STEP 1: find diagonal $ d1 $
To find diagonal $ d1 $ use formula:
$$ d_1^2 + d_2^2 = 4 \cdot a^2 $$After substituting $ d_2 = 7 $ and $ a = 7 $ we have:
$$ d_1 ^ {\,2} + 7^2 = 4 \cdot 7^2 $$ $$ d_1 ^ {\,2} + 49 = 196 $$ $$ d_1 ^ {\,2} = 196 - 49 $$ $$ d_1 ^ {\,2} = 147 $$ $$ d_1 = \sqrt{ 147 } $$$$ d_1 = 7 \sqrt{ 3 } $$STEP 2: find angle $ \alpha $
To find angle $ \alpha $ use formula:
$$ \sin \left( \frac{ \alpha }{ 2 } \right) = \dfrac{ d_2 }{ d_1 } $$After substituting $ d_2 = 7 $ and $ d_1 = 7 \sqrt{ 3 } $ we have:
$$ \sin \left( \frac{ \alpha }{ 2 } \right) = \dfrac{ 7 }{ 7 \sqrt{ 3 } } $$ $$ \sin \left( \frac{ \alpha }{ 2 } \right) = \frac{\sqrt{ 3 }}{ 3 } $$ $$ \frac{ \alpha }{ 2 } = \arcsin\left( \frac{\sqrt{ 3 }}{ 3 } \right) $$ $$ \frac{ \alpha }{ 2 } = 35.2644^o $$$$ \alpha = 35.2644^o \cdot 2 $$$$ \alpha = 70.5288^o $$