The correct option is C HP
The best way is to assume some HP and then solve it.
Let a, b, c be 10, 12, 15 respectively, which are in HP.
Then, ab+c=1012+15=1027=0.370
bc+a=1210+15=1225=0.480
ca+b=1510+12=1522=0.681
Check for AP, GP and HP.
We find that the numbers are in HP.
Conventional Approach:
a, b, c are in H.P. so, 1a,1b and 1c will be in A.P.
or, a+b+ca,a+b+cb and a+b+cc will be in A.P.
or, 1+b+ca,1+a+cb and 1+a+bc will be in A.P.
Hence b+ca,a+cb and a+bc are in A.P.
So, ab+c,bc+a and ca+b will be in H.P.
Let us take 1,12,13 (which are in H.P.)
ab+c=65,ba+c=38,ca+b=29
Now, when we check these values of A.P, G.P. and H.P. we find that 83 is the AM of 56 and 92