Find the angle $ \beta $ of a rhombus if diagonal $d_1 = 5$ and diagonal $d_2 = 2$.
Answer
$\beta = 42.8436^o$
Explanation
STEP 1: find angle $ \alpha $
To find angle $ \alpha $ use formula:
$$ \sin \left( \frac{ \alpha }{ 2 } \right) = \dfrac{ d_2 }{ d_1 } $$After substituting $ d_2 = 2 $ and $ d_1 = 5 $ we have:
$$ \sin \left( \frac{ \alpha }{ 2 } \right) = \dfrac{ 2 }{ 5 } $$ $$ \sin \left( \frac{ \alpha }{ 2 } \right) = \frac{ 2 }{ 5 } $$ $$ \frac{ \alpha }{ 2 } = \arcsin\left( \frac{ 2 }{ 5 } \right) $$ $$ \frac{ \alpha }{ 2 } = 23.5782^o $$$$ \alpha = 23.5782^o \cdot 2 $$$$ \alpha = 47.1564^o $$STEP 2: find angle $ \beta $
To find angle $ \beta $ use formula:
$$ \alpha + \beta = 90^o $$After substituting $ \alpha = 47.1564^o $ we have:
$$ 47.1564^o + \beta = 90^o $$ $$ \beta = 90^o - 47.1564^o $$ $$ \beta = 42.8436^o $$This page was created using
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