The acceleration of a particle is given by ax(t)=− 2.10 m/s2 +( 3.02 m/s3 )t. Find the initial velocity v0x such that the particle will have the same x-coordinate at time t= 3.98 s as it had at t=0. What will be the velocity at time t = 3.98 s?
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The acceleration of a particle is given by ax(t)=− 2.10 m/s2 +( 3.02 m/s3 )t. Find...
A small object moves along the x-axis with acceleration ax(t) = −(0.0320m/s3)(15.0s−t). At t = 0 the object is at x = -14.0 m and has velocity v0x = 5.90 m/s. What is the x-coordinate of the object when t = 10.0 s?
a small object moves along the x-axis with acceleration ax(t) =-(0.0320m/s3)(15.0s-t). at t=0 the object is at x=-14.0m and has velocity v0x =4.50 m/s. what is the x-coordinate of the object when t=10.0s?
A cart is propelled over an xy plane with acceleration components ax = 6.5 m/s2 and ay = - 2.3 m/s2. Its initial velocity has components v0x = 6.4 m/s and v0y = 12.0 m/s. In unit-vector notation, what is the velocity of the cart when it reaches its greatest y coordinate?
A cart is propelled over an xy plane with acceleration components ax = 5.7 m/s2 and ay = -2.8 m/s2. Its initial velocity has components v0x = 8.7 m/s and v0y = 12.5 m/s. In unit-vector notation, what is the velocity of the cart when it reaches its greatest y coordinate?
5) The acceleration function (in m/s2) and the initial velocity are given for a particle moving along a line. (3 points) a(t) = 5t + 2, v(0) = 6, Osts 4 a) Find the velocity at time t. b) Find the distance traveled during the given time interval. 2) Let F(x) = set? dt. Find an equation of the tangent line to the curve y = F(x) at the point with X-coordinate 2. (2 points)
The acceleration function (in m/s2) and the initial velocity are given for a particle moving along a line. a(t) t 4 5, 0sts 10 v(0) (a) Find the velocity at time t. 2 4t5 2 v(t) m/s (b) Find the distance traveled during the given time interval. 416.6 Need Help? Talk to a Tutor Read It Watch It The acceleration function (in m/s2) and the initial velocity are given for a particle moving along a line. a(t) t 4 5,...
The acceleration of a bus is given by ax(t)=αt, where α = 1.14 m/s3 is a constant. Part A If the bus's velocity at time t1 = 1.18 s is 4.92 m/s , what is its velocity at time t2 = 2.19 s ? v = m/s SubmitMy AnswersGive Up Part B If the bus's position at time t1 = 1.18 s is 6.06 m , what is its position at time t2 = 2.19 s ? x = m
The acceleration of a bus is given by ax(t)=αt, where α = 1.13 m/s3 is a constant. A.If the bus's velocity at time t1 = 1.14 s is 4.98 m/s , what is its velocity at time t2 = 2.04 s ? B.If the bus's position at time t1 = 1.14 s is 5.95 m , what is its position at time t2 = 2.04 s ?
The acceleration function (in m/s2) and the initial velocity v(o) are given for a particle moving along a line. a(t) = 2t + 2, VO) = -15, Osts 5 (a) Find the velocity at time t. v(t) = m/s (b) Find the distance traveled during the given time interval.
Ax is the acceleration of a particle moving along the x axis as shown in the graph. The initial velocity is zero, initial position, x = 3.5 m. Write an expression for x(t), v(t) and a(t) for t between 0 and 3 s. Ax (m/s2) 20.. 1.02瓜3.0 4.0 5,0/6,0 2.0