This might give you something to play with, using some of Tyler's suggestions.
> claim <- c(15000000, rexp(99999, rate = 1/400)^1.76)
Min. 1st Qu. Median Mean 3rd Qu. Max.
0 4261 20080 61730 67790 15000000
> hs <- 100000 # highest value to show on histogram
> br <- 10 # number of bars to show on histogram
> hist(claim, xlim = c(0,hs), freq = FALSE, breaks = br*max(claim)/hs, col='red')
> length(claim[claim<hs]) / length(claim) #proportion of claims shown
> sum(claim[claim<hs]) / sum(claim) #proportion of value shown
hist produced something like
The problem with this is that although the histogram coves about 82% of the claims in this pseudo-data, it only covers about 31% of the value of the claims. So unless the only point you want to make is that most claims are small, you might want to consider a different graph.
My guess is that the real point from your data is that while most claims are fairly small, most of the cost is in the big claims. The big claims will not show up in a histogram, even if you extend the scale. Instead break the claims up into groups of differing widths, including for example 0-$1000 and $1M+, and show with a dot plot (a) what proportion of claims fall into each group and (b) what proportion of the values of claims fall into each group.