The coeficient of t^(4) in the expansion...

The coeficient of `t^(4)` in the expansion of `((1-t^(6))/(1-t))^(3)` is

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Clearly, `((1 - t^(6))/( 1 - t))^(2) = (1 - t^(6))^(3) (1 - t)^(-3)`
`:.` Coefficient of `t^(4)` in `(1 - t^(6))^(3) (1 - t)^(-3)`
= Coefficient of `t^(4)` in `(1 - t^(18)) - 3t^(6) + 3 t^(12)) (1 - t)^(-3)`
= Coefficient of `t^(4)` in `(1 - t)^(-3)`
`= .^(3 + 4 - 1)C_(4) = .^(6)C_(4) = 15`
(`:'` coefficient of `x^(r)` in `(1 - x)^(-n) = .^(n + r + 1)C_(r )`)

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The coeficient of `t^(4)` in the expansion of `((1-t^(6))/(1-t))^(3)` is

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