The value of for . Find:
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The value of for . Find:
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The value of , for . Find:
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An angle M has the properties such that and . Find, in terms of and an expression for:
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Solve the equation for .
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Solve the equation for .
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Show that .
Use your result from part (a) to solve the equation
in the interval .
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Show that the equation can be written in the form , where and are integers to be found.
Hence, or otherwise, solve the equation
for
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Show that the equation
can be written in the form
Hence, solve the equation , for
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The graph below shows the function where .
The function is formed by translating the function 1 unit vertically downwards.
The function is formed by stretching the function by a factor of in the direction. The domain of remains the same as
Find the solutions to the equation , for and label them clearly on the graph of given above.
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The value of for .
Find
Use your results from part (a) to explain why must be true.
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The value of , for .
Explain why
Hence find the following in terms of :
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An angle M is such that and . Show that
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Solve the equation in the interval .
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Solve the equation for .
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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.
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Solve the equation
in the interval . Give your answers as exact values where possible.
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Two functions, f and g, are defined by and .
Describe the single transformation of the graph of that will produce the graph of .
On the same set of axes, sketch the graphs of and in the interval .
By using an appropriate trigonometric identity to solve the equation in the interval , determine the points of intersection of the two curves from your graph in part (b). Label those points on your graph.
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The value of for .
Find
Hence show that
where is a positive integer to be determined, and use those results to find the exact value of .
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The value of , for .
Find the following in terms of :
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It is given that .
Show that
For , determine the range of values for which
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Solve the equation
in the interval .
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Solve the equation
in the interval .
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Solve the equation
in the interval .
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Use the fact that
to fully factorise
Two functions, f and g, are defined by
for .
Use an algebraic method along with your result from part (a) to determine the -coordinates of the points of intersection of the curves and .
Your solution should show clear algebraic working, and your answers should be given as exact values where possible.
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Let OAB be an isosceles triangle with and .
If the length of line segment AB is denoted by , and the area of triangle OAB is denoted by , show that
where
The diagram below shows circle sector OAB with centre O and angle at the centre .
Given that the length of chord AB is units, and that the area of triangle OAB is , find the area of sector OAB and the length of arc AB.
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