5.02 Sine rule and the ambiguous case

An oblique \triangle ABC consists of angles A, B \text{ and }C which appear opposite sides a, b \text{ and }c respectively. State whether the following equations are true or false for this triangle:

Consider the following diagram:

a

Find an expression for \sin A in \triangle ACD.

b

Find an expression for \sin B in \triangle BDC. Then make x the subject of the equation.

c

Substitute your expression for x into the equation from part (a), and rearrange the equation to form the sine rule.

Find the missing side length of the following triangles using the sine rule, rounding your answers to one decimal place:

a

b

c

d

e

f

Triangle ABC has \angle ABC = 50 \degree 51 ', \angle ACB = 20 \degree 41 ' and AC = 15.9 \text{ mm}. Find the length of the following, to one decimal place:

Consider the following triangle:

a

Find the length of side HK, to two decimal places.

b

Find the length of side KJ, to two decimal places.

Find the value of the missing angle x, rounded to one decimal place:

a

b

c

d

Find the size of obtuse angle x for the following triangles, correct to two decimal places:

a

b

c

A line joining the origin and the point \left(6, 8\right) has been graphed on the number plane. To form a triangle with the x-axis, a second line is drawn from the point \left(6, 8\right) to the positive side of the x-axis.

Rochelle needs to determine whether a triangle with the dimensions shown below is possible or not:

a

Find the value of \theta.

b

Find the value of \dfrac{8.4}{\sin 106 \degree}. Round your answer to four decimal places.

c

Find the value of \dfrac{4.0}{\sin 26 \degree}. Round your answer correct to four decimal places.

d

Hence, is it possible to construct this triangle? Explain your answer.

\triangle ABC consists of angles A, B \text{ and }C which appear opposite sides a, b \text{ and }c respectively. Given the following, state whether solving \triangle ABC results in the ambiguous case:

Determine the number of possible triangles given the following:

Determine whether the following sets of data determine a unique triangle:

For each of the given measurements of \triangle ABC:

\triangle ABC is such that \angle CAB = 32 \degree, a = 5 and b = 9.

Let the unknown angle opposite the length 9 \text{ cm} be x.

In \triangle ABC, A = 45\degree and c = 5\text{ mm}.

What is the range of lengths, rounded to the nearest tenth where appropriate, for BC that lead to the ambiguous case where we don't know if the triangle formed is acute or obtuse?

A radio signal is sent from a transmitter at tower T, via a satellite S, to a town W, as shown in the diagram. The town is 526 \text{ km} from the transmitter tower. The signal is sent out from the transmitter tower at an angle of 18 \degree, and the town receives the signal at an angle of 26 \degree.

Two wires help support a tall pole. One wire forms an angle of 36\degree with the ground and the other wire forms an angle of 70\degree with the ground. The wires are 29 \text{ m }apart.

Mae observes a tower at an angle of elevation of 12 \degree. The tower is perpendicular to the ground. Walking 67 \text{ m} towards the tower, she finds that the angle of elevation increases to 35 \degree.

To calculate the height of each block of flats, a surveyor measures the angles of depression from A and B to C. From A, the angle of depression is 31 \degreeand from B the angle of depression is 47 \degree.

a

Find the size of \angle ACB.

b

If the distance between A and C is b \text{ m}, find the value of b. Round your answer to two decimal places.

c

If the buildings are h \text{ m} tall, find the value of h. Round your answer to the nearest metre.

Competitors taking part in a fundraising event must make their way around a triangular course set up in open water. They must swim from buoy A to buoy B, stand-up paddle from buoy B to buoy C, and then kayak from buoy C back to buoy A. The buoys are set up such that \angle CAB = 61 \degree 17 ' and \angle ABC = 73 \degree 12 '. The swimming leg is 250 \text{ m} long.