Answer:
equation: 2.75 g/cm^3 * 1 m *3 m* (100 cm/1 m)^2 *4 cm * (1 kg/1000 g)
Step-by-step explanation:
countertop mass, m =?
density, ρ = 2.75 g/cm^3
wide, w = 1 m
long, l = 3 m
thick, t = 4 cm
countertop volume, V = w*l*t = 1 m *3 m*4 cm* (100 cm/1 m)^2
Isolating mass from density definition gives
ρ = m/V
m = ρ*V
m = 2.75 g/cm^3 * 1 m *3 m* (100 cm/1 m)^2 *4 cm * (1 kg/1000 g)
Answer:
The equation for the mass of the granite countertop is:
M=[tex]2.75\frac{g}{cm^3} \times \frac{1 kg}{1000g} \times1m\times3m\times4cm\times \frac{(100 cm)^2}{1 m^2} [/tex]
Step-by-step explanation:
The density of an object is given by:
[tex]\delta=\frac{M}{V}[/tex]
where:
δ: density (2.75 g/cm³)
M: mass of the object
V: volume of the object
Thus, the mass of the object is expressed as:
M=δ×V
Since the density of the granite is expressed in g/cm³, we have to convert the units of the expression to get the mass in kilograms.
[tex]\delta=2.75 \frac{g}{cm^3} \times \frac{1kg}{1000g}[/tex]
Since the width and length of the countertop is given in meter, we have to convert the units of the expression into cm.
V=[tex]1m\times3m\times4cm \times\frac{(100 cm)^2}{1 m^2}[/tex]
The mass of the counter top is expressed as:
M=[tex]2.75\frac{g}{cm^3} \times \frac{1 kg}{1000g} \times1m\times3m\times4cm\times \frac{(100 cm)^2}{1 m^2} [/tex]
