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# 1.4: Numbers in Astronomy

In astronomy we deal with distances on a scale you may never have thought about before, with numbers larger than any you may have encountered. We adopt two approaches that make dealing with astronomical numbers a little bit easier. First, we use a system for writing large and small numbers called scientific notation (or sometimes powers-of-ten notation). This system is very appealing because it eliminates the many zeros that can seem overwhelming to the reader. In scientific notation, if you want to write a number such as 500,000,000, you express it as $$5 × 10^8$$. The small raised number after the 10, called an exponent, keeps track of the number of places we had to move the decimal point to the left to convert 500,000,000 to 5. If you are encountering this system for the first time or would like a refresher, we suggest you look at Appendix C and Example $$\PageIndex{1}$$ for more information. The second way we try to keep numbers simple is to use a consistent set of units—the metric International System of Units, or SI (from the French Système International d’Unités). The metric system is summarized in Appendix D (see Example $$\PageIndex{2}$$).

Watch this brief PBS animation that explains how scientific notation works and why it’s useful.

A common unit astronomers use to describe distances in the universe is a light-year, which is the distance light travels during one year. Because light always travels at the same speed, and because its speed turns out to be the fastest possible speed in the universe, it makes a good standard for keeping track of distances. You might be confused because a “light-year” seems to imply that we are measuring time, but this mix-up of time and distance is common in everyday life as well. For example, when your friend asks where the movie theater is located, you might say “about 20 minutes from downtown.”

So, how many kilometers are there in a light-year? Light travels at the amazing pace of $$3 × 10^5$$ kilometers per second (km/s), which makes a light-year $$9.46 × 10^{12}$$ kilometers. You might think that such a large unit would reach the nearest star easily, but the stars are far more remote than our imaginations might lead us to believe. Even the nearest star is 4.3 light-years away—more than 40 trillion kilometers. Other stars visible to the unaided eye are hundreds to thousands of light-years away (Figure $$\PageIndex{1}$$).

Example $$\PageIndex{1}$$: Scientific Notation

In 2015, the richest human being on our planet had a net worth of $79.2 billion. Some might say this is an astronomical sum of money. Express this amount in scientific notation. Solution$79.2 billion can be written \$79,200,000,000. Expressed in scientific notation it becomes $$\7.92 × 10^{10}$$.

Example $$\PageIndex{2}$$: Getting Familiar with a Light-Year

How many kilometers are there in a light-year?

Solution

Light travels $$3 \times 10^5 \text{ km}$$ in $$1\text{ s}$$. So, let’s calculate how far it goes in a year:

• There are $$60 (6 \times 10^1)\text{ s}$$ in $$1\text{ min}$$, and $$6 \times 10^1 \text{ min}$$ in $$1\text{ h}$$.
• Multiply these together and you find that there are $$3.6 \times 10^3\text{ s/h}$$.
• Thus, light covers $$3 \times 10^5\text{ km/s } \times 3.6 \times 103\text{ s/h } = 1.08 \times 109 \text{ km/h}$$.
• There are 24 or $$2.4 \times 10^1 \text{ h}$$ in a day, and $$365.25 (3.65 \times 10^2)\text{ days}$$ in $$1\text{ y}$$.
• The product of these two numbers is $$8.77 \times 10^3\text{ h/y}$$.
• Multiplying this by $$1.08 \times 10^9\text{ km/h}$$ gives $$9.46 \times 10^{12}\text{ km/light-year}$$.

That’s almost 10,000,000,000,000 km that light covers in a year. To help you imagine how long this distance is, we’ll mention that a string 1 light-year long could fit around the circumference of Earth 236 million times.