Advertisements
Advertisements
प्रश्न
The temperature of a uniform rod of length L having a coefficient of linear expansion αL is changed by ∆T. Calculate the new moment of inertia of the uniform rod about the axis passing through its center and perpendicular to an axis of the rod.
Advertisements
उत्तर
Moment of inertia of a uniform rod of mass and length l about its perpendicular bisector. Moment of inertia of the rod
I = `1/12"ML"^2`
Increase in length of the rod when temperature is increased by ∆T, is given by
L’ = L(1 + αL∆T)
I’ = `"ML’"^2/12 = "M"/12"L"^2`(1 + αL∆T)2
I’ = I(1 + αL∆T)2
APPEARS IN
संबंधित प्रश्न
Choose the correct option.
Range of temperature in a clinical thermometer, which measures the temperature of the human body, is
Choose the correct option.
A glass bottle completely filled with water is kept in the freezer. Why does it crack?
Choose the correct option.
If two temperatures differ by 25° C on Celsius scale, the difference in temperature on Fahrenheit scale is
Choose the correct option.
If α, β and γ are coefficients of linear, area l and volume expansion of a solid then
Give the expression for volume thermal expansion.
Define latent heat capacity.
Write the unit of latent heat capacity.
What does the temperature of a body tell us?
Which of the following is the fourth fundamental quantity introduced while studying heat?
What is the difference between temperature and heat energy?
