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Quick question (1 Viewer)

InteGrand

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Hey, what's x?

the diagram is not to scale therefore impossibru to tell

trick question nice one m8
The question definitely has an answer. The triangle ABC is a unique one in shape, since we know all its angles (it's an isosceles triangle with base angle 80°), and there is only one point E on BC such that ∠BAE = 70°, so point E is fixed with respect to ΔABC. Also, point D is fixed, as there is only one point on AC such that ∠ABD = 60°. Therefore, ∠AED is fixed, i.e. a single value for x exists. We find this value below.

Without loss of generality, let AB = 1. Using the fact that the angle sum of a triangle is 180°, we note that ∠AEB = 30° (from ΔAEB), ∠ADB = 40° (from ΔABD) and hence ∠BDE = 130° – x (from ΔBDE).

By the sine rule in ΔBDE,



, since sin(130° – x) = sin[180° – (130° – x)] = sin(50° + x).

.

By the sine rule in ΔABD,





(by the double angle formula for sine).


By the sine rule in ΔBEA,



(as AB = 1 and cosec 30° = 2)

Substituting the values for BD and BE into Equation (*),





, as cos 40° = sin(90° – 40°) = sin 50°
i.e. .

It is clear that the LHS above becomes the RHS when x = 20°. If x = 20° is the only possible solution given the circumstances, the answer is x = 20°. We show that this is indeed the case.

Firstly, note that 0° < x < 70°. To see this, let D′ be the point on CB such that .

Then by alternate angles in parallel lines DD′ and AB, ∠DDB = ∠ABD = 60°. Then by angle sum of ΔBDE, we have

(x + 30°) + 20° + (60° + ∠EDD′) = 180° (as ∠BDE = 60° + ∠EDD′)
x + ∠EDD′ = 70°
⇒ 0° < x < 70°.

Now, consider . The function is defined for all θ in the given domain.

Also,







.

Therefore, f(θ) is an increasing function (and hence one-to-one) for all θ in the given domain, so there can only be one solution to Equation (*), as 0° < x < 70°. As x = 20° is a solution, it is the only solution, and hence the answer to the original problem.
 
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