Question Bank
Search, filter, and preview SAT practice questions.
Domain: advanced_math
| ID | Section | Domain | Skill | Difficulty | Question | Actions |
|---|---|---|---|---|---|---|
| math_adv_4697 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(f\) and \(y\) are constants, where \(y > 6f\). The sum of the solutions to the equation \((x-y)^2=(...\) | |
| math_adv_4696 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(z\) and \(u\) are constants, where \(u > 5z\). The sum of the solutions to the equation \((x-u)^2=(...\) | |
| math_adv_4695 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(g\) and \(v\) are constants, where \(v > 2g\). The sum of the solutions to the equation \((x-v)^2=(...\) | |
| math_adv_4694 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(w\) and \(j\) are constants, where \(j > 9w\). The sum of the solutions to the equation \((x-j)^2=(...\) | |
| math_adv_4693 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(h\) and \(t\) are constants, where \(t > 7h\). The sum of the solutions to the equation \((x-t)^2=(...\) | |
| math_adv_4692 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(n\) and \(s\) are constants, where \(s > 4n\). The sum of the solutions to the equation \((x-s)^2=(...\) | |
| math_adv_4691 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(d\) and \(q\) are constants, where \(q > 8d\). The sum of the solutions to the equation \((x-q)^2=(...\) | |
| math_adv_4690 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(a\) and \(r\) are constants, where \(r > 3a\). The sum of the solutions to the equation \((x-r)^2=(...\) | |
| math_adv_4689 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(c\) and \(p\) are constants, where \(p > 6c\). The sum of the solutions to the equation \((x-p)^2=(...\) | |
| math_adv_4688 | Math | advanced_math | nonlinear_equations | Hard | In the given equation, \(b\) and \(m\) are constants, where \(m > 5b\). The sum of the solutions to the equation \((x-m)^2=(...\) |