The correct option is D The sum of all mean's is 224.
Let A1, A2,…,Am be the m arithmetic means between 1 and 31, then
d=(b−a)(m+1)⇒d=30m+1
Now,
A7Am−1=a+7da+(m−1)d (∵An=a+nd)⇒59=1+210m+11+(m−1)×30m+1⇒m+21131m−29=59⇒9m+1899=155m−145⇒146m=2044∴m=2044146=14
Therefore, the sum of all mean's
=142[1+31]=14×16=224