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What is the length (in cm) of the side of an iron ingot (rectangular box) that has a mass of 4.578 kg and has width = height = 5.00 cm
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Respuesta :

brightmoonligh2439
since we have the mass of the iron ingot we can get its volume by dividing the mass (4.578) by the density of iron (7874 kgm^-3) and we get that the volume is 5.8140716x10^-4 m^3. now we convert the volume from m^3 to cm^3(1m^3=1000000cm^3) and so by multiplying  5.8140716x10^-4 by 1000000 we get:581.4cm^3 (1 decimal place).

the volume for any  cuboid is V=l x w x s we have the volume, the length and the  width, so we plug in the values and solve for s
[tex]s= \frac{581.4}{5^{2} } =23.3cm[/tex]
 the answer is rounded to three significant figures

hope i helped

Answer : The length of the side of an iron ingot (rectangular box) is 0.0233 cm.

Explanation : Given,

Width of rectangular box = 5.00 cm

Height of rectangular box = 5.00 cm

Mass of rectangular box = 4.578 g

Density of iron = [tex]7.86cm^3[/tex]

First we have to determine the volume of rectangular box.

Formula used :

[tex]\text{Density}=\frac{\text{Mass}}{\text{Volume}}[/tex]

[tex]7.86cm^3=\frac{4.578g}{\text{Volume}}[/tex]

[tex]\text{Volume}=0.582cm^3[/tex]

Now we have to determine the length of rectangular box.

Formula for volume of rectangle :

[tex]V=l\times b\times h[/tex]

where,

V = volume of rectangular box

l = length of rectangular box

b = width of rectangular box

h = height of rectangular box

Now put all the given values in the above formula, we get:

[tex]0.582cm^3=l\times (5.00cm)\times (5.00cm)[/tex]

[tex]l=0.0233cm[/tex]

Therefore, the length of the side of an iron ingot (rectangular box) is 0.0233 cm.