Answer to Question #163589 in Math for ali

Question #163589

A lift cage of mass 500 kg accelerates upwards from rest to a velocity of 6 ms−1 whilst travelling a distance of 12 m. The frictional resistance to motion is 200 N. Making use of the principle of conservation of energy, determine:

i) the work done

ii) the tension in the lifting cable

iii) the maximum power developed.

Expert's answer

m = 500 kg − mass of the cage;

𝑣 = 6 m/s − final velocity of the cage;

h = 12m − distance traveled by the cage;

F = 200N − frictional resistance to motion;

t − time of travelling;

a − acceleration of the cage.

i) The lift, after accelerating h upwards gains:

- its potential energy "E_p =mgh,"

- its kinetic energy "E_k=mv^2\/2,"

- in addition its motor needs to work against friction, "W_F=Fh."

The sum of these 3 energies is equal to the driving motor's work

"W=E_p+E_k+W_F"

"=mgh+mv^2\/2+Fh"

"W=500kg(9.81m\/s^2)12m+500kg(6m\/s)^2\/2"

"+200N(12m)=70260\\ J=70.26\\ kJ"

ii) The whole amount of work "(W)" is done by the tension force "\\vec N" (pointing upwards) on the distance "h." Because "W=N\\cdot h," we've got:

"N=\\dfrac{70260\\ J}{12m}=5855\\ N"

iii) Rate equation for the cage:

"0=\\text{v}-at"

Equation of motion for the cage:

"s=\\dfrac{at^2}{2}"

"s=\\dfrac{(\\dfrac{\\text{v}}{t})t^2}{2}"

"t=\\dfrac{2s}{\\text{v}}"

The motor's power P equals " work / time". Therefore:

"P=\\dfrac{W}{t}=\\dfrac{W\\text{v}}{2s}"

"P=\\dfrac{70260\\ J(6m\/s)}{2(12m)}=17565\\ W=17.565\\ kW"

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Answer to Question #163589 in Math for ali

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