If (1+x)n=C0+C1x+C2x2+⋯+Cnxn, then C0−C0+C1+C0+C1+C2−C0+C1+C2+C3+⋯(−1)n−1C0+C1+⋯+Cn−1, where n is even integer is
a positive value
a negative value
divisible by 2n-1
divisible by 2n
For n = 2m, the given expression isC0−C0+C1+C0+C1+C2−C0+C1+C2+C3+…(−1)n−1C0+C1+…+Cn−1 =C0−C0+C1+C0+C1+C2−C0+C1+C2+C3+…−C0+C1+…+C2m−1 =−C1+C3+C5+…+C2m−1 =−C1+C3+C5+…+Cn−1=−2n−1