A triangle has two corners with angles of $\frac{π}{12}$ $pi / 12$ and $\frac{π}{12}$ $pi / 12$ . If one side of the triangle has a length of $5$ $5$ , what is the largest possible area of the triangle?

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A triangle has two corners with angles of $\frac{π}{12}$ $pi / 12$ and $\frac{π}{12}$ $pi / 12$ . If one side of the triangle has a length of $5$ $5$ , what is the largest possible area of the triangle?

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Answer 1 · 2017-10-16T03:19:09

Largest area possible $* 6.2506 *$ $**6.2506**$

Explanation:

Three angles are $\frac{π}{12}, \frac{π}{12}, \frac{5 π}{6}$ $pi/12, pi/12, (5pi)/6$
$\frac{a}{sin a} = \frac{b}{sin b} = \frac{c}{sin c}$ $a/sin a = b/ sin b = c/ sin c$

To obtain largest possible area,
Length 5 should be opposite to the angle with least value.
$\frac{5}{sin (\frac{π}{12})} = \frac{b}{sin (\frac{π}{12})} = \frac{c}{sin (\frac{5 π}{6})}$ $5/sin (pi/12) = b/sin (pi/12) = c / sin ((5pi)/6)$
Side b = 5.
Side $c = \frac{5 \cdot sin (\frac{5 π}{6})}{sin (\frac{π}{12})}$ $c = (5*sin((5pi)/6)) / sin (pi/12)$
Side $c = \frac{5 \cdot sin (\frac{π}{6})}{sin (\frac{π}{12})} = \frac{5}{2 \cdot sin (\frac{π}{12})}$ $c = (5*sin (pi/6))/sin (pi/12) = 5/(2*sin(pi/12))$
$c = 9.6593$ $c = 9.6593$
Area
$s = \frac{5 + 5 + 9.6593}{2} = 9.8297$ $s= (5+5+9.6593)/2= 9.8297$
$A = \sqrt{s (s - a) (s - b) (s - c)}$ $A= sqrt(s(s-a)(s-b)(s-c))$

$= \sqrt{9.8297 \cdot 4.8297 \cdot 4.8297 \cdot 0.1704}$ $=sqrt(9.8297*4.8297*4.8297*0.1704)$

Area $A = 6.2506$ $A = 6.2506$

Answer 2 · 2017-10-16T12:32:42

Area = 6.25

Explanation:

Alternate method :
Area of $Delta = (1/2)bh$
Given triangle is isosceles as two angles are $pi/12$ each.
$:. h = 5*sin (pi/12)$
$(1/2)b .= 5*cos(pi/12)$
Area $= 5*5*sin(pi/12)*cos(pi/12)$
$=(25/2)*2sin(pi/12)cos(pi/12)$
$=(25/2)sin(pi/6) = (25/2)(1/2)=25/4=6.25$

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A triangle has two corners with angles of $\frac{π}{12}$ $pi / 12$ and $\frac{π}{12}$ $pi / 12$ . If one side of the triangle has a length of $5$ $5$ , what is the largest possible area of the triangle?

2 Answers

Explanation:

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A triangle has two corners with angles of pi / 12 π12 pi / 12 and pi / 12 π12 pi / 12 . If one side of the triangle has a length of 5 55 , what is the largest possible area of the triangle?

2 Answers

Explanation:

Explanation:

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A triangle has two corners with angles of $\frac{π}{12}$ $pi / 12$ and $\frac{π}{12}$ $pi / 12$ . If one side of the triangle has a length of $5$ $5$ , what is the largest possible area of the triangle?