acceleration
What is the instantaneous acceleration at time t = 4 of a particle whose positional equation is represented by s(t) = 5t3 – 24t2 + 44?
72
60
48
56
70
72
The instantaneous acceleration is represented by the second derivative of the positional equation. Let's first calculate the velocity then the acceleration:
v(t) = s'(t) = 15t2 – 48t
a(t) = v'(t) = s''(t) = 30t – 48
a(4) = 30 * 4 – 48 = 72
Example Question #1 : How To Find Acceleration
What is the instantaneous acceleration at time t = π of a particle whose positional equation is represented by s(t) = 5sin(4t) + cos(2t)?
None of the other answers
–4
–76
–80
–84
–4
The instantaneous acceleration is represented by the second derivative of the positional equation. Let's first calculate the velocity then the acceleration:
s(t) = 5sin(4t)+ cos(2t)?
v(t) = s'(t) = 20cos(4t) – 2sin(2t)
a(t) = v'(t) = s''(t) = –80sin(4t) – 4cos(2t)
a(π) = –80sin(4π) – 4cos(2π) = –80sin(0) - 4cos(0) = 0 – 4 = –4
Example Question #1 : How To Find Acceleration
What is the instantaneous acceleration at time t = π/2 of a particle whose positional equation is represented by s(t) = 5sin(t/2 + π)?
5√2/2
None of the other answers
5√2/8
5√2/4
–5√2/4
5√2/8
The instantaneous acceleration is represented by the second derivative of the positional equation. Let's first calculate the velocity then the acceleration:
s(t) = 5sin(t/2 + π)?
v(t) = s'(t) = (5/2)cos(t/2 + π)
a(t) = v'(t) = s''(t) = –(5/4)sin(t/2 + π)
We know that sin(x) = –sin(x + π); therefore, sin(t/2 + π) = –sin(t/2). Let's rewrite a(t) as (5/4)sin(t/2).
The acceleration is therefore a(π/2) = (5/4)sin(π/2/2) = (5/4)sin(π/4) = 5/4 * (1/√2) = 4/(4√2) = 5√2/8
Example Question #3 : Acceleration
Find the acceleration of a particle with a position given by at time
Acceleration is given by the second derivative of position. So for this equation, the second derivative is . The acceleration is constant through time, so the answer is simply 8.
Example Question #4 : Acceleration
Jerk is defined as the rate of change of acceleration. Find the function of jerk with respect to time for a particle with position given by
Since jerk is the rate of change of acceleration, and acceleration is the second derivative of position, the answer is to find the third derivative of position. Use the chain rule each time.
Example Question #1 : How To Find Acceleration
The position of a particle is given by . Find the acceleration of the particle when .
The acceleration of a particle is given by the second derivative of the position function. We are given the position function as
.
The first derivative (the velocity) is given as
.
The second derivative (the acceleration) is the derivative of the velocity function. This is given as
.
Evaluating this at gives us the answer. Doing this we get
.
Example Question #1 : How To Find Acceleration
Suppose a particle travels in a circular motion in the xy-plane with
for some constants . Notice that this is circular because .
What is the total magnitude of the acceleration, ?
We know that and so the acceleration components are:
Plugging these into the formula for the acceleration and again recognizing that , we get , or, after the square root, .
Example Question #7 : Acceleration
Find the acceleration of a particle at any given time if its velocity is given by ?
The acceleration is the derivative of the velocity function. For the sinusoid component, the chain rule must be used to get the derivative.
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