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I already solved for B but i need help with line a and c

I already solved for B but i need help with line a and c-example-1
User Maro
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1 Answer

25 votes
25 votes

Step 1. We know the measure of all of the angles in the triangle and the measure of side b:

Required: Find the measure of sides a and c to the nearest tenth.

Step 2. To find a and c we use the law of sines.

A, B, and C are the angles of the triangle and a, b, and c are the sides. The law of sines is:


(a)/(sinA)=(b)/(sinB)=(c)/(sinC)

In our case, substituting the known values:


(a)/(sin60)=(53)/(sin42)=(c)/(sin78)

Step 3. Using the first equality we can find the value of a:


(a)/(s\imaginaryI n60)=(53)/(s\imaginaryI n42)

Solving for a:


a=(53)/(s\imaginaryI n42)* sin60

Solving the operations:


\begin{gathered} a=(53)/((0.669130606))(0.866025403) \\ \downarrow \\ \boxed{a=68.6} \end{gathered}

The result is already rounded to the nearest tenth.

Step 4. Using the second equality from step 2


(53)/(sin42)=(c)/(sin78)

We will be able to find the value of c.

Solving for c:


sin78*(53)/(sin42)=c

Solving the operations:


\begin{gathered} (0.9781476)(53)/((0.669130606))=c \\ \downarrow \\ \boxed{77.5=c} \end{gathered}

The result is already rounded to the nearest tenth.

Answer:


\begin{gathered} \boxed{a=68.6} \\ \boxed{c=77.5} \end{gathered}

I already solved for B but i need help with line a and c-example-1
User Luis Casillas
by
2.4k points