Question

let the boat have speed x and the river have speed y.

Since time = distance/speed,

30/(x-y) + 44/(x+y) = 10
40/(x-y) + 55/(x+y) = 13

Just looking at the equations, I expect we will find that (x+y) = 11 and (x-y) is a multiple of 5. Doing the actual solutions, we find that indeed,

x=8 and y=3

I expect you will check to be sure that those numbers fit the problem's conditions.

speed of boat --- x km/h
speed of current -- y km/h

case1: 30/(x-y) + 44/(x+y) = 10
times (x+y)(x-y) ....
30(x+y) + 44(x-y) = 10(x+y)(x-y)
30x + 30y + 44x - 44y = 10x^2 - 10y^2

10x^2 - 10y^2 = 74x - 14y ----> #1

case2: 40/(x-y) + 55(x + y) = 13
40(x+y) + 55(x-y) = 13(x+y)(x-y)
13x^2 - 13y^2 = 95x - 15y -----> #2

two hyperbolas !
messy to solve

with the help of Wolfram ....
http://www.wolframalpha.com/input/?i=solve+10x%5E2+-+10y%5E2+%3D+74x+-+14y+%2C+13x%5E2+-+13y%5E2+%3D+95x+-+15y+

(8,3) works in both

So the speed of the boat in still water is 8 km/h and the speed of the current is 3 km/h


<b>actual work:</b>
#1 times 13 --> 130x^2 - 130y^2 = 962x - 182y
#2 times 10 --> 130x^2 - 130y^2 = 950x - 150y

subtract them:
0 = 12x - 32y
12x = 32y
y = 3x/8

sub into the 1st
10x^2 - 10y^2 = 74x - 14y
10x^2 - 10(9x^2/64) = 74x - 14(3x/8)

times 64:
640x^2 - 90x^2 = 4736x - 336x
550x^2 - 4400x = 0
x^2 - 8x = 0
x(x-8) = 0
x = 0 or x = 8

if x = 0 , -----> y = 0, makes no sense

if x = 8, then y = 3

argggghhh!

go with Steve's method, I'm going back to bed