A single conservative force acts on a 5.30-kg particle within a system due to its interaction with the rest of the system. The equation
Fx = 2x + 4
describes the force, where Fx is in newtons and x is in meters. As the particle moves along the x axis from x = 1.08 m to x = 6.50 m, calculate the following.
(a) the work done by this force on the particle
1 J
(b) the change in the potential energy of the system
2 J
(c) the kinetic energy the particle has at x = 6.50 m if its speed is 3.00 m/s at x = 1.08 m
3 J

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Netta00 Netta00 · Answer 1 · 2019-11-01T10:15:04+01:00

Answer:

Given that

m = 5.3 kg

Fx = 2x + 4

We know that work done by force F given as

w= ∫ F. dx

a)

Given that x=1.08 m to x=6.5 m

Fx = 2x + 4

w= ∫ F. dx

[tex]w=\int_{1.08}^{6.5}(2x+4) .dx[/tex]

[tex]w=\left [x^2+4x \right ]_{1.08}^{6.5}[/tex]

[tex]w=(6.5^2-1.08^2)+4(6.5-1.08)\ J[/tex]

w=62.7 J

b)

We know that potential energy given as

[tex]F=-\dfrac{dU}{dx}[/tex]

∫ dU = -∫F.dx ( w= ∫ F. dx)

ΔU= -62.7 J

c)

We know that form work power energy theorem

Net work = Change in kinetic energy

W= KE₂ - KE₁

62.7 =KE₂ - (1/2)x 5.3 x 3²

KE₂ = 86.55 J

This is the kinetic energy at 6.5m