wire has a diameter of o.03589 inches. Solid rhodium has a density pont o gens\'
ID: 571963 • Letter: W
Question
wire has a diameter of o.03589 inches. Solid rhodium has a density pont o gens' and licluid rhodium has a density of 10 650 gem, at 1966.the meting of 12.410 point of thodium. The current price ol (20 points) or150.0 t of 19-gauge thodium wire. Recall: Density ons un a. The length of the wire in centimeters b. The diameter of the wire in centimeters The volume of the wire in cubic cent mt alur c The volume of the wire in cubic centimeter, V-arl (05-0826 n d. The weight of the wire in pounds. 1 lb 2205 kg 6.001 keExplanation / Answer
Ans. #c. Volume of 150-ft (=4572.0 cm) wire = (3.14159) x (0.09116 cm/ 2)2 x 4572 cm
= 29.8405296 cm3
#e. From #c, we have, the volume of solid wire = 29.8405296 cm3
Now,
Mass of wire = Volume x Density of solid metal
= 29.8405296 cm3 x (12.410 g/ cm3)
= 370.320972336 g
# The mass of metal remains constant irrespective of its physical state (solid or liquid).
So, mass of molten (liquid) metal when wire melts = 370.320972336 g
Now,
Volume of liquid metal = Mass / Density of liquid metal
= 370.320972336 g / (10.650 g / cm3)
= 34.7719222 cm3
# Change in volume = Volume of liquid metal – Volume of solid metal
= 34.7719222 cm3 – 29.8405296 cm3
= (+) 4.9313926 cm3
Note that the (+) sign indicates that the volume of metal increase when the solid melts into liquid form.
#f. Given, rate of metal wire = $950 / tr Oz = $950 / 31.103 g
Now,
Mass of desired wire costing $250 = Available cost / Rate of wire
= $250 / ($950 / 31.103 g)
= 8.185 g
Volume of desired (solid) wire = 8.185 g / (12.410 g/ cm3) = 0.6595 cm3
# We have, diameter of 19-gauge wire = 0.09116 cm
Volume of desired wire = 0.6595 cm3
Let the desired length of wire be l cm.
So,
0.6595 cm3 = (3.14159) x (0.09116 cm/ 2)2 x l
Or, l = 0.6595 cm3 / (0.0065268 cm2)
Hence, l = 101.045 cm
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