Measuring thermal quantities by the method of mixtures - class-XI
measuring thermal quantities by the method of mixtures
Questions
How much heat is required to raise the temperature of 150 g of iron from $20 ^oC$ to $25 ^oC$? (Specific heat of iron $480 J kg^{-1} {;}^oC^{-1})$
- 350 J
- 345 J
- 360 J
- 330 J
Find the heat lost by a copper cube of mass 400 g when it cool from $100^oC$ to $30^oC$. (Specific of heat of copper $=390 J kg^{-1} {;}^oC^{-1})$.
- 50000 J
- 10000 J
- 10920 J
- 10900 J
A body having 1680 J of energy is supplied to 1000 g of water. If the entire amount of energy is converted into heat, the rise in temperature of water (sp. heat of water $=4200 J kg^{-1} {;}^oC^{-1})$
- $0.4 ^oC$
- $40 ^oC$
- $4 ^oC$
- $44 ^oC$
What is the process in which heat energy of both hot and cold body equalizes?
- Calorimetry
- Fermentation
- Latent heat
- Hidden heat
How much heat is required to raise the temperature of 100 g of water of $5 ^oC$ to $95 ^oC$?
- 900 kcal
- 90 kcal
- 10 kcal
- 9 kcal
According to principle of calorimetry, heat absorbed by cold bodies is equal to heat released by hot bodies.
- True
- False
5 kg of water at $80^oC$ is taken in a bucket of negligible heat capacity, 15 kg of water at $20^oC$ is added to it. What is the temperature of the mixture?
- $45^oC$
- $65^oC$
- $85^oC$
- $35^oC$
5 g of water at $30^oC$ and 5 g of ice at $-20^oC$ are mixed together in a calorimeter. What is the final temperature of the mixture. Given specific heat of ice $=0.5 cal g^{-1} (^oC)^{-1}$ and latent heat of fusion of ice $=80 cal g^{-1}$.
- <span>$0^oC$</span>
- <span>$1^oC$</span>
- <span>$10^oC$</span>
- <span>$20^oC$</span>
In a process 10 g of ice at $-5^oC$ is converted into the steam at $100^oC$. If specific heat of ice is $0.5 \ cal g^{-1} {;}^oC^{-1}$, then the amount of heat required to convert 10 g of ice from $-5^oC$ to $0^oC$ is :
- 15 cal
- 25 cal
- 50 cal
- 100 cal
400 g of ice at 253 K is mixed with 0.05 kg of steam at $100^oC$. Latent heat of vaporisation of steam $=540 cal g^{-1}$. Latent heat of fusion of ice $=80 cal g^{-1}$. Specific heat of ice $=0.5 cal g^{-1} {;}^oC^{-1}$. Find the resultant temperature of the mixture.
- <span>253 K</span>
- <span>260 K</span>
- <span>273 K</span>
- <span>290 K</span>
A piece of copper weighing 500 g is heated to $100^oC$ and dropped into 200g of water at $25^oC$. Find the temperature of the mixture. The specific heat of Cu is $0.42 J g^{-1} {;}^oC^{-1}$.
- <span>$30^oC$</span>
- <span>$40^oC$</span>
- <span>$50^oC$</span>
- <span>$60^oC$</span>
$10\ kg$ of hot water in a bucket at $70^oC$ is cooled for taking a bath adding to it $20\ kg$ water at $20^oC$. What is the temperature of the mixture? (Neglect the thermal capacity of the bucket)
- $30.67^oC$
- $36.67^oC$
- $60.67^oC$
- $46.67^oC$
What is the final temperature of the mixture of 300 g of water at $25^oC$ added to 100 of ice at $0^oC$.
- <span>$0^oC$</span>
- <span>$1^oC$</span>
- <span>$2^oC$</span>
- <span>$3^oC$</span>
500 g of water at $100^oC$ is mixed with 300 g at $30^oC$. Find the temperature of the mixture. Specific heat of water $=4.2 J g^{-1} {;}^oC^{-1}$.
- $73.8^oC$
- $53.8^oC$
- $40^oC$
- $60^oC$
A calorimeter contains $70.2 ,g$ of water at $15.3^o C$. If $143.7 ,g$ of water at $36.5^o C$ in mixed it with the common temperature is $28.7^o C$. The water equivalent of the calorimeter is:
- $15.6 ,g$
- $9.4 ,g$
- $6.3 ,g$
- $13.4 ,g$
$5$g of copper was heated from $20^{\circ}$ to $80^{\circ}$. How much energy was used to heat Cu? (Specific heat capacity of Cu is $0.092 cal/g ^{\circ}C$).
- $27.6$ cal
- $50$ cal
- $35$ cal
- $25.7$ cal
A calorimeter constains 10 g of water at ${ 20 }^{ \circ }$ C. The temperature falls to ${ 15 }^{ \circ }$ C in 10 min. When calorimeter contains 20 g of water at ${ 20 }^{ \circ }$ C, it takes 15 min for the temperature to become ${ 15 }^{ \circ }$ C. The water equivalent of the calorimeter is
- 5 g
- 10 g
- 25 g
- 50 g
What is the principle of the method of a mixture? Name the law on which this principle is based.
- Newtons law of cooling
- none
- <span>principle of calorimetry </span>
- <span>principle of heat transfer</span>
In a calorimeter of water equivalent $20 { g },$ water of mass $1.1 { kg }$ is taken at $288{ K }$ temperature. If steam at temperature $373 { K }$ is passed through it and temperature of water increases by $6.5 ^ { \circ } { C }$ then the mass of steam condensed is
- $17.5{ g }$
- $11.7{ g }$
- $15.7{ g }$
- $18.2{ g }$
2000 J of energy is needed to heat 1 kg of paraffin through $1^{\circ}C$. So How much energy is needed to heat 10 kg of paraffin through $2^{\circ}C$ ?
- 4000 J
- 10,000 J
- 20,000 J
- 40,000 J
When in thermal contact, the quantity of heat lost by the hotter body is ...... the amount of heat gained by the colder body. (neglect loss of heat due to convection & radiation)
- Equal to
- Greater than
- Less than
- Cannot say
Bunty mixed 440 gm of ice at $0^{\circ}C$ with 540 gm of water at $80^{\circ} C$ in a bowl. Then what would remain after sometime in the bowl?
- only ice
- only water
- ice and water in same amount
- ice and water will vapourise
The quantity of heat required to raise the temperature of 2000 g of water from 10$^o$C to 50$^o$C is
- 80 cal
- 80,000 cal
- 8000 cal
- none of these
When 60 calories of heat are supplied to 15 g of water, the rise in temperature is
- <font><font>$75^{\circ}C$</font></font>
- <font><font>$90^{\circ}C$</font></font>
- <font><font>$4^{\circ}C $</font></font>
- <font><font>$0.25^{\circ}C$</font></font>
Calorimeters are generally made of
- copper
- brass
- aluminium
- zinc
On which law does the study of calorimetry based?
- Joule's law
- Law of conservation of energy
- Law of Kinetic energy
- None
When 60 calories of heat are supplied to 15 g of water, the rise in temperature is
- $75^\circ C$
- $900^\circ C$
- $4^\circ C$
- $0.25^\circ C$
A thermos bottle containing coffee is vigorously shaken. If the coffee is considered as a system, then the temperature of the coffee will
- increase slightly
- fall
- remain the same
- never be determined
The branch of physics that deals with the measurement of heat energy is known as
- Fermentation
- Latent heat
- Calorimetry
- Hidden heat
A thermometer is used to measure
- heat
- thermal capacity
- water equivalent
- temperature
Which of the following properties must be known in order to calculate the amount of heat needed to melt 1.0kg of ice at $0^oC$?
I. The specific heat of water
II. The latent heat of fusion for water
III. The density of water.
- I only
- I and II only
- I, II, and III
- II only
- I and III only
Heat is added to a block of ice of mass $m$ until the entire block melts into liquid water. Identify by which of the following method this can be explained ?
- First law of thermodynamics (conservation of energy)
- Second law of thermodynamics (law of entropy)
- Ideal gas law
- Heat of fusion and heat of vaporization equation
- Heat engine efficiency
State True or False.
- True
- False
400 g of vegetable oil of specific heat capacity 1.98 J ${ g }^{ -1 }$ $^{ \circ }{ { C }^{ -1 } }$) is cooled from ${ 100 }^{ \circ }C$. Find the final temperature, if the heat energy given out by is 47376 J.
- ${ 30.2 }^{ \circ }C$
- ${ 40.2 }^{ \circ }C$
- ${ 50.2 }^{ \circ }C$
- ${ 43.2 }^{ \circ }C$
How much heat is required to raise the temperature of $150 g$ of iron from ${ 20 }^{ \circ }C$ to ${ 25 }^{ \circ }C$?
- $350 J$
- $345 J$
- $360 J$
- $330 J$
How much heat is required to raise the temperature of $100 g$ of water from ${ 5 }^{ \circ }C$ to ${ 95 }^{ \circ }C$?
- $900 kcal$
- $90 kcal$
- $10 kcal$
- $9 kcal$
2000 cal of heat is supplied to 200 g of water. Find the rise in temperature. (Specific heat of water = 1 cal ${ { g }^{ -1 } }^{ \circ }{ C }^{ -1 }$)
- ${ 10 }^{ \circ }C$
- ${ 20 }^{ \circ }C$
- ${ 30 }^{ \circ }C$
- ${ 40 }^{ \circ }C$
What will be the amount of heat required to convert $50 g$ of ice at ${ 0 }^{ \circ }C$ to water at ${ 0 }^{ \circ }C$?
- $400 cal$
- $4000 cal$
- $3000 cal$
- $300 cal$
Calculate the quantity of heat required to convert 1.5 kg of ice at ${ 100 }^{ \circ }C$ to water at ${ 15 }^{ \circ }C$. (${ L } _{ ice }\quad =\quad 3.34\quad \times \quad { 10 }^{ 5 }\quad J{ \quad kg }^{ -1 }$, ${ C } _{ water }\quad =\quad 4180\quad J{ \quad kg }^{ -1 }\quad ^{ \circ }{ { C }^{ -1 } }$)
- $5.85\quad \times \quad { 10 }^{ 5 }\quad J$
- $5.95\quad \times \quad { 10 }^{ 5 }\quad J$
- $3.95\quad \times \quad { 10 }^{ 5 }\quad J$
- $4.95\quad \times \quad { 10 }^{ 5 }\quad J$
One calorie is defined as the heat required to raise the temperature of $1$ gm of water by $1^o$C in a certain interval of temperature and at certain pressure. The temperature interval and pressure is?
- $13.5^o$ C to $14.5^o$ C & $76$ mm of Hg
- $6.5^o$ C to $7.5^o$ C & $76$ mm of Hg
- $14.5^o$ C to $15.5^o$ C & $760$ mm of Hg
- $98.5^o$ C to $99.5^o$ C & $760$ mm of Hg
If there are no heat losses to the surroundings, the quantity of heat gained by the cold body is equal to the quantity of heat lost by the hot body.
- True
- False
A copper ball of mass $100gm$ is at a temperature $T$. It is dropped in a copper calorimeter of mass $100gm$, filled with $170gm$ of water at room temperature. Subsequently the temperature of the system is found to b4 ${75}^{o}$. $T$ is given by then (Given: room temperature $={30}^{o}C$, specific heat of copper $=0.1cal/gm _{ }^{ o }{ C }\quad $)
- ${ 825 }^{ o }C$
- ${ 800 }^{ o }C$
- ${ 885 }^{ o }C$
- ${ 1250 }^{ o }C$
400 g of vegetable oil of specific heat capacity $1.98 J g^{-1} {;}^oC^{-1}$ is cooled from $100^oC$. Find the final temperature, if the heat energy given out by oil is 47376 J.
- $30.2^oC$
- $40.2^oC$
- $50.2^oC$
- $43.2^oC$
2000 cal of heat is supplied to 200 g of water. Find the rise in temperature. (Specific heat of water $=1 cal g^{-1} {;}^oC^{-1})$
- $10 ^oC$
- $20 ^oC$
- $30 ^oC$
- $40 ^oC$
500 g of hot water at $60^oC$ is kept in the open till its temperature falls to $40^oC$. Calculate the heat energy lost to the surroundings by the water. (Specific heat of water $=4200 J kg^{-1} {;}^oC^{-1})$
- 2400 J
- 5000 J
- 40000 J
- 42000 J
How much amount of heat is required to raise the temperature of 100 g of water from $30 ^oC$ to $100 ^oC$? The specific heat of water $=4.2 J g^{-1} {;}^oC^{-1}$.
- 25.5 kJ
- 29.4 kJ
- 30 kJ
- 40 kJ
What quantity of heat would be given out by 200 gm of copper in cooling from $80^oC$ to $20^oC$ (Specific heat of copper $=0.09 cal g^{-1} {;}^oC^{-1})$?
- 1080 cal
- 1000 cal
- 1500 cal
- 1100 cal
If $20 \ g$ of ice at $0^\circ C$ is mixed with $10 \ g$ of water at $40^\circ C$, the final mass of water in the mixture is:
- 10 g
- 25 g
- 18 g
- 20 g
A liquid P if specific heat capacity $2400 J kg^{-1} K^{-1}$ and at $70^oC$ is mixed with another liquid R of specific heat capacity $1000 J kg^{-1} K^{-1}$ at $30^oC$. After mixing, the final temperature of the mixture is $40^oC$. Find the ratio of the mass of the liquids mixed?
- <span>4 : 5</span>
- <span>8 : 5</span>
- <span>40 : 5</span>
- <span>48 : 5</span>
Calculate the amount of heat required to convert 5 kg of ice to $0^oC$ to vapour at $100^oC$.
- $1.5\times 10^7 J$
- $2.5\times 10^7 J$
- $3.5\times 10^7 J$
- $4.5\times 10^7 J$
In a calorimeter of water equivalent $20g$,water of mass $1.1$kg is taken at $288K$ temperature.If steam at temperature $373K$ is passed through it and temperature of water increases by $6.5^oC$ then the mass of steam condensed is:
- $17.5g$
- $11.7g$
- $15.7g$
- $18.2g$
Steam at $100^oC$ is passed into $2.0$kg of water contained in a calorimeter of water equivalent $0.02$kg at $15^oC$ till the temperature of the calorimeter and its content rise to $90^oC$. The mass of steam condensed in kg is
- $0.301$
- $0.280$
- $0.60$
- $0.02$
Utensils used for efficient cooking should have
- Large heat capacity
- Small heat capacity
- Medium heat capacity
- Any heat capacity
A copper calorimeter of a mass $300\ g$ contains $500\ g$ of water at a temperature of $20^\circ C$. A $500\ g$ of copper block at $100^\circ C$ is dropped into the calorimeter. If the resultant temperature is $25^\circ C$, then fond the specific heat of copper in $JKg^{-1} K^{-1}$.
- $190$
- $290$
- $390$
- $490$
Calories is defined as the amount of heat required to rise temperature of $1\ g$ of water by $1^{o}C$ and it is defined under which of the following conditions.
- From $14.5^{o}C$ to $15.5^{o}C$ at $760\ mm$ of $Hg$
- From $98.5^{o}C$ to $99.5^{o}C$ at $760\ mm$ of $Hg$
- From $13.5^{o}C$ to $14.5^{o}C$ at $76\ mm$ of $Hg$
- From $3.5^{o}C$ to $4.5^{o}C$ at $76\ mm$ of $Hg$
A copper calorimeter contains $100 g$ of water at $16^o C$. When $15 g$ of ice is added to it, the resultant temperature of the mixture is $4^o C$. Water equivalent of the calorimeter is
- $8 g$
- $12 g$
- $6 g$
- None
Which of the following material is used to make calorimeter?
- Glass
- Ebonite
- Metal
- Superconductor
The water equivalent of a 400 g copper calorimeter (specific heat =0.1 cal/$g^{ o }C$)-
- $40g$
- $4000g$
- $200g$
- $4g$
A man would feel iron and wooden balls equally cold or hot at
- $98.6^oC$
- $98.6^oF$
- $198.6^oF$
- $198.6^oC$
How many calories of heat are required by gram of water at $99^oC$ to boil off:
- 530
- 640
- 540
- 500
$50 g$ of ice at 0 C is mixed with $50 g$ of water at 20 C.The resultant temperature of the mixture would be
- 10 C
- 0 C
- -10 C
- -35 C
At which temperature do the readings of the celcius and the Fahrenheit scales coincide ?
- $0$
- $100$
- $-40$
- $-80$
- None of the above
The amount of heat required to convert 1 g of ice (specific 0.5 cal at $g^{-1o} C^{-1}$ ) at $-10^0 C$ to steam at $100 $ $^\circ C$ is ___________.
- 725 cal
- 636 cal
- 716 cal
- None of these
The specific heat for substance $A$ is twice the specific heat of substance $B$. The same mass of each substance is allowed to gain $50$ Joules of heat energy. As a result of the heating process:
- the temperature of $A$ rises twice as much as $B$
- the temperature of $A$ rises four times as much as $B$
- the temperature of $B$ rises twice as much as $A$
- the temperature of $B$ rises four times as much as $A$
- the temperature of both $B$ and $A$ rise the same amount
To measure the specific heat of copper, an experiment is performed in the lab. A piece of copper is heated in an oven then dropped into a beaker of water. To calculate the specific heat of copper, the experimenter must know or measure the value of all of the quantities below EXCEPT the
- Original temperatures of the copper and the water
- Mass of the water
- Final (equilibrium) temperature of the copper and the water
- Time taken to achieve equilibrium after the copper is dropped into the water
- Specific heat of the water
An aluminium block of 2m mass and an iron block of m mass,each absorbs the same amount of heat, and both blocks remain solid. If the specific heat of aluminium is twice the specific heat of iron, then find out the correct statement?
- The increase in temperature of the aluminum block is twice the increase in temperature of the iron block
- The increase in temperature of the aluminum block is four times the increase in temperature of the iron block
- The increase in temperature of the aluminum block is the same as increase in temperature of the iron block
- The increase in temperature of the iron block is twice the increase in temperature of the aluminum block
- The increase in temperature of the iron block is four times the increase in temperature of the aluminum block
A mass of stainless steel spoon is 0.04 kg and specific heat is $0.50 kJ/kg \times ^oC$. Then calculate the heat which is required to raise the temperature $20^oC$ to $50^oC$ of the spoon.
- 200 J
- 400 J
- 600 J
- 800 J
- 1,000 J
A body having $1680 J$ of energy is supplied to $100 g$ of water. If the entire amount of energy is converted into heat the rise in temperature of water (sp. heat of water = $4200 JKg^{ -1 }\ ^0C ^{ -1 } $)
- $0.4^{ \circ }{ C }$
- $40^{ \circ }{ C }$
- $4^{ \circ }{ C }$
- $44^{ \circ }{ C }$
$5gm$ of steam at $100^oC$ is passed into calorimeter containing liquid , Temperature of liquid rises from $32^oC$ to $40^oC$. Then water equivalent of calorimeter and content is
- $40$ gram
- $375$ gram
- $300$ gram
- $160$ gram
1 kg of water at $20^{\circ}C$ is, mixed with 800 g of water at $80^{\circ}C$. Assuming that no heat is lost to the surroundings. Calculate the final temperature of the mixture.
- $24.44^{\circ} C$
- $46.67^{\circ} C$
- $44.44^{\circ} C$
- $54.44^{\circ} C$
The temperature of equal masses of three different liquids A, B, and C are $12^o C$,$19^o C$ and $28^o C$ respectively. The temperature when A and B are mixed is $16^oC$ and When B and C are mixed is $23^o C$. The temperature when A and C are mixed is:
- $18.2^ C$
- $22^ C$
- $20.3^ C$
- $24.2^ C$