If `C_0/1+C_1/2+C_2/3=0` , where `C_0 C_1, C_2` are all real, the equation `C_2x^2+C_1x+C_0=0` has

If (C_(0))/(1)+(C_(1))/(2)+(C_(2))/(3)=0, where C_(0)C_(1),C_(2) are all real,the equation C_(2)x^(2)+C_(1)x+C_(0)=0 has

If b_1b_2=2(c_1+c_2) , then at least one the of the equations x^(2) +b_1x+c_1=0 and x^(2)+b_2x+c_2=0 has :

Find the value of C, if the equation x^2 - 2 (C+1) x+C^2 =0 has real and equal root

If (1+x)^n = C_0 + C_1x + C_2x^2 + ………. + C_n x^n , prove that : C_0 + 2C_1 + ….. + 2 ""^nC_n = 3^n

Let theta_(1), be the angle between two lines 2x+3y+c=0 and -x+5y+c,=0, and theta_(2) be the angle betweentwo lines 2x+3y+c=0 and -x+5y+c_(1)=0, where c_(1),c_(2),c_(3), are any real numbers: Statement-1: If c_(2) and c_(3), are proportional,then theta_(1)=theta_(2) Statement-2: theta_(1)=theta_(2) for all c_(2) and c_(3) .

If C_(0) , C_(1) , C_(2) ,…, C_(n) are coefficients in the binomial expansion of (1 + x)^(n) and n is even , then C_(0)^(2)-C_(1)^(2)+C_(2)^(2)+C_(3)^(2)+...+ (-1)^(n)C_(n)""^(2) is equal to .

If (1+x)^n = C_0 + C_1x + C_2x^2 + ………. + C_n x^n , prove that : C_0 + (C_1)/(2) + (C_2)/(3) + ……. + (C_n)/(n+1) = (2^(n+1) -1)/(n+1)

If C_(0), C_(1), C_(2), ..., C_(n) denote the binomial cefficients in the expansion of (1 + x )^(n) , then a C_(0) + (a + b) C_(1) + (a + 2b) C_(2) + ...+ (a + nb)C_(n) = .