If a,b are the roots of `x^2 - 10cx-11d = 0` and c,d are roods of `x^2- 10ax - 11b = 0` then value of a+b+c+d is:

If a,b are the roots of x^(2)-10cx-11d=0 and c,a are roods of x^(2)-10ax-11b=0 then value of a+b+c+d is:

Let a, b, c, d be distinct real numbers such that a, b are roots of x^2-5cx-6d=0 and c, d are roots of x^2-5ax-6b=0 . Then b+d is

If a, b are the real roots of x^(2) + px + 1 = 0 and c, d are the real roots of x^(2) + qx + 1 = 0 , then (a-c)(b-c)(a+d)(b+d) is divisible by

If a, b are the real roots of x^(2) + px + 1 = 0 and c, d are the real roots of x^(2) + qx + 1 = 0 , then (a-c)(b-c)(a+d)(b+d) is divisible by

Let a and b be the roots of the equation x^(2)-10cx-11d=0 and those of x^(2)-10ax-11b=0 are c,d. then find the value of a+b+c+d. when a!=b!=c!=d

Let a and b are the roots of the equation x^2-10 xc -11d =0 and those of x^2-10 a x-11 b=0 ,dot are c and d then find the value of a+b+c+d

Let a and b be the roots of the equation x^2-10 c x-11 d=0 and those of x^2-10 a x-11 b=0 are c ,d then find the value of a+b+c+d when a!=b!=c!=d

Let aa n db be the roots of the equation x^2-10 c x-11 d=0 and those of x^2-10 a x-11 b=0a r ec ,d then find the value of a+b+c+d when a!=b!=c!=d