Media Summary: (a) Proving a trig identity by using De Moivre's Theorem (b) An arithmetic sequence involving logs and trig (c) A gargantuan trig ... (a) Finding the centre of gravity a road with varying density (b)(1) Finding the maximum value of a function formed by a family of ... (a) A sneaky integration by parts problem (b) Solving a non-separable differential equation with the use a few hints.
Scholarship Calculus 2015 Q3 - Detailed Analysis & Overview
(a) Proving a trig identity by using De Moivre's Theorem (b) An arithmetic sequence involving logs and trig (c) A gargantuan trig ... (a) Finding the centre of gravity a road with varying density (b)(1) Finding the maximum value of a function formed by a family of ... (a) A sneaky integration by parts problem (b) Solving a non-separable differential equation with the use a few hints. (a) A cubic polynomial with complex coefficients and one real solution (b)(i) A geometric proof involving a focal chord and a circle ... (a) Finding the equation of a general normal (b) Finding the equation of the normal that leads to the lowest point of intersection (c) ... Implicit differentiation and integration by parts.
(a) A system of equations involving logs and exponents (b) The car and statue problem (a tangent question) (c) The spread of a ... Want to do some practice questions now? Visit to access a bank of questions. You can also access ... (a) Differentiating y=x^x^x using logs (b) Finding a pattern for an nth derivative and linear combinations of trig functions (c) ...
