If (1 + x)^n = C0 + C1x + C2 x^2 + Cnx^n...

If `(1 + x)^n = C_0 + C_1x + C_2 x^2 + C_nx^n` prove that `3C_0-8C_1 + 13C_2-18C_3 + ....upto (n + 1) terms =0`

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Show that 3C_0-8C_1 + 13C_2 - 18C_3 + ..... + (n+1)^(th) term = 0

If (1+x)^n=C_0+C_1x+C_2x^2+……..+C_nx^n in N prove that (a) 3 C_0- 8C_1+13C_2-18C_3+...."upto" (n+1) term=0 if n ge 2 (b ) 2C_0+2^2(C_1)/(2)+2^3(C_2)/(3)+2^4C_(3)/4+....+2^(n+1)(C_n)/(n+1)=(3^n+1-1)/(n+1) ( c) C_0^2+(C_1^2)/2+C_2^2/3+....+C_n^2/(n+1)=((2n+1)!)/(((n+1)!)^2)

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If (1+x)^n =C_0+C_1 x+ C_2 x^2 +....... C_nx^n prove that : C_0+ 2C_1 +.........+2""^nC_n=3^n .

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If `(1 + x)^n = C_0 + C_1x + C_2 x^2 + C_nx^n` prove that `3C_0-8C_1 + 13C_2-18C_3 + ....upto (n + 1) terms =0`

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