Further Trigonometry (DP IB Maths: AI HL)

Complete the following table. In all cases the values for the angle should be given between 0 and 360° or 0 and  radians, as appropriate.

Degrees	Radians	sin	cos	tan

Given that  ,  find the possible values of  and the corresponding values of .

The following diagram shows triangle ABC, with  and  .

Given that    and that the area of triangle ABC is equal to 20 , find the value of .

The following diagram shows triangle ABC, with  and  

Given that  ,  find the exact area of triangle ABC.

Find the exact perimeter of triangle ABC.

A sector of a circle, OPQ, is such that the angle at its centre, O, is  radians.

The area of sector OPQ in is one-fifth of the length of the arc PQ in cm.

Give your answers in part (ii) correct to 3 significant figures.

The lengths of two sides in a right-angled triangle are 9 cm and 12 cm.

Find the possible values of , and the corresponding values of  and , where  is the smallest angle in the triangle.  All your answers should be given as exact values.

The diagram below shows the sector of a circle , with centre O and radius 9.8 cm. The angle at the centre of the sector, , is 0.85 radians.

Find the area of the shaded segment, bounded by arc AB and chord AB. Give your answer correct to 3 significant figures.

Find the perimeter of sector OAB.

A games design company produces a popular game called ‘Inconsequential Endeavour’. Each game set includes solid plastic game pieces which are in the form of a right prism with a cross-section that is the sector of a circle, as shown in the diagram below. The angle at the centre of the sector is , and the height of the game piece is .

Given that the volume of the game piece is , work out the radius of the sector. Give your answer correct to 3 significant figures.

The diagram below shows the sector of a circle OAB with centre O. The angle at the centre of the sector, , is radians. Point M is the midpoint of line segment OA, and the shaded region is the combination of triangle ABM with the region enclosed by the arc AB and the chord AB.

Show that the ratio of the area of triangle OMB to the area of the shaded region may be expressed as

Given that the area of the shaded region is equal to , find the exact area of triangle OAB.

A graph has the equation  for the interval .

Sketch the graph on the axes below.

A straight line with equation  intersects the graph of .

Sketch the line on to the same set of axes.

Find the coordinates of the points of intersection between .

Use the fact that

to fully factorise 

Use your result from part (a) to solve the equation

in the interval . You should give your answers as exact values where possible.

In each of the following,  is an angle measured in radians such that .

Given that ,  write down expressions for  and

Given that ,  write down expressions for  and .

Given that , write down expressions for  and .

Given that  find the possible values of  and the corresponding values of .

The following diagram shows triangle ABC, with  .

Given that  and that the ratio of the length of side AB to the length of side BC is , find the exact area of triangle ABC.

A sector of a circle, OPQ, is such that the angle at its centre, O, is  radians.

Given that the area of sector OPQ in is equal to the length of the arc PQ in mm, find

giving your answers correct to 3 significant figures.

The lengths of two sides in a right-angled triangle are  and , with .

Find the possible values of , and the corresponding values of  and , where  is the smallest angle in the triangle.  All your answers should be given in terms of  and .

The diagram below shows the sector of a circle OAB, with centre O. The angle at the centre of the sector, , is 1.3 radians.  The shaded region in the diagram is the segment bounded by the arc AB and the chord AB.

Given that the difference between the perimeter of sector OAB and the perimeter of  triangle OAB is 1.05 cm, find the area of the shaded region. Give your answer correct to 3 significant figures.

A games design company produces a popular game called ‘Nugatory Enterprise’. Each game set includes plastic game pieces which are in the form of a right prism with a cross-section that is the sector of a circle, as shown in the diagram below.  The angle at the centre of the sector is , and the height of the game piece is 6 mm.

The game pieces are hollow, with a top (which is a cross-section of the prism) and three sides, but no bottom.

Given that the external surface area of the game piece is , work out the interior volume of the game piece giving your answer correct to 3 significant figures. You may ignore the thickness of the top and sides in your calculations.

The diagram below shows the sector of a circle OAB with centre O. The angle at the centre of the sector, , is  radians.  Point P is a point on line segment [OB] such that , where  is a constant with . The shaded region in the diagram is the combination of triangle ABP with the region enclosed by the arc AB and the chord AB.

If the area of triangle OAP is denoted by  and the area of the shaded region is denoted by , show that

Given that   and that the area of triangle OAP is one half the area of sector OAB, show that the exact length of chord AB in centimetres is given by

Solve the equation

in the interval .