Given: 3,a,b,c are in A.P
So, the common difference will be d=a−3
Now, b=2a−3 and c=3a−6
Also, 3,a−1,b+1,c+9 are in G.P
So, 3(c+9)=(b+1)(a−1)
⇒3(3a−6+9)=(2a−3+1)(a−1)
⇒3(3a+3)=(2a−2)(a−1)
⇒9a+9=2a2−4a+2
⇒2a2−13a−7=0
⇒a=7,2−1rejected
So, b=2\times 7-3=11&c=3\times 7-6=15
Now, the A.M of a,b,c is given by,
⇒A=3a+b+c
⇒A=37+11+15
⇒A=333
⇒A=11