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Domain: advanced_math
| ID | Section | Domain | Skill | Difficulty | Question | Actions |
|---|---|---|---|---|---|---|
| math_adv_623 | Math | advanced_math | nonlinear_functions | Hard | For the function \(D\), \(D(0) = 80\), and every time \(x\) increases by \(1\), the value of \(D(x)\) decreases by \(65\%\). What... | |
| math_adv_622 | Math | advanced_math | nonlinear_functions | Hard | For the function \(C\), \(C(0) = 36\), and every time \(x\) increases by \(1\), the value of \(C(x)\) decreases by \(25\%\). What... | |
| math_adv_621 | Math | advanced_math | nonlinear_functions | Hard | For the function \(B\), \(B(0) = 500\), and every time \(x\) increases by \(1\), the value of \(B(x)\) decreases by \(90\%\). Wha... | |
| math_adv_620 | Math | advanced_math | nonlinear_functions | Hard | For the function \(A\), \(A(0) = 90\), and every time \(x\) increases by \(1\), the value of \(A(x)\) decreases by \(40\%\). What... | |
| math_adv_619 | Math | advanced_math | nonlinear_functions | Hard | For the function \(w\), \(w(0) = 64\), and every time \(x\) increases by \(1\), the value of \(w(x)\) decreases by \(50\%\). What... | |
| math_adv_618 | Math | advanced_math | nonlinear_functions | Hard | For the function \(v\), \(v(0) = 50\), and every time \(x\) increases by \(1\), the value of \(v(x)\) decreases by \(10\%\). What... | |
| math_adv_617 | Math | advanced_math | nonlinear_functions | Hard | For the function \(r\), \(r(0) = 160\), and every time \(x\) increases by \(1\), the value of \(r(x)\) decreases by \(75\%\). Wha... | |
| math_adv_616 | Math | advanced_math | nonlinear_functions | Hard | For the function \(q\), \(q(0) = 75\), and every time \(x\) increases by \(1\), the value of \(q(x)\) decreases by \(20\%\). What... | |
| math_adv_615 | Math | advanced_math | nonlinear_functions | Hard | For the function \(p\), \(p(0) = 200\), and every time \(x\) increases by \(1\), the value of \(p(x)\) decreases by \(30\%\). Wha... | |
| math_adv_614 | Math | advanced_math | nonlinear_functions | Hard | For the function \(h\), \(h(0) = 125\), and every time \(x\) increases by \(1\), the value of \(h(x)\) decreases by \(60\%\). Wha... |