A pure gold ring and pure silver ring have a total mass of 15.4 g . The two ring
ID: 918808 • Letter: A
Question
A pure gold ring and pure silver ring have a total mass of 15.4 g . The two rings are heated to 68.0 C and dropped into a 13.0 mL of water at 21.5 C. When equilibrium is reached, the temperature of the water is 23.7 C.
Part A
What is the mass of gold ring? (Assume a density of 0.998 g/mL for water.)
Express your answer to two significant figures and include the appropriate units.
Part B
What is the mass of silver ring? (Assume a density of 0.998 g/mL for water.)
Express your answer to two significant figures and include the appropriate units.
mAu=Explanation / Answer
Solution:
Mass of gold and silver ring = 15.4 g
Initial T of rings = 68.0 0C
Volume of water = 13.0 mL
Initial T of water = 21.5 0C
Final T of water = 23.7 0C
Lets calculate heat required to raise the T of water from 21.5 to 23.7 deg C
q = m C delta T
m is mass in g
C is heat capacity
Delta T = change in T
q = 13.0 mL x (0.998 g/mL) x 4.184 J/g deg C x (23.7-21.5) deg C
=119.42 J
Lets assume mass of gold ring to be x and that of silver is y
x + y = 15.4 g
x = 15.4 – y
-q(metal rings) = q (water)
q (metal ring) = - 119.42
specific heat of gold = 0.129 J / g deg C
specific heat of silver = 0.233 J/ g deg C
total heat given by rings ( q) = q (gold) + q (silver)
Total heat q = - 119.42 J
-119.42 J = m (gold ) x C X delta T + m (silver ) x C X delta T
-119.42 J = (15.4-y) * 0.129 * (23.7-68.0)
+( y x 0.233 *(23.7-68.0)
-119.42 J = [(15.4-y) * ( -5.7147)]+[y *-10.322]
119.42 = (88.0063 – 5.7147 y ) +(10.322y)
31.423 = -5.7147 y + 10.322 y
31.423 = 4.61 y
y = 6.88 g
Mass of silver = 6.88 g
And mass of gold = 15.4 – 6.88 = 8.58 g
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