If sides A and B of a triangle have lengths of 8 and 5 respectively, and the angle between them is $(pi)/3$ , then what is the area of the triangle?

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If sides A and B of a triangle have lengths of 8 and 5 respectively, and the angle between them is $(pi)/3$ , then what is the area of the triangle?

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Answer 1 · 2016-01-22T09:07:21

$Area=10 sqrt(3)$ square units

Explanation:

Use the formula $Area=1/2*ab sin C$ OR
$Area=1/2*bc sin A$ OR
$Area=1/2*ac sin B$
In this case side $a=8$ , side $b=5$ , angle $C=pi/3$

$Area= 1/2 ab sin C$
$Area=1/2* 8*5*sin (pi/3)$

$Area=1/2*8*5*sqrt3/2$

$Area=10 sqrt(3)$ square units

Answer 2 · 2016-01-22T09:10:05

$10sqrt3$

Explanation:

In a triangle with 2 known sides , say a , and b , and the angle between them is $theta$

then area (A) = $1/2 ab sintheta$

In this question a = 8 , b = 5 and $theta = pi/3$

$rArr A = 1/2 xx 8 xx 5 xx sin(pi/3) = 20 xx sqrt3/2 = 10sqrt3$

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If sides A and B of a triangle have lengths of 8 and 5 respectively, and the angle between them is $(pi)/3$ , then what is the area of the triangle?

2 Answers

Explanation:

Explanation:

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Impact of this question

Science

Math

Humanities

... and beyond

If sides A and B of a triangle have lengths of 8 and 5 respectively, and the angle between them is (pi)/3(pi)/3, then what is the area of the triangle?

2 Answers

Explanation:

Explanation:

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Impact of this question

If sides A and B of a triangle have lengths of 8 and 5 respectively, and the angle between them is $(pi)/3$ , then what is the area of the triangle?