What are the lengths of sides a and b?

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asked Sep 8, 2022 77.7k views

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Jupiteror · Answer 1 · 2022-09-12T10:28:57+0000

Answer:

$a =(\sqrt 3)/(2)$ mi

b =(1)/(2) mi

Explanation:

Given

The attached triangle

Required

Find a and b

To do this, we make use of the following trigonometry ratio

$\sin(\theta) = (Opposite)/(Hypotenuse)$

So, we have:

$\sin(60) = (a)/(c)$

$\sin(30) = (b)/(c)$

Where

c = 1

So, we have:

$\sin(60) = (a)/(c) =(a)/(1)$

$\sin(60) = a$

$a = \sin(60)$

In radical form:

$\sin(60) = (\sqrt 3)/(2)$

Hence:

$a =(\sqrt 3)/(2)$

$\sin(30) = (b)/(c)$

$\sin(30) = (b)/(1)$

$\sin(30) = b$

Rewrite as:

$b =\sin(30)$

In radical form:

$\sin(30) = (1)/(2)$

Hence:

b =(1)/(2)

What are the lengths of sides a and b?

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What are the lengths of sides a and b?