![\begin{gathered} \text{d = 21 }\sqrt[]{3} \\ a\text{ = 21} \\ c\text{ = 42 }\sqrt[]{3} \\ b\text{ = 63} \end{gathered}](https://img.qammunity.org/qa-images/2023/formulas/mathematics/college/ite4f8mheu4b3gy54b95.png)
Step-by-step explanation:
The triangles is the bigger triangle are both right angled
Considering the triangle by the left:
when angle = 60°
opposite = d
hypotenuse = 42
To get d, we will use sine ratio:
![\begin{gathered} \sin \text{ 60}\degree\text{ = }(opposite)/(hypotenuse) \\ \sin \text{ 60}\degree\text{= }(d)/(42) \\ d\text{ = 42 }*\text{ sin 60}\degree\text{ } \\ In\text{ radical form sin60}\degree\text{ = }\frac{\sqrt[]{3}}{2} \\ d\text{ =42 }*\frac{\sqrt[]{3}}{2} \\ d\text{ = }21\text{ }\sqrt[]{3} \end{gathered}](https://img.qammunity.org/qa-images/2023/formulas/mathematics/college/iuvgbx921vpsrtwyh0wz.png)
To get a, we will use cosine ratio:
Considering the triangle by the right:
opposite = d = 21√3
angle = 30°
hypotenuse = c
To get c, we will use sine ratio:
![\begin{gathered} \sin \text{ 30}\degree\text{ = }(opposite)/(hypotenuse) \\ \sin \text{ 30}\degree\text{ = }(21\surd3)/(c) \\ c\text{ = }\frac{21\surd3}{\sin \text{ 30}\degree}\text{ ; }\sin \text{ 30}\degree\text{ = 1/2 } \\ c\text{ = }(21\surd3)/((1)/(2))=\text{ }21\surd3\text{ }*\text{ 2} \\ c\text{ = 42 }\sqrt[]{3} \end{gathered}](https://img.qammunity.org/qa-images/2023/formulas/mathematics/college/thy3x7t9zv8r999d0crj.png)
b = adjacent
To get b, we will use cosine ratio:
![\begin{gathered} \cos \text{ 30}\degree\text{ = }\frac{adjacent}{\text{hypotenuse}}\text{= }(b)/(c) \\ \cos \text{ 30}\degree\text{ }=\frac{b}{42\text{ }\sqrt[]{3}} \\ \cos \text{ 30}\degree\text{ in radical form = }\frac{\sqrt[]{3}}{2} \\ b\text{ = }42\text{ }\sqrt[]{3}\text{ }*\text{ }\cos \text{ 30}\degree\text{ = }42\text{ }\sqrt[]{3}\text{ }*\frac{\sqrt[]{3}}{2} \\ b\text{ = }(42(3))/(2) \\ b\text{ = 63} \end{gathered}](https://img.qammunity.org/qa-images/2023/formulas/mathematics/college/w9bny2bg8w1n519w1216.png)