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In ∆ABC, a= 420° cm, b=620cm and c=410 cm. find the area of ∆ABC to the nearest square centimeter.

User QQQuestions
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1 Answer

10 votes
10 votes

Let's make a diagram

Let's find angle C using the law of cosines


\begin{gathered} c^2=a^2+b^2-2ab\cdot\cos C \\ 410^2=420^2+620^2-2\cdot420\cdot620\cdot\cos C \\ 168100=176400+384400-520800\cdot\cos C \\ 168100=560800-520800\cdot\cos C \\ C=\cos ^(-1)((168100-560800)/(-520800)_{}) \\ C=41.06 \end{gathered}

Then, we use the following formula to find the area


\begin{gathered} A=(1)/(2)ab\sin C \\ A=(1)/(2)\cdot420\cdot620\cdot\sin 41.06 \\ A=85,522(cm)^2 \end{gathered}

However, if we use all the decimal numbers of the angle, we get an area of 85,520 square centimeters.

In ∆ABC, a= 420° cm, b=620cm and c=410 cm. find the area of ∆ABC to the nearest square-example-1
User Malay M
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