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Need help with a problem. For some reason I can not seem to get it correct. Thinking my formula is wrong. Here's the problem:

Assume that there are approximately 140x10^9 stars in our galaxy.
Our galaxy is 50,000 light years from the center to the edge, but just 1,000 light years thick. It's shaped like a thin disk or cylinder. If the stars were distributed equally throughout the galaxy, how many stars would you expect to find in one cubic light year?

I thought it would be Pi*r^2*l. Then divide that by the number of stars. What am I doing wrong? Thanks, been 20 years since I had to do math like this!

User Lagistos
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r=50,000\text{ ly}=5\cdot10^4\text{ ly}\\ h=1,000 \text{ ly}=10^(3)\text{ ly}\\ V=\pi r^2h\\\\ V=\pi \cdot(5\cdot10^4)^2\cdot10^3\\ V=\pi \cdot25 \cdot10^8 \cdot10^3\\ V=2.5\pi\cdot10^(12) \text{ ly}^3\\\\ (140\cdot10^9)/(2.5\pi\cdot10^(12))=\\ (1.4\cdot10^(11))/(2.5\pi\cdot10^(12))=\\ 0.56\pi\cdot10^(-1)=\\ 5.6\pi\cdot10^(-2)\approx1.76\cdot10^(-1)

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