Find the amount of fencing needed to enclose the triangular piece of land? <A = 48 degrees <B = 56 degrees Side b(opposite of angle B) = 300 meters

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Answer 1 · 2018-07-20T11:37:24

Amount of fencing needed #color(maroon)( = 916.77 m#

We need to find the perimeter of the triangle for fencing.

#hat A = 48^@, hat B = 56^@, hat C = 180 - 48 - 56 = 76^@, b = 300 m#

Applying Law of Sines,

#a / sin A = b / sin B = c / sin C#

#a = (300 * sin 48) / sin 56 = 268.92 m#

#c = (300 * sin (74)) / sin 56 = 347.85 m#

Perimeter of #Delta = 300 + 268.92 + 347.85 = color (maroon)(916.77 m#

Answer 2 · 2018-07-20T11:49:21

Amount of fencing needed to enclose the land is #920.04# meter.

Angle between Sides # b and c# is # /_A = 48^0#

Angle between Sides # a and c# is # /_B = 56^0 :.#

Angle between Sides # a and b# is # /_C= 180-(48+56)=76^0#

The sine rule states if #a, b and c# are the lengths of the sides

and opposite angles are #/_A, /_B and /_C# in a triangle, then:

#a/sin A = b/sin B=c/sin C ; b=300 :. b/sin B=c/sin C# or

# 300/sin 56=c/sin 76 or c = (300 * sin 76)/sin 56~~ 351.12# m

Similarly, # b/sin B=a/sin A or 300/sin 56=a/sin 48# or

#a = (300 * sin 48)/sin 56~~268.92 # m.

Perimeter of the triangular piece of land is

#= (a+b+c)= 268.92+300+351.12 = 920.04# meter

Amount of fencing needed to enclose the land is #920.04# meter [Ans]