[" 19.If "n>0" and exactly "15" integers satisfy "(x+6)(x-4)(x-5)],[(2x-n)<=0," then sum of digits of the least possible value "],[" of "n" is "]

If n gt 0 and exactly 15 integers satisfying (x+6)(x-4 ) (x-5) (2x-n) le 0 then least possible value of n is

If n gt 0 and exactly 15 integers satisfying (x+6)(x-4 ) (x-5) (2x-n) le 0 then least possible value of n is

If n gt 0 and exactly 15 integers satisfying (x+6)(x-4 ) (x-5) (2x-n) le 0 then sum of digits of the least possible value of n is

If n gt 0 and exactly 15 integers satisfying (x+6)(x-4 ) (x-5) (2x-n) le 0 then sum of digits of the least possible value of n is

Let 'a' be an integer. If there are 10 inegers satisfying the ((x-a)^(2)(x-2a))/((x-3a)(x-4a))le0 then

Let 'a' be an integer. If there are 10 inegers satisfying the ((x-a)^(2)(x-2a))/((x-3a)(x-4a))le0 then

The number of integers satisfying (log_((1)/(5))(4x+6))/(x)>=0

let a>2,a in N be a constant.If there are just 18 positive integers satisfying the inequality (x-a)(x-2a)(x-a^(2))<0 then which of the option is correct

If m, n and p are arbitrary integers, show that the equation x^(3m)+x^(3n+1)+x^(3p+2)=0 is satisfied by the roots of the equations x^(2)+x+1=0