40% + 60% = 100% Right?

I heard there was a 40% chance of rain this morning and a 60% chance of rain this afternoon. Does this mean there is a 100% chance of rain some time today?

Assuming rain in the morning and rain in the afternoon are completely independent events* (they are not).

We calculate the probability of rain in the morning AND the afternoon to be 0.4 * 0.6 = 0.24 (or 24%).
We calculate the probability of rain in the morning AND no rain in the afternoon to be 0.4 * 0.4 = 0.16 (or 16%).
We calculate the probability of no rain in the morning AND rain in the afternoon to be 0.6 * 0.6 = 0.36 (or 36%)

Adding up all the probabilities of some combination of rain and not rain we get 24% + 16% + 36% = 76% chance of rain today.

Alternatively, it tends to be more commonly calculated as the (1 - probability of no rain**), which is 1.0 - 0.6 * 0.4 = 1.0 – 0.24 = 0.76 = 76% chance of rain.

* Independent events are events whose outcome (result) has no relationship to previous outcomes (results). For example, tossing a coin: whether the coin comes up heads or tails does not depend on what the coin came up before.

** the probability of no rain in the morning is 60% (or 0.6) and the probability of no rain in the afternoon is 40% (or 0.4) in case you were wondering where those number came from.

Bonus: 20+ years ago I discovered that weather forecasters calculate the probability of rain based on historical meteorological records. If they say there is a 40% chance of rain, what they are really saying is, "Based on our records of similar weather conditions, it rained 40% of the time". As far as I know, there is no magic formula they use, just a big database look up.

Image is nabbed from here.