1. Two uniform metal disks, one with radius R1 = 2.50 cm and mass M1 = 0.80 kg a

Question

1. Two uniform metal disks, one with radius R1 = 2.50 cm and mass M1 = 0.80 kg and the other with radius R2 = 5.00 cm and mass M2 = 1.60 kg, are welded together and mounted on a frictionless axle through their common center. A light string is wrapped around the edge of the smaller disk, and a 1.50 kg block is suspended from the free end of the string. If the block is released from rest at a distance of 2.00 m above the floor, what is its speed just before it strikes the floor? (Note: The moment of inertia of a uniform solid disk is given by (1/2)MR^2).

Explanation / Answer

here

m1 = 0.80 kg

m2 = 1.60 kg

r1 = 0.025 m

r2 = 0.05 m

M = 1.5 kg

d = 2 m

total inertia

Inet = 1/2 * (m1 * r1^2 + m2 * r2^2)
then by using

Newton's 2nd law for the hanging block

M*g - T = M*a ......................(1)

The only force causing a torque is T.

T* r1 = Inet *alpha

No-slip condition
alpha = a / r1
T * r1^2 = Inet * a
T = Inet*a/r1^2.........................(2)

then put the equation (2) in the equation (1)

M*g - Inet*a/r1^2 = M*a

M*g = a*(M + Inet/r1^2)

a = g*M*r1^2/(M*r1^2 + Inet)

then by using third equation of motion
vf^2 = vi^2 + 2*a*d

vi = 0, thus:
vf^2 = 2*a*d

So,
vf = sqrt(2*a*d)
by puttiing the value of a

vf = sqrt(2*d*g*M*r1^2/(M*r1^2 + Inet))

then by putting the equation of Inet

vf = sqrt(2*d*g*M*r1^2/(1/2*(m1*r1^2 + m2*r2^2) + M*r1^2 ) )

vf = 2*sqrt(d*g*M*r1^2/(m1*r1^2 + m2*r2^2 + 2*M*r1^2) ).................(3)

then put all the values

vf = 2 * sqrt( 2 * 9.8 * 1.5 * 0.025^2 / 0.8 * 0.025^2 + 1.6 * 0.05^2 + 2 * 1.5 * 0.025^2))

vf = 3.395 m/s

the speed just before it strikes the floor is 3.395 m/s

Related Questions

Navigate

• Browse (All)
• Browse 1
• Subjects

---

---

Integrity-first tutoring: explanations and feedback only — we do not complete graded work. Learn more.