A short history of Calculus of Variation (Wiki) Fermat’s principle in optics: Fermat (1662) Brachistochrone problem: Johann Bernoulli (1696) Euler (1733) gave the name Calculus of Variations.' Lagrange (1736-1813) made extensive contribution. If you read the history of calculus of variations (from Wiki). Great review for AP calculus AB Free response. In physics and calculus courses alike, the concept of distance and displacement, and how it relates to acceleration, velocity, and position is called the study of particle motion, and utilizes the definite integral. Free-Response Questions Download free-response questions from past exams along with scoring guidelines, sample responses from exam takers, and scoring distributions. If you are using assistive technology and need help accessing these PDFs in another format, contact Services for Students with Disabilities at 212-713-8333 or by email at [email protected] (b) The particle moves continuously and monotonically from (0) 2x to x(3) 10. Similarly, the particle moves continuously and monotonically from x(3) 10 to x(5) 7 and also from x(5) 7 to (6) 9x. By the Intermediate Value Theorem, there are three values of t for which the particle is at ( ) 8xt.
- Mario Particle Motion Ap Calculus 2018 Problems
- Mario Particle Motion Ap Calculus Problems
- Mario Particle Motion Ap Calculus Notes
2011-2012 Particle Motion Definition and Calculus
The position of a particle (in inches) moving along the x-axis after t seconds have elapsed is given by the following equation:
s = f(t) = t4 – 2t3 – 6t2 + 9t
(a) Calculate the velocity of the particle at time t.
Mario Particle Motion Ap Calculus 2018 Problems
(b) Compute the particle’s velocity at t = 1, 2, and 4 seconds.
(c) When is the particle at rest?
(d) When is the particle moving in the forward (positive) direction?
(e) Calculate total distance traveled by the particle (i.e., forwards and backwards) after t = 5 seconds.
(f) Calculate the acceleration of the particle after 4 seconds.
(g) When is the speed of the particle constant?
(a) The velocity is the derivative of position, so the velocity is v(t) = 4t3 – 6t2 – 12t + 9.
(b) Simply plug into the velocity equation to get: v(1) = –5 in/sec, v(2) = –7 in/sec, v(4) = 121 in/sec.
(c) If you graph the velocity function on your calculator, you see that it appears to pass through x = –1.5. Use synthetic division to ensure that this is true and to factor the equation. You will get the following:
(t – 1/2)(4t2 – 12t + 6)
Now, use the quadratic formula to solve the quadratic part, and you’ll see that the velocity equals zero (in other words, is stopped) when t = –1.5, 0.6339745962, 2.366025404. Even though you can round to the third decimal place, you need to use these values for the remainder of the problem.
(d) If you plug in values into the velocity equation between the x-intercepts above, you will get positive values on the intervals (–1.5, 0.6339) and (2.366, ∞). Note that it doesn’t quite make sense to have negative time, so (0, 0.6339) is just as acceptable, and perhaps more so, for the first interval. We do this because positive velocity implies forward movement.
(e) First, substitute the “turn points” you found in part (c) into the position equation. When the velocity equals zero in this problem, the particle is stopping because it is turning to go the other way. You find thats(0.6339) = 2.946152423, s(2.366) = –7.446152423, and s(5) = 270. Note that the negative x-intercept is ignored because you cannot move back in time.
These numbers represent how far the particle is from the origin at specific times. So, the particle moves 2.9 inches to the right of the origin, then moves 7.44 inches left of it, and finally ends up 270 inches to the right of it. By the time t = 2.366 seconds, the particle has traveled to the right 2.9 inches, back 2.9 inches to the origin, then left 7.4 more inches. It then moves 7.4 inches back to the origin and ends up 270 more inches to the right of it. The final answer is 290.785 inches.
(f) The acceleration is the derivative of velocity, so a(t) = v’(t) = 12t2 – 12t – 12. The acceleration at t = 4 seconds is a(4) = 132 in/sec2.
Mario Particle Motion Ap Calculus Problems
(g) Set the acceleration equal to zero and solve using the quadratic equation: t = –0.618 sec or 1.618 sec.
Mario Particle Motion Ap Calculus Notes
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