Answer:
#1: The measure of m<B is 125°.
#2: M<Y is equal a 27°.
#3: So the length of DF is 5.99 km.
#4: the side length AC is 13.1 feet.
Explanation:
# 1: The following given,
c = AB = 17 cm
a = BC = unknown
b = CA = 44 cm
Ø = 125
M<B means it is the angle at vertex B of the triangle, it is also the only angle given in thbe figure.
Therefore, The measure of m<B is 125°.
#2: We can calculate the value of the angles by means of the law of sine which is the following:
[tex] \frac{yz}{sin \: x} = \frac{xz}{sin \: y} = \frac{xy}{sin \: z} [/tex]
We need you know the Y value, therefore we replace and solve for Y
[tex] \frac{xz}{sin \: y} = \frac{xy}{sin \: z} \\ \frac{5}{sin \: y} = \frac{11}{sin \: 88} \\ 5 \: . \: sin \: 88 = 11 \: . \: sin \: y \\ sin \: y = \frac{5 \: . \: sin \: 88}{11} \\ sin \: y = 0.45426 \\ y = {sin}^{ - 1} (0.45426) \\ y = 27[/tex]
#3: In order to find the length of Df, we can use the law of sines in this triangle:
[tex] \frac{11}{sin \: (103)} = \frac{df}{sin \: (32)} \\ \frac{11}{0.974} = \frac{df}{0.53} \\ df = \frac{11.0.53}{0.974} \\ df = 5.99[/tex]
So the length of DF is 5.99 km.
#4: We are given two two angles and one side length.
<A = 37°
<B = 65°
AB = 13 ft
We are asked to find side length AC
We can use the "law of sines" to find the side length AC
[tex] \frac{sin \: c}{ab} = \frac{sin \: b}{ac} [/tex]
Let us first find the angle <C
Recall that the sum of all three interior angles of a triangle must be equal to 180°
[tex] < a + < b + < c = 180 \\ 37 + 65 + < c = 180 \\ 102 + < c = 180 \\ < c = 180 - 102 \\ < c = 78[/tex]
So, the angle <C is 78°
Now let us substitute all the known values into the law of sines formula and solve for AC
[tex] \frac{sin \: c}{ab} = \frac{sin \: b}{ac} \\ \frac{sin \: 75}{13} = \frac{sin \: 65}{ac} \\ ac = \frac{sin \: 65 \: . \: 13}{sin \: 75} \\ ac = \frac{9.06 \: . \: 13}{0.899} \\ ac = 13.1ft[/tex]
Therefore, the side length AC is 13.1 feet.
