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Domain: advanced_math
| ID | Section | Domain | Skill | Difficulty | Question | Actions |
|---|---|---|---|---|---|---|
| math_adv_473 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 9\) intersects the parabola \(y = -4x^2 + bx\) at exactly one point. If \(b\) ... | |
| math_adv_472 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 6\) intersects the parabola \(y = -6x^2 + bx\) at exactly one point. If \(b\) ... | |
| math_adv_471 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 3\) intersects the parabola \(y = -3x^2 + bx\) at exactly one point. If \(b\) ... | |
| math_adv_470 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 16\) intersects the parabola \(y = -1x^2 + bx\) at exactly one point. If \(b\)... | |
| math_adv_469 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 18\) intersects the parabola \(y = -2x^2 + bx\) at exactly one point. If \(b\)... | |
| math_adv_468 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 5\) intersects the parabola \(y = -5x^2 + bx\) at exactly one point. If \(b\) ... | |
| math_adv_467 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 4\) intersects the parabola \(y = -4x^2 + bx\) at exactly one point. If \(b\) ... | |
| math_adv_466 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 12\) intersects the parabola \(y = -3x^2 + bx\) at exactly one point. If \(b\)... | |
| math_adv_465 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 8\) intersects the parabola \(y = -2x^2 + bx\) at exactly one point. If \(b\) ... | |
| math_adv_464 | Math | advanced_math | nonlinear_equations_in_one_variable_and_systems_of_equations_in_two_variables | Hard | In the \(xy\)-plane, the horizontal line \(y = 9\) intersects the parabola \(y = -1x^2 + bx\) at exactly one point. If \(b\) ... |