Work out the length of the missing side in the following right-angled triangle.
Using your answer from part (a) to help, write down the values of the following:
Did this page help you?
Work out the length of the missing side in the following right-angled triangle.
Using your answer from part (a) to help, write down the values of the following:
Did this page help you?
Show that
                                                         Â
Did this page help you?
Solve the equation
,    Â
Did this page help you?
Solve the equation .
Hence, or otherwise, solve the equation for .
Did this page help you?
Solve the equation for  , giving your answers to one decimal place.
Did this page help you?
Sketch the graph of for .
Solve the equation for .
Did this page help you?
Solve the equation for .
Did this page help you?
Solve the equation for .
Did this page help you?
Solve the equation 2 sin  for  .
Did this page help you?
Show that the equation   sin2 cos   can be written in the form  cos2 cos , where ,  and  are integers to be found.
Hence, or otherwise, solve the equation sin2 cos  for .
Did this page help you?
Given that  find the possible values of  and .
Did this page help you?
Solve the equation  sin  for  .
Did this page help you?
Solve the equation sin cos cos for  .
Did this page help you?
A right-angled triangle has hypotenuse 8 cm. One of its other sides is 5 cm.
Find exact values for ,  and , where  is the smallest angle in the triangle.
Did this page help you?
Show that .
Hence, or otherwise, solve the equation tan3 tan2 tan  for , giving your answers to 1 decimal place where appropriate.
Did this page help you?
A seagull sits on the surface of the sea and moves up and down as waves pass.
Its height,  metres, above its position in calm water is modelled by the function sin where  is the time in seconds after timing commences.
Sketch a graph of  against  for  showing the coordinates of the points of intersection with the  axis.
How many times in the first minute after timing commences is the seagull 0.25 metres above its calm water position?
Find the time at which the seagull is first 0.25m above its calm water position and moving downwards. Give your answer to 3 significant figures.
Did this page help you?
Solve the equation sin cos  for , giving your answers to 1 decimal place.
Did this page help you?
Solve the equation sin2 cos for Â
Did this page help you?
Given that the angle is obtuse and that sin , find the exact value of cos .
Did this page help you?
Solve the equation tan  for  .
Did this page help you?
Solve the equation  tan sin  for .
Did this page help you?
An isosceles triangle has sides 8 cm, 8 cm and 4 cm and equal base angles .
Find exact values for sin ,cos and tan .
Did this page help you?
Show that   satisfies the equation .
Hence solve the equation cos3 cos2 cos  for .
Did this page help you?
A seagull sits on the surface of the sea and moves up and down as waves pass.
Its height,  metres, above its position in calm water is modelled by the function  sin where  is the time in seconds after timing commenced.
Find the first time the seagull is 0.3 metres above its calm water position.
Give your answer to 2 decimal places.
How many times in the first minute after timing commences is the seagull 0.3 metres above its calm water position?
Did this page help you?
Solve the equation sin cos  for  , giving your answers to 1 decimal place.
Did this page help you?
Solve the equation cos2 sin  for , giving your answers to 1 decimal place where appropriate.
Did this page help you?
Given that the angle is reflex and that cos  , find the exact value of tan .
Did this page help you?
Solve the equation  sin2  for  .
Did this page help you?
Solve the equation sintan  for  , giving your answers to 1 decimal place where appropriate.
Did this page help you?
For the triangle in the diagram find exact values for sin ,cos and tan .
Did this page help you?
Find all the values of  in the range  which satisfy the equation tan3 tan2 tan , giving your answers to 1 decimal place.
Did this page help you?
A seagull sits on the surface of the sea and moves up and down as waves pass.
Its height, metres, above its position in calm water is modelled by the function where  is the time in seconds after timing commences.
Find the amount of time the seagull is more than 0.5 metres above its calm water position in the first 20 seconds after timing commences.
Give your answer correct to 3 significant figures.
Did this page help you?