For this case the first thing you should do is take into account the following conversion:
[tex] 1m = 100cm [/tex]
Therefore, by applying the conversion we have:
[tex] (250,000\frac{cm^3}{m^2})((\frac{1}{100})^3\frac{m^3}{cm^3}) [/tex]
Rewriting we have:
[tex] (250,000\frac{cm^3}{m^2})(\frac{1}{100^3}\frac{m^3}{cm^3}) [/tex]
[tex] (250,000\frac{cm^3}{m^2})(\frac{1}{1,000,000}\frac{m^3}{cm^3}) = 0.25\frac{m^3}{m^2} [/tex]
Answer:
The rate in m^3/m^2 is:
[tex] 0.25\frac{m^3}{m^2} [/tex]
Answer:
0.25 [tex]\frac{m^{3} }{m^{2} }[/tex]
Step-by-step explanation:
Since you need to convert the cm^3 into m^3 then you start off by multiplying [tex]\frac{250,000 cm^{3} }{m^{2} }[/tex] to a fraction that represents m^3 over cm^3.
Like this:
[tex]\frac{250,000 cm^{3} }{m^{2} }[/tex] × [tex]\frac{m^{3} }{1,000,000cm^{3} }[/tex]
Because cm^3 is divided by itself in the equation you cancel them both out and then your left with:
[tex]\frac{250,000m^{3} }{1,000,000m^{2} }[/tex]
And when then you divide 250,000 by 1,000,000 and you get 0.25 [tex]\frac{m^{3} }{m^{2} }[/tex] which is your answer.
Please mark me as Brainliest because I worked really hard on this!
