Consider the inequation `x^(2) + x + a - 9 lt 0`
The values of the real parameter a so that the given inequaiton has at least one positive solution:

Consider the inequation x^(2) + x + a - 9 The values of the real parameter a so that the given inequaiton has at least one positive solution:

Consider the inequation x^(2) + x + a - 9 lt 0 The values of the real parameter a so that the given inequations has at least one negative solution.

Consider the inequation x^(2) + x + a - 9 lt 0 The values of the real parameter a so that the given inequations has at least one negative solution.

Consider the inequation x^(2) + x + a - 9 lt 0 The values of the real parameter a so that the given inequations has at least one negative solution.

Consider the inequation x^(2) + x + a - 9 lt 0 The value of the parameter a so that the given inequaiton is ture AA x in (-1,3)

Consider the inequation x^(2) + x + a - 9 lt 0 The value of the parameter a so that the given inequaiton is ture AA x in (-1,3)

Consider the inequation x^(2) + x + a - 9 lt 0 The value of the parameter a so that the given inequaiton is ture AA x in (-1,3)

Consider the inequation 9^(x) -a3^(x) - a+ 3 le 0 , where a is real parameter. The given inequality has at least one negative solution for a in (a) (-oo,2) (b) (3,oo) (c) (-2,oo) (d) (2,3)

Consider the inequation 9^(x) -a3^(x) - a+ 3 le 0 , where a is real parameter. The given inequality has at least one negative solution for a in (a) (-oo,2) (b) (3,oo) (c) (-2,oo) (d) (2,3)

Consider the inequation 9^(x) -a3^(x) - a+ 3 le 0 , where a is real parameter. The given inequality has at least one negative soluiton for a in