Let |x^2-5x+6|lt=x+a ; ainR 1) If a=0, ...

Let `|x^2-5x+6|lt=x+a` ; a`in`R 1) If a=0, let the exhaustive solution set of the above is x`in`[p,q], then the value of product (pq)is 2) The product of the non-zero integral value(s) of `a` for which the inequation has exactly 3 integral solution is

Similar Questions

Explore conceptually related problems

The number of integral values of k for which the equation |x^(2)-5|x|+6|=k has four solution is

The sum of all possible integral value of 'k' for which 5x ^(2) -2k x +1lt 0 has exactly one integral solution :

The number of integral values of n such that the equation 2n{x}=3x+2[x]has exactly 5 solutions.

An integral value of p for which every solution of the inequality x^(2)-4x+3 =0 is

Find the non-zero integral solutions of |1-i|^x=2^x .

Let f : R to R be defined by f(x) = |2-x| - |x+1| The number of integral values of a for which f(x) =a has exactly one solution is:

Find the number of integral values of 'a' for which ax^(2)-(3a+2)x+2(a+1)<0,a!=0 holds exactly four integral value of x.

Find the number of integral values of x satisfying the inequality, x^2-5x-6<0 .

The possible positive integral value of 'k' for which 5x ^(2) -2k x +1lt 0 has exactly one integral solution may be divisible by :

The set of values of 'a' for which ax^(2)-(4-2a)x-8lt0 for exactly three integral values of x, is