3.6 Finding velocity and displacement from acceleration

University physics volume 1 Page 1 / 6

By the end of this section, you will be able to:

Derive the kinematic equations for constant acceleration using integral calculus.
Use the integral formulation of the kinematic equations in analyzing motion.
Find the functional form of velocity versus time given the acceleration function.
Find the functional form of position versus time given the velocity function.

This section assumes you have enough background in calculus to be familiar with integration. In Instantaneous Velocity and Speed and Average and Instantaneous Acceleration we introduced the kinematic functions of velocity and acceleration using the derivative. By taking the derivative of the position function we found the velocity function, and likewise by taking the derivative of the velocity function we found the acceleration function. Using integral calculus, we can work backward and calculate the velocity function from the acceleration function, and the position function from the velocity function.

Kinematic equations from integral calculus

Let’s begin with a particle with an acceleration a (t) is a known function of time. Since the time derivative of the velocity function is acceleration,

\frac{d}{d t} v (t) = a (t),

we can take the indefinite integral of both sides, finding

\int \frac{d}{d t} v (t) d t = \int a (t) d t + C_{1},

where C ₁ is a constant of integration. Since $\int \frac{d}{d t} v (t) d t = v (t)$ , the velocity is given by

v (t) = \int a (t) d t + C_{1} .

Similarly, the time derivative of the position function is the velocity function,

\frac{d}{d t} x (t) = v (t) .

Thus, we can use the same mathematical manipulations we just used and find

x (t) = \int v (t) d t + C_{2},

where C ₂ is a second constant of integration.

We can derive the kinematic equations for a constant acceleration using these integrals. With a ( t ) = a a constant, and doing the integration in [link] , we find

v (t) = \int a d t + C_{1} = a t + C_{1} .

If the initial velocity is v (0) = v ₀ , then

v_{0} = 0 + C_{1} .

Then, C ₁ = v ₀ and

v (t) = v_{0} + a t,

which is [link] . Substituting this expression into [link] gives

x (t) = \int (v_{0} + a t) d t + C_{2} .

Doing the integration, we find

x (t) = v_{0} t + \frac{1}{2} a t^{2} + C_{2} .

If x (0) = x ₀ , we have

x_{0} = 0 + 0 + C_{2};

so, C ₂ = x ₀ . Substituting back into the equation for x ( t ), we finally have

x (t) = x_{0} + v_{0} t + \frac{1}{2} a t^{2},

which is [link] .

Motion of a motorboat

A motorboat is traveling at a constant velocity of 5.0 m/s when it starts to decelerate to arrive at the dock. Its acceleration is

a (t) = - \frac{1}{4} t m/ s^{2}

. (a) What is the velocity function of the motorboat? (b) At what time does the velocity reach zero? (c) What is the position function of the motorboat? (d) What is the displacement of the motorboat from the time it begins to decelerate to when the velocity is zero? (e) Graph the velocity and position functions.

Strategy

(a) To get the velocity function we must integrate and use initial conditions to find the constant of integration. (b) We set the velocity function equal to zero and solve for t . (c) Similarly, we must integrate to find the position function and use initial conditions to find the constant of integration. (d) Since the initial position is taken to be zero, we only have to evaluate the position function at

t = 0

Solution

We take t = 0 to be the time when the boat starts to decelerate.

Questions & Answers

differentiate between demand and supply giving examples

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appreciation

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In economics, a perfect market refers to a theoretical construct where all participants have perfect information, goods are homogenous, there are no barriers to entry or exit, and prices are determined solely by supply and demand. It's an idealized model used for analysis,

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other things being equal

AI-Robot

When MP₁ becomes negative, TP start to decline. Extuples Suppose that the short-run production function of certain cut-flower firm is given by: Q=4KL-0.6K2 - 0.112 • Where is quantity of cut flower produced, I is labour input and K is fixed capital input (K-5). Determine the average product of lab

Kelo

Extuples Suppose that the short-run production function of certain cut-flower firm is given by: Q=4KL-0.6K2 - 0.112 • Where is quantity of cut flower produced, I is labour input and K is fixed capital input (K-5). Determine the average product of labour (APL) and marginal product of labour (MPL)

Kelo

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what is monopoly mean?

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What is different between quantity demand and demand?

Shukri Reply

Quantity demanded refers to the specific amount of a good or service that consumers are willing and able to purchase at a give price and within a specific time period. Demand, on the other hand, is a broader concept that encompasses the entire relationship between price and quantity demanded

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Shukri

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Economic growth as an increase in the production and consumption of goods and services within an economy.but Economic development as a broader concept that encompasses not only economic growth but also social & human well being.

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Jabir

What do you think is more important to focus on when considering inequality ?

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any question about economics?

Awais Reply

sir...I just want to ask one question... Define the term contract curve? if you are free please help me to find this answer 🙏

Asui

it is a curve that we get after connecting the pareto optimal combinations of two consumers after their mutually beneficial trade offs

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Asui

In economics, the contract curve refers to the set of points in an Edgeworth box diagram where both parties involved in a trade cannot be made better off without making one of them worse off. It represents the Pareto efficient allocations of goods between two individuals or entities, where neither p

Cornelius

Suppose a consumer consuming two commodities X and Y has The following utility function u=X0.4 Y0.6. If the price of the X and Y are 2 and 3 respectively and income Constraint is birr 50. A,Calculate quantities of x and y which maximize utility. B,Calculate value of Lagrange multiplier. C,Calculate quantities of X and Y consumed with a given price. D,alculate optimum level of output .

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Answer

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Jabir

the market for lemon has 10 potential consumers, each having an individual demand curve p=101-10Qi, where p is price in dollar's per cup and Qi is the number of cups demanded per week by the i th consumer.Find the market demand curve using algebra. Draw an individual demand curve and the market dema

Gsbwnw Reply

suppose the production function is given by ( L, K)=L¼K¾.assuming capital is fixed find APL and MPL. consider the following short run production function:Q=6L²-0.4L³ a) find the value of L that maximizes output b)find the value of L that maximizes marginal product

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types of unemployment

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What is the difference between perfect competition and monopolistic competition?

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Source: OpenStax, University physics volume 1. OpenStax CNX. Sep 19, 2016 Download for free at http://cnx.org/content/col12031/1.5

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