Suppose `x^(2)+bx+c`{b is an odd integer and ` c in Z`} has two prime natural numbers as its roots . Then `|2b+c|=`

Let f (x) =x ^(2)-bx+c,b is an odd positive integer. Given that f (x)=0 has two prime numbers an roots and b+c =35. If the least value of f (x) AA x in R is lamda, then |(lamda)/(3)| is equal to (where [.] denotes greatest integer functio)

Let f(x)=x^2-bx+c,b is an odd positive integer. Given that f(x)=0 has two prime numbers as roots and b+c=35. If the least value of f(x) AA x in R" is "lambda," then "[|lambda/3|] is equal to (where [.] denotes greatest integer function)

A quadratic equation with integral coefficients has two different prime numbers as its roots. If the sum of the coefficients of the equation is prime, then the sum of the roots is a. 2 b. 5 c. 7 d. 11

If x^(2)+bx+x=0 has no real roots and a+b+c lt 0 then

Consider the equation x^3-3x^2+2x=0, then (a)Number of even integers satisfying the equation is 2 (b)Number of odd integers satisfying the equation is 1 (c)Number of odd prime natural satisfying the equation is 1 (d)Number of composite natural numbers satisfying the equation is 1

If a,b,c are odd integere then about that ax^2+bx+c=0 , does not have rational roots

If ax^(2)+bx+c = 0 has no real roots and a, b, c in R such that a + c gt 0 , then

If A= {x : x is a natural number}, B = {x : x is an even natural number}C = {x : x is an odd natural number} and D = {x : x is a prime number }, find(i) A nnB (ii) A nnC (iii) A nnD (iv) B nnC (v) B nnD (vi) C nnD

If b and c are odd integers, then the equation x^2 + bx + c = 0 has-

If a, b, c are odd integers, then the roots of ax^(2)+bx+c=0 , if real, cannot be