大象传媒

How have our ideas about atoms changed over time? - OCR 21st CenturyParticle size and scale

The atomic model consists of a nucleus containing protons and neutrons, surrounded by electrons in shells. The numbers of particles in an atom can be calculated from its atomic number and mass number.

Part of Combined ScienceChemical patterns

Particle size and scale

To find out how much bigger one object is than another, divide the larger value by the smaller.

Example:

Two cakes, one with a 40 cm diameter, one with a 20 cm diameter.

Larger value 梅 smaller value

= 40 梅 20

= 2

Comparing sizes using order of magnitude

If one number is 10 times bigger than another number, their sizes differ by one order of magnitude. If a number is 100 times bigger than another number, their sizes differ by two .

Example

are very small, approximately 1 x 10 -10. metres in diameter. This means that you need to line up 10 million atoms side by side to make a line which is 1 millimetre long.

Molecules are made from between 2 and several hundred atoms, so they are larger than the atoms which they are made from. However, molecules are still far too small to be seen with the naked eye.

The diameter of the nucleus of an atom is tiny in comparison with the diameter of the whole atom. Let us assume that a specific atom has a diameter of 1 x 10-10 metres and that its nucleus has a diameter of 1 x10-14 metres.

Compare the size of the nucleus with the size of the atom.

\(\frac{larger~value}{smaller~value} = \frac{1 \times 10^{-10}}{1 \times 10^{-14}} = 10,000\)

So the atom is 10,000 times larger than the nucleus. Another way of describing this fact is to say that the nucleus is 1/10,000 of the size of the atom.

Expressing this in orders of magnitude, we say that the diameter of the atom is four orders of magnitude greater than the diameter of the nucleus. This is because 10,000 is equal to 104.

Comparing the size and scale of atoms to the real world

Because atoms are so small, it can be difficult to understand their scale. Let鈥檚 compare an atom to a large sports stadium, which has a diameter of 300 metres.

\(\frac{300}{10,000} = 0.03 metres\)

To covert this into centimetres, multiply by 100.

0.03 x 100 = 3 centimetres.

This means that if we imagine an atom as large as a big sports stadium, the nucleus would be approximately the same size as a large marble.

Example

The diameter of a is about 2 脳 10-15 m and the diameter of an atom is 1 脳 10-10 m. What size would the atom be in a model where the Earth represented the nucleus? The diameter of the Earth is 1.3 脳 107 m.

\(\frac{larger~value}{smaller~value} = \frac{1 \times 10^{-10}}{2 \times 10^{-15}} = 5 \times 10^4\)

Therefore the atom is 5 脳 104 larger than the nucleus. The model of the atom must be 5 脳 104 times larger than this.

diameter of the model atom

= (diameter of the Earth) 脳 5 脳 104

= 6.5 脳 1011 m

Question

If the Earth represented an atom, what size would the nucleus be? Assume that the diameter of an atom is 5 脳 104 greater than the diameter of the nucleus.