The concept of convergence is a topic more suited to a discussion of calculus if you want a fairly rigorous explanation.
But what it basically means is that, given a function that depends on one or more independent variables, the value of the function will "converge" or approach a finite value as the independent variable(s) approaches their own finite values.
Divergence means the opposite. If there is no finite or fixed value that a function appears to be approaching, then it does not converge, and is thus said to diverge.
Some examples: As [tex]x[/tex] gets arbitrarily large, the function
[tex]f(x)=\dfrac1x[/tex]
will approach 0. You can see why this must be the case by checking what happens to the value of [tex]\dfrac1x[/tex] when [tex]x[/tex] is picked to be 10, or 1000, or 1000000000, and so on. Clearly, [tex]\dfrac1x[/tex] must be positive, but the large the denominator, the smaller the value of [tex]\dfrac1x[/tex]. It will never actually take on the value of 0, but we can see that it must *converge to* 0.
On the other hand, the function
[tex]f(x)=\sin x[/tex]
will oscillate indefinitely between the values of -1 and 1, so this function is said to not converge to any specific value as [tex]x[/tex] increases indefinitely, which means [tex]\sin x[/tex] diverges.
