If the equation `x^(2)+4+3sin(ax+b)-2x=0` has at least one real solution, where `a,b in [0,2pi]` then one possible value of `(a+b)` can be equal to

If the equation x^(2)+12+3sin(a+bx)+6x=0 has atleast one real solution, where a, b in [0,2pi] , then the value of a - 3b is (n in Z)

If a , b in [0,2pi] and the equation x^2+4+3sin(a x+b)-2x=0 has at least one solution, then the value of (a+b) can be (a) (7pi)/2 (b) (5pi)/2 (c) (9pi)/2 (d) none of these

If the equation cot^4x-2cos e c^2x+a^2=0 has at least one solution, then the sum of all possible integral values of a is equal to

x^2 + 4 + 3 cos(ax+b) = 2x has atleast on solution then the value of a+b is :

If a , b in [0,2pi] and the equation x^2+4+3sin(a x+b)-2x=0 has at least one solution, then the value of (a+b) can be (7pi)/2 (b) (5pi)/2 (c) (9pi)/2 (d) none of these

If a, b in (0, 2) and the equation (2x^2+5)/2 = x - 2cos(ax + b) has at least one solution then

If 4a+2b+c=0 , then the equation 3ax^(2)+2bx+c=0 has at least one real lying in the interval

If the equation cot^4x-2cos e c^2x+a^2=0 has at least one solution, then the sum of all possible integral values of a is equal to a. 4 b. 3 c. 2 d. 0

If the equation cot^4x-2cos e c^2x+a^2=0 has at least one solution, then the sum of all possible integral values of a is equal to a. 4 b. 3 c. 2 d. 0

0 le a le 3, 0 le b le 3 and the equation, x^(2)+4+3 cos ( ax+b) = 2x has atleast one solution, then find the value of (a+b) .