Using the property nCr=nCn−r, the given expression can be written as:
30Cr+3⋅30Cr−1+3⋅30Cr−2+30Cr−3
This expression represents the coefficient of xr in the expansion of:
(1+x)30+3x(1+x)30+3x2(1+x)30+x3(1+x)30
Taking (1+x)30 common, we get:
(1+x)30(1+3x+3x2+x3)
=(1+x)30(1+x)3
=(1+x)33
The coefficient of xr in (1+x)33 is 33Cr.
Comparing this with mCr, we get m=33.
Answer: 33