It always depends on the nature of your data. If it is linearly separable then a linear kernel is more than enough.

If the data is non linear and locally encapsulated (in other words, if there exists an hyper sphere that would enclosure all the data - new points included), then a RBF kernel sounds like the proper kernel for the job.

If the data is non linear but it is not encapsulated ( so it might always be a new point far from your training set data) then you might want to try with a continuous kernel such as a polynomial one)

It is hard to deduce the nature of your data in high dimensional spaces, so most of the time the practical solution is try different scenarios and use crossvalidation to pick the proper kernel and parameters.

However, sometimes plotting different pairs of features helped me to have an idea about my data nature, but it is just a very rough indicator.