2) Zero of the polynomial p(x)=cx+d is
(a) -d
-c
(c) `d/c`
(d) `-d/c`

Find the zeroes of the polynomial p(x)=cx+d and p(x)=2x+5

If alpha,beta,gamma are the zeros of the polynomial f(x)=ax^(3)+bx^(2)+cx+d, then (1)/(alpha)+(1)/(beta)+(1)/(gamma)=( a) (b)/(d)(b)(c)/(d)(c)(c)/(d)(d)(c)/(a)

If two of the zeros of the cubic polynomial ax^(3)+bx^(2)+cx+d are each equal to zero, then the third zero is (a) (d)/(a) (b) (c)/(a)( c) (b)/(a) (d) (b)/(a)

If alpha,beta are the zeros of polynomial f(x)=x^(2)-p(x+1)-c, then (alpha+1)(beta+1)=(a)c-1(b)1-c(c)c(d)1+c

if x^(2)+x+1 is a factor of ax^(3)+bx^(2)+cx+d then the real root of ax^(3)+bx^(2)+cx+d=0 is : (a) -(d)/(a)(B)(d)/(a) (C) (a)/(b) (D)none of these

During the transformation of ._(c )X^(a) to ._(d)Y^(b) the number of beta -particles emitted are a. d + ((a - b)/(2)) - c b. (a - b)/(c ) c. d + ((a - b)/(2)) + c d. 2c - d + a = b

Let alpha , beta , gamma are the roots of f(x)=ax^(3)+bx^(2)+cx+d=0 . Then the condition for the product of two of the roots is -1 is (A) c(a+c)+b(b+d)=0 (B) a(a+c)+d(b+d)=0 (C) c(a-c)+b(b-d)=0 (D) a(a-c)+d(b-d)=0

If a