sat suite question viewer
In the given equation, is a positive integer. The equation has no real solution. What is the greatest possible value of ?
Explanation
The correct answer is . A quadratic equation of the form , where , , and are constants, has no real solution if and only if its discriminant, , is negative. In the given equation, and . Substituting for and for in this expression yields a discriminant of , or . Since this value must be negative, , or . Taking the positive square root of each side of this inequality yields . Since is a positive integer, and the greatest integer less than is , the greatest possible value of is .