Thermodynamics and Mechanics questions

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Two blocks of iron, one with mass m at 10.0°C and the other with mass 2m at 25.0°C, will reach a final temperature of 20°C when placed in contact without heat exchange with the surroundings. For the second question, the minimum speed required to keep a 1kg block attached to a string taut while revolving in a vertical circle of 1 meter radius is calculated using centripetal force principles, resulting in a speed of √9.8 m/s. In the third question, a ball rolling down a 10m inclined plane with constant acceleration will cover 4 meters in 4 seconds, as displacement is proportional to the square of time. The discussions clarify the application of thermodynamics and mechanics principles in solving these problems. Understanding these concepts is crucial for effective self-study in physics.
nasar176
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I am self studying and I can't ask anyone else so can you please help me out with these problems?

Two blocks of iron, one of mass m at 10.0C and the other of mass 2m at 25.0c, are placed in contact with each other. If no heat is exchanged with the surroundings, which of the following is the final temperature of the two blocks?

A)10
B)15
.
D) 20C ( this is the answer)

I have no idea how to solve the above problem I don't kno, any help would be really apreciated.

Q2) A 1kg block attached to a string revolves in a vertical circle of 1 meter radius near the surface of the earth. what is the minimum speed of the block which will keep the string taut all the time?

The answer is (9.8)^1/2. I tried using the centripetal force formula and the acceleration formula but i couldn't somehow come up with an answer.

Q3) A ball, initially at rest at t 0 sec, rolls with constant acceleration down an inclined plane 10m long, if the ball rolls 1 meter in the first 2 sec, how far will it have rolled at t=4 secs?

for this question i just added the 2 four times and got the answer 8 but the book says the answers is 4 meters
 
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ok i figured out the 1st one, just need help with the others
 
For Q2, think about the "worst" case (since it asks for the minimal speed - which will barely keep the string taut). When the block is at the top of the circle, both gravity and tension contribute to the centripetal force, therefore
F_g + T = \frac{mV^2}{R}

In the worst case scenario (the minimal speed), the string is barely taut - which means it is barely pulling the block - so you can say T = 0 for the minimal speed. Therefore
mg = \frac{mV^2}{R}
V = \sqrt{Rg}
which results in 9.8^(1/2) :)

For Q3, the "easy way" is to remember that, for constant acceleration, \Delta S = v_ot + at^2/2, so as Vo = 0, S \alpha t^2, where S stands for the displacement.
Therefore, if you double the time, the distante will be multiplied by four (since it depends on the square of the time), which gives you 4m.

Did i make any sense? :P
 
Last edited:
Thank you sooo much!
 

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