# How can I solve this limit? (1) lim x---->infinity (sin x) / x (2) lim x---->infinity ( cos x)/x

##### 2 Answers

Undefined.

#### Explanation:

Both of these limits are undefined as they alternate from -1, 1 on the top and are unable to converge at

Both limits tend to zero.

#### Explanation:

Both limits are solved in the same way, so I'll explain the general concept with the first one. Everything will work in the exact same way in the second case.

Studying a limit means to understand the behaviour of a function as the input approaches some quantity - in this case, we're asking what happens to the function as the input

Since the function is a ratio, let's see what happens to the numerator and denominator. The numerator is the sine function, which waves between

On the other hand, the denominator is

So, as long as

This means that we are dividing a quantity that will never exceed one (in absolute value) by a quantity that grows larger and larger. The metaphore of the cake and slices may work fine here: assume you have a cake, and you have to cut it into more and more slice. The greater the number of slice, the smaller each slice will be, wouldn't it?

So, as the numer of slice grows to infinity, there will be almost zero cake in each slice!

To solve this more precisely, we may write

and since