Applications of Derivatives - Optimization Problems
Maths Higher · Grade 12 · Week 18 · 25 questions
All 25 questions in this Applications of Derivatives - Optimization Problems quiz
Grade 12 Maths Higher — Applications of Derivatives - Optimization Problems: 25 practice questions with instant scoring and explanations.
- Optimization problems involve finding:
- To maximize/minimize a quantity, we:
- For a rectangular box with fixed volume V, surface area is minimum when:
- To find dimensions for minimum surface area of cylinder with fixed volume V:
- A rectangular field has fixed perimeter P. For maximum area:
- For optimal production cost C = f(x) where x is quantity, optimal x satisfies:
- The revenue R = p·q where p is price and q is quantity. Maximum revenue occurs when:
- For profit P = R - C, where R is revenue and C is cost, optimal production is where:
- A window shape: Rectangle + Semicircle on top. For fixed perimeter, maximum area occurs when:
- The method of Lagrange multipliers is used for:
- For Lagrange multipliers: ∇f = λ∇g means:
- A farmer has 100m fencing. For maximum rectangular area, length and width are:
- To minimize distance from point to curve, the connecting line is:
- For a function y = f(x), the least value on [a,b] is found by comparing:
- Marginal cost is the derivative of:
- Marginal revenue equals marginal cost when:
- For an open box with fixed total surface area, maximum volume occurs when:
- Newton's method for finding roots uses:
- For a projectile, maximum height occurs when:
- In economics, elasticity of demand E = (dQ/dP)·(P/Q) measures:
- For a given amount of fence forming a rectangle, the maximum area is achieved when:
- The envelope of a family of curves y = f(x,c) is found by eliminating c from:
- For optimization with constraints, checking boundary is:
- The envelope theorem in economics relates to:
- Review question for Applications of Derivatives - Optimization Problems
Question 1 of 250 correct so far