Harder 3U question (1 Viewer)

cutemouse · Aug 8, 2009

1. If $(2-\sqrt{3})^n = a_n - b_n \sqrt{3}$ for all positive integers n, where $a_n \ and \ b_n$ and integers, show that

(i) $a_{n+1} = 2a_n + 3b_n \ and \ b_{n+1} = a_n + 2b_n$

(ii) Calculate $a_n^2 + 3b_n$ for n=1, 2 and 3.

(iii) Guess a formula for $a_n^2-3b_n^2$ and prove your guess is true for all positive integers n.

2. Show that $(cos\theta+isin\theta)^5 = \sum_{r=0}^5 \ ^5C_rcos^{5-r}\theta \ sin^r \theta$

3. The angles of elevation of the top of a tower P measured from three points A, B, and C are $\alpha , \ \beta \ and \ \gamma$ respecitvely.

A, B and C are in a straight line such that AB = BC = a, but the line AC does not pass through S, the base of the tower.

(i) If $\angle ABS = \theta$ show that:

$CS^2=a^2+h^2cot^2\beta+2ahcot\betacos\theta$

(ii) prove that the height of the tower is:

$\frac{a \sqrt{2}}{(cot^2\alpha+cot^2\gamma-2cot^2\beta)^{1/2}}$

4. If a>0, b>0 and c>0 show that:

$\frac{a+b+c}{3} \ge (abc)^{1/3}$

untouchablecuz · Aug 8, 2009

just for you, ill do the others l8r

EDIT: overcomplicated ii) wayyyyyyyyyy too much

you don't have to use the proven relations, and i think my a1 and a2's etc are incorrect

just use the given relation, letting n=1,2,3 and finding a1 and b1 etc etc by comparing co-efficients, then finding a^2 +3b

untouchablecuz · Aug 9, 2009

trigg

Harder 3U question (1 Viewer)

cutemouse

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untouchablecuz

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untouchablecuz

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