Answer:
[tex]\boxed {\boxed {\sf About \ 3.53 \ *10^{24}atoms \ Co}}[/tex]
Explanation:
To convert from grams to atoms:
1. Convert grams to moles
First, find the molar mass of cobalt using the Periodic Table of Elements.
Next, use this mass as a ratio or fraction.
[tex]\frac{58.93319 \ g\ Co}{1 \ mol \ Co}[/tex]
Multiply the mass of the given sample (345 grams) by this ratio.
[tex]345 \ g \ Co *\frac{58.93319 \ g\ Co}{1 \ mol \ Co}[/tex]
Flip the fraction so the grams of Cobalt will cancel each other out when multiplying.
[tex]345 \ g \ Co *\frac{1 \ mol \ Co}{58.93319 \ g\ Co}[/tex]
[tex]345 \ *\frac{1 \ mol \ Co}{58.93319 }[/tex]
[tex]\frac{345 \ mol \ Co}{58.93319 } =5.854086636 \ mol \ Co[/tex]
2. Convert moles to atoms
Use Avogadro's Number, which tells us the number of units (in this case atoms) in 1 mole.
Use this number as a ratio or fraction.
[tex]\frac{6.022 * 10^{23} \ atoms \ Co}{1 \ mol \ Co}}[/tex]
Multiply this ratio by the number of moles we found.
[tex]5.854086636 \ mol \ Co*\frac{6.022 * 10^{23 }\ atoms \ Co}{1 \ mol \ Co}}[/tex]
The moles of Cobalt will cancel.
[tex]5.854086636 \ *\frac{6.022 * 10^{23 }\ atoms \ Co}{1 }}[/tex]
[tex]5.854086636 \ *{6.022 * 10^{23 }\ atoms \ Co}[/tex]
[tex]3.52533097*10^{24} \ atoms \ Co[/tex]
3.Round
The original measurement of 345 has 3 significant figures (3, 4, and 5). We must round to 3 sig figs, which is the hundredth place for this measurement.
[tex]3.52533097*10^{24} \ atoms \ Co[/tex]
The 5 in the thousandth place tells us to round the 2 to a 3.
[tex]3.53 \ *10^{24}atoms \ Co[/tex]
There are about 3.53*10²⁴ atoms of cobalt in 345 grams.
