In a n- sided regular polygon, the prob...

In a `n-` sided regular polygon, the probability that the two diagonal chosen at random will intersect inside the polygon is a.`(2^n C_2)/(^(^(n C_(2-n)))C_2)` b. `("^(n(n-1))C_2)/(^(^(n C_(2-n)))C_2)` c. `(^n C_4)/(^(^(n C_(2-n)))C_2)` d. none of these

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In a n- sided regular polygon, the probability that the two diagonal chosen at random will intersect inside the polygon is (2^n C_2)/(^(^(n C_(2-n)))C_2) b. (^(n(n-1))C_2)/(^(^(n C_(2-n)))C_2) c. (^n C_4)/(^(^(n C_(2-n)))C_2) d. none of these

""^(2n)C_(n+1)+2. ""^(2n)C_(n) + ""^(2n) C_(n-1) =

(.^(n)C_(0))^(2)+(.^(n)C_(1))^(2)+(.^(n)C_(2))^(2)+ . . .+(.^(n)C_(n))^(2) equals

Prove that (^(2n)C_0)^2+(^(2n)C_1)^2+(^(2n)C_2)^2-+(^(2n)C_(2n))^2-(-1)^n^(2n)C_ndot

Prove that (^(2n)C_0)^2-(^(2n)C_1)^2+(^(2n)C_2)^2-+(^(2n)C_(2n))^2-(-1)^n^(2n)C_ndot

Evaluate .^(n)C_(0).^(n)C_(2)+.^(n)C_(1).^(n)C_(3)+.^(n)C_(2).^(n)C_(4)+"...."+.^(n)C_(n-2).^(n)C_(n) .

Prove that (.^(2n)C_0)^2-(.^(2n)C_1)^2+(.^(2n)C_2)^2-..+(.^(2n)C_(2n))^2 = (-1)^n.^(2n)C_n .

In a `n-` sided regular polygon, the probability that the two diagonal chosen at random will intersect inside the polygon is a.`(2^n C_2)/(^(^(n C_(2-n)))C_2)` b. `("^(n(n-1))C_2)/(^(^(n C_(2-n)))C_2)` c. `(^n C_4)/(^(^(n C_(2-n)))C_2)` d. none of these

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