Ok, here is my next attempt.
1. First we have to figure out how many combinations of two apples can be picked (regardless of whether its red or not). NOTE: There is no "first pick" or "second pick", he picks out two apples at random so they are presumably at the same time..
So he can pick 7 different apples in one hand, leaving 6 possible apples for his other hand meaning there are 7x6= 42 different combinations.
2. However, let the apples be
r1
r2
r3
r4
g1
g2
g3
Now if he picks r1g1 and g1r1 they are the same combination of two apples, its a repitition
so counting the repetitions you should get 8.
meaning you have 42-8= 34 combinations
3. Now for the combinations where both apples are red, given it is known that at least one is red
there are 4 red apples and one of them is defintely picked, that leaves 6 other apples, including
so the probability that he picks at least one red apple is 4x6=24
4. Of the second apple, 3 of the 6 remaining apples are red ie. 1/2. Therefore the combinations of two red apples are 24x(1/2)= 12
5. Therefore probability equals valid combinations/total combinations- 12/34= 6/17
