9. (a) Express 2 sin θ - 4 cos θ in the form R sin(θ - α), where R and α are constants, R > 0 and 0 < α < π/2 - Edexcel - A-Level Maths Pure - Question 2 - 2014 - Paper 6

To find the maximum value of H(θ), we first need to simplify the given equation:

$H(θ) = 4 + 5(2 ext{sin}(3θ) - 4 ext{cos}(3θ))^2$

The expression $(2 ext{sin}(3θ) - 4 ext{cos}(3θ))$ attains its maximum value when:

$2 ext{sin}(3θ) - 4 ext{cos}(3θ) = R ext{sin}(3θ - α'),$

where $R$ can be calculated as:

oot{(2^2) + (-4)^2} = oot{20}.$$ The maximum value is therefore: $$ ext{max}(H(θ)) = 4 + 5(R)^2 = 4 + 5 imes 20 = 104.$$

Using the earlier expression for $2 ext{sin}(3θ) - 4 ext{cos}(3θ)$, we need to solve:

$2 ext{sin}(3θ) - 4 ext{cos}(3θ) = R$

This occurs when:

an(3θ) = rac{4}{2} = 2.

Thus:

$3θ = an^{-1}(2) + n ext{π}, ext{ where } n ext{ is an integer}.$

This gives:

θ = rac{1}{3}( an^{-1}(2) + n ext{π}).

For $0 ≤ θ < π$, the smallest value occurs at $n = 0,$ hence:

θ = rac{1}{3} an^{-1}(2) ≈ 0.89.

The minimum value of H(θ) will occur when $2 ext{sin}(3θ) - 4 ext{cos}(3θ)$ is at its minimum. Since $-R$ will provide this minimum, we calculate:

$H(θ)_{ ext{min}} = 4 + 5(-R)^2 = 4 + 5(20) = 4.$

Using the minimum condition:

$2 ext{sin}(3θ) - 4 ext{cos}(3θ) = -R,$

We have:

an(3θ) = rac{-4}{2} = -2.

Solving yields:

$3θ = an^{-1}(-2) + n ext{π}.$

This again leads to:

θ = rac{1}{3}( an^{-1}(-2) + n ext{π}).

The largest value of θ occurs when $n = 1: $$θ = rac{1}{3}( an^{-1}(-2) + π) = rac{π + 3θ}{3}.$$$