a glass tube of length `133cm` and of uniform cross-section is to be filled with mercury so that the volume of the unoccupied by mercury remains the same at all temperatures. If cubical coefficient for glass and mercury are respectively `0.000026//^(@)C` and `0.000182//^(@)C` , calculate the length of mercury column.

A glass tube of length l_(0) and of uniform cross-section is to be filled with mercury so that the length of the tube unoccoupied by mercury remains same at all temperatures. If gamma_(g)=3alpha , calculate length of mercury column.

In a mercury-glass thermometer the cross-section of the capillary portion is A_(0) and the volume of the bulb is V_(0) at 273K . If alpha and gamma are the coefficients of linear and cubical expansion coefficients of glass and mercury respectively then length of mercury in the capillary at temperature t^(@)C is (Ignore the increase in cross-sectional area of capillary)

In a mercury-glass thermometer the cross-section of the capillary portion is A_(0) and the volume of the bulb is V_(0) at 273K . If alpha and gamma are the coefficients of linear and cubical expansion coefficients of glass and mercury respectively then length of mercury in the capillary at temperature t^(@)C is (Ignore the increase in cross-sectional area of capillary)

In a mercury-glass thermometer the cross-section of the capillary portion is A_(0) and the volume of the bulb is V_(0) at 273K . If alpha and gamma are the coefficients of linear and cubical expansion coefficients of glass and mercury respectively then length of mercury in the capillary at temperature t^(@)C is (Ignore the increase in cross-sectional area of capillary)

A thin long glass tube of uniform cross-section contains 1 m long mercury thread at 0^(@)C. At 100^(@)C , the mercury thread increases by 16.5 mm. If the coefficient of real expansion of mercury is 0.000182^(@)C^(-1) , find the coefficient of linear expansion of glass.

A glass flask whose volume is exactly 1000 at 0^@C is completely filled with mercury at this temperature . When the flask and mercury are heated to 100 ^@C , it is found that 15.4 cm^3 of mercury overflows. If the coefficient of volume expansion of mercury is 1.8xx10^(-4)//K , calculate the coefficient of volume expansion of glass.

A thread of mercury of 10.2 g is in a tube of uniform cross-section 0.1cm^2 . Calculate the length of the thread. The density of mercury is 13.6(g)/(cm^3) .

A two litre glass flask contains some mercury. It is found that at all temperatures the volume of the air inside the flask remains the same. The volume of the mercury inside the flask is ( alpha for glass =9xx10^-6//^@C,gamma for mercury 1.8xx10^-4//^@C)