Prove that : If the coefficients of `(2r+4)^("th")` and `(r-2)^("nd")` terms in the expansion of `(1+x)^(18)` are equal, find r.

If the coefficients of (2r+4)^("th") term and (3r+4)^("th") term in the expansion of (1+x)^(21) are equal, find r.

If the coefficient of (3r)^(th) and (r + 2)^(th) terms in the expansion of (1 + x)^(2n) are equal then n =

If the coefficients of (2r +1) ""^(th) term and (r+1 )^(th) term in the expansion of (1 + x) ^(42) are equal then r can be

If the coefficients of (2alpha + 4)th and (alpha-2)th terms in the expansion (1 + x)^(2019) are equal, then alpha=

If the coefficients of r^("th"),(r+1)^("th") and (r+2)^("nd") terms in the expansion of (1+x)^(n) are in A.P. then show that n^(2)-(4r+1)n+4r^(2)-2=0.

If the coefficients of (2r+1)th term and (4r+5)th term in the expansion of (1+x)^10 are equal then r=