Answer:
The metric system was originally devised so that water would have a density of 1 g/cm3, equivalent to 103 kg/m3.
Answer:
[tex]10^{3}\; \rm kg \cdot m^{-3}[/tex].
Explanation:
Convert the unit in two steps:
Start by converting [tex]\rm g[/tex] to [tex]\rm kg[/tex]. Since [tex]10^{3}\; \rm g = 1\; \rm kg[/tex], multiplying the original value by the ratio [tex]\displaystyle \frac{1\; \rm kg}{10^{3}\; \rm g}[/tex] would not change of the value expression:
[tex]\begin{aligned}& 1.00\; \rm \frac{g}{cm^{3}} \\ =\; & 1.00\; \frac{\rm g}{\rm cm^{3}} \times \frac{1\; \rm kg}{10^{3}\; \rm g} \\ =\; & 1.00\times 10^{-3}\; \frac{\rm kg}{\rm cm^{3}}\end{aligned}[/tex].
Convert [tex]\rm cm^{3}[/tex] to [tex]\rm m^{3}[/tex]. Notice that the original unit [tex]\rm cm^{3}\!\![/tex] is in the denominator. Thus, choose a ratio where [tex]\rm cm^{3}\![/tex] is in the numerator: [tex]\displaystyle \frac{10^{6}\; \rm cm^{3}}{1\; \rm m^{3}}[/tex].
[tex]\begin{aligned}& 1.00\times 10^{-3}\; \frac{\rm kg}{\rm cm^{3}} \\=\; & 1.00\times 10^{-3}\; \frac{\rm kg}{\rm cm^{3}} \times \frac{10^{6}\; \rm cm^{3}}{1\; \rm m^{3}} \\ =\; & 1.00 \times 10^{3}\; \frac{\rm kg}{\rm m^{3}}\end{aligned}[/tex].
In other words, [tex]1.00\; \rm g \cdot cm^{-3} = 1.00 \; \rm kg \cdot m^{-3}[/tex].
