The temperature of equal masses of three different liquids A,B and C are 12° C, 19°c and 28°C
respectively. The temperature when A and B are mixed is 16°C and when B and C are mixed it is 23 when A and C are mixed?
Answers
Answer:
The temperature of liquid when A & C are mixed is 20.25° C.
Explanation:
Given data: The temperature of three of three different liquids of equal masses are
Ta = 12° C
Tb = 19° C
Tc = 28° C
The temperature of the mixture of A & B, Tab = 16° C
The temperature of the mixture of B & C, Tbc = 23° C
To find: The temperature of the mixture of A & C, “Tac”
Let the specific heat of the three liquids A, B & C be “Sa”, “Sb” & “Sc” respectively.
Based on the law of calorimetry, we can write
mSa(Tab - Ta) = mSb(Tb - Tab)
or, Sa(16 - 12) = Sb(19 - 16)
or, 4Sa = 3Sb
or, Sa/Sb = ¾ ….. (i)
And,
mSb(Tbc - Tb) = mSc(Tc - Tbc)
or, Sb(23 - 19) = Sc(28 - 23)
or, 4Sb = 5Sc
or, Sb/Sc = 5/4 ….. (ii)
From (i) & (ii), we get
Sa:Sb:Sc = 15:20:16
∴ Sa = (15/16)Sc ….. (iii)
Therefore,
The temperature of mixture A & C is given by
mSa(Tac - Ta) = mSc(Tc - Tac)
putting the value of Sa from (iii)
or, 15/16Sc(Tac – 12) = Sc(28 - Tac)
or, 15(Tac – 12) = 16(28 - Tac)
or, 15Tac – 180 = 448 – 16Tac
or, 31Tac = 628
or, Tac = 628/31 = 20.25° C
Answer:
20.2
Explanation:
according to law of heat equal no of heat gain by equal no of heat release