Answer:
[tex]\boxed {\boxed {\sf About \ 1.5 * 10^{24} \ atoms \ Si}}[/tex]
Explanation:
When converting from moles to atoms, we must use Avogadro's number. This number tells us there are 6.022 * 10²³ atoms in 1 mole. We can multiply this number by the number of moles.
First, we must set up Avogadro's number as a ratio.
[tex]\frac {6.022 \ * 10^{23} \ atoms \ Si }{1 \ mol \ Si}}[/tex]
Next, multiply the number of moles by the ratio.
[tex]2.5 \ mol \ Si *\frac {6.022 \ * 10^{23} \ atoms \ Si }{1 \ mol \ Si}}[/tex]
When we multiply, the moles of silicon will cancel.
[tex]2.5 * \frac {6.022 \ * 10^{23} \ atoms \ Si }{1}}[/tex]
Since the denominator of the fraction is 1, we can cancel it out too.
[tex]2.5 * {6.022 \ * 10^{23} \ atoms \ Si }[/tex]
[tex]1.5055 * 10^{24} \ atoms \ Si[/tex]
The original measurement (2.5 moles) has 2 significant figures (2 and 5). Therefore we must round to 2 sig figs. For this question, 2 sig figs is the tenth place.
The 0 in the hundredth place tells us to leave the 5 in the tenth place.
[tex]1.5 * 10^{24} \ atoms \ Si[/tex]
There are about 1.5 * 10²⁴ atoms of silicon.
